Every content element must have a mathematical definition associated with it in some form. The purpose of this appendix is to provide default definitions. (An index to the definitions is provided later in this document.) For this release of MathML definitions have not been restricted to any one format. There are several reasons for allowing flexibility at this time.
The feasibilty of implementing a particular object in a particular comptational system and the details of particular implementations have very little to do with the requirement that there actually be a mathematical definition. An author's decision to use content elements is a decision to work with defined objects. The definitions may be as vague as claiming that, say F, is an unknown, but differentiable function from the real numbers to the real numbers, or as complicated as requiring that F to be an elaborate new function or operation as defined in some recent research paper. The primary role of MathML content elements is to provide a mechanism for recording the fact that a particular structure has a particular mathematical meaning. If a definition is implemented in a computational system, this is a bonus.
Of course, default definitions and semantics should be chosen to be as useful as possible. Where possible they should be already implemented or easy to implement and all other things being equal, an author would be well advised to use a definition that is in common use. This is no different from noting that most well written mathematical communications (in any format) benefit substantially from the author's use of widely used and understood terms.
A requirement that there be a definition is also very different from a requirement that a definition be provided in some specific manner. Before requiring a particular approach to definitions one needs to consider such issues as:
In order to leave open the discussion of such fundamental issues we have deliberately limited the support for new or author defined definitions to support for specifying an appropriate "definitionURL.". The format of the content of that URL is unspecified. It might be the URL of a mathematical paper whose whole purpose is to define a new operator, or even a simple reference to a traditional text. If the author's mathematical operator matches exactly with an operator in a particular computational system, an appropriate definition might be a MathML semantics element establishing a correspondence between two encodings. Whatever is chosen, the only essential feature is that the definition be provided.
This rest of this appendix provides detailed descriptions of the default semantics associated with each of the MathML content elements. Since this is exactly the role intended for the encodings under development by the OpenMath Consortium and one of our goals is to foster international cooperation in suchstandardization efforts we have presented the default definitions in a format modeled on OpenMath's content dictionaries . While the actual details differ somewhat from the OpenMath specification, the underlying principles are the same and this is being used as input to ongoing discussions underway with the OpenMath Consortium aimed at ensuring that the OpenMath encodings will be capable of conveying the necessary information.
Each MathML element is described using an XML format. The top element is MMLdefinition. The sub-elements identify the various parts of the description and include:
MathML Dictionary: Version 1.0
February 10, 1998
<MMLdefinition>
<name> cn </name>
<description>
A numerical constant. The mathematical type of number
is given as an attribute. The default type is "real".
Numbers such as rational, complex or real, require two
parts for a complete specification. The parts of such
a number are separated by an empty "sep" element.
There are a number of pre-defined constants including:
π &Exponential; &ComplexI &true; &false; &NaN;
the properties of some of which are outlined below.
The &NaN; is IEEE's "Not a Number", as defined in
IEEE 854 standard for Floating point arithmetic.
</description>
<functorclass> constant </functorclass>
<MMLattribute>
<name> type </name>
<value> integer | rational | complex-cartesian
| complex-polar | real
</value>
<default> real </default>
</MMLattribute>
<MMLattribute>
<name> base </name>
<value> positive_integer </value>
<default> 10 </default>
</MMLattribute>
<signature> [type=integer](numstring) -> constant(integer) </signature>
<signature> [base=basevalue](numstring) -> constant(integer) </signature>
<signature> [type=rational](numstring,numstring) -> constant(rational) </signature>
<signature> [type=complex-cartesian](numstring,numstring) -> constant(complex) </signature>
<signature> [type=rational](numstring,numstring) -> constant(rational) </signature>
<signature> [type=real](π) -> constant(real) </signature>
<signature> [definition](numstring,numstring) -> constant(userdefined) </signature>
<signature> (γ) -> constant</signature>
<example> <cn> 245 </cn> </example>
<example> <cn type="integer"> 245 </cn> </example>
<example> <cn type="integer" base="16"> A </cn></example>
<example> <cn type="rational"> 245 <sep> 351 </cn> </example>
<example> <cn type="complex-cartesian"> 1 <sep/> 2 </cn> </example>
<example> <cn> 245 </cn> </example>
<property> <approx>
<cn> π </cn>
<cn> 3.141592654 </cn>
</approx></property>
<property> <approx>
<cn> γ </cn>
<cn> .5772156649 </cn>
</approx> </property>
<property> <reln><identity/>
<cn>ⅈ </cn>
<apply><root><cn>-1</cn><cn>2</cn></apply>
</reln>
</property>
<property> <reln><approx>
<cn> ⅇ </cn><cn>2.718281828 </cn>
</reln> </property>
<property> <apply><forall/>
<bvar><ci type=boolean>p</ci></bvar>
apply><and/>
<ci>p</ci><cn>&true;</cn></apply>
<ci>p</ci>
</apply>
</property>
<property> <apply><forall/>
<bvar><ci type=boolean>p</ci></bvar>
<apply><or/>
<ci>p</ci><cn>&true;</cn></apply>
<cn>&true;</cn>
</apply>
</property>
<bvar><ci type=boolean>p</ci></bvar>
<apply><or/>
<ci>p</ci><cn>&true;</cn></apply>
<cn>&true;</cn>
</apply>
</property>
<property>
<identity>
<apply><not/><cn> &true; </apply>
<cn> &false; </cn>
</identity>
</property>
<property> <reln><identity/>
<cn base="16"> A </cn> <cn> 10 </cn> </reln> </property>
<property> <reln><identity/>
<cn base="16"> B </cn> <cn> 11 </cn> </reln></property>
<property> <reln><identity/>
<cn base="16"> C </cn> <cn> 12 </cn> </reln></property>
<property> <reln><identity/>
<cn base="16"> D </cn> <cn> 13 </cn> </reln></property>
<property> <reln><identity/>
<cn base="16"> E </cn> <cn> 14 </cn> </reln></property>
<property> <reln><identity/>
<cn base="16"> F </cn> <cn> 15 </cn> </reln></property>
</MMLdefinition>
<MMLdefinition>
<name> ci </name>
<description>
A symbolic name constructor. The type attribute can
be set to any valid MathML type.
</description>
<functorclass> constructor , unary </functorclass>
<MMLattribute>
<name> type </name>
<value> constant | matrix | set | vector | list | MathMLtype </value>
<default> real </default>
</MMLattribute>
<signature> ({string|mmlpresentation}) -> symbol(constant) </signature>
<signature> [type=MathMLType]({string|mmlpresentation}) -> symbol(MathMLType) </signature>
<example><ci> xyz </ci> </example>
<example><ci> type="vector"> V </ci> </example>
</MMLdefinition>
<MMLdefinition> <name> apply </name> <description> This is the MathML constructor for function application. The first argument is applied to the remaining arguments. It may be the case that some of the child elements are named elements. (See the signature.) </description> <functorclass> constructor , nary </functorclass> <signature> (function,anything*) -> application </signature> <example><apply><plus/><ci>x</ci><cn>1</cn></apply></example> <example><apply><sin/><ci>x</ci></apply></example> </MMLdefinition>
<MMLdefinition> <name> reln </name> <description> This is the MathML constructor for expressing a relation between two or more mathematical objects. The first argument indicates the type of "relation" between the remaining arguments. (See the signature.) No assumptions are made about the truth value of such a relation. Typically, the relation is used as a component in the construction of some logical assertion. Relations may be combined into sets, etc. just like any other mathematical object. </description> <functorclass> constructor </functorclass> <signature> (function,anything*) -> reln </signature> <example><reln><and/><ci>P</ci><ci>Q</ci></reln></example> <example><reln><lt/><ci>x</ci><ci>y</ci></reln></example> </MMLdefinition>
<MMLdefinition> <name> fn </name> <description> This is the MathML constructor for building new function names. The "name" can be a general MathML content element. It identifies that object as "usable" in a function context. By setting its definitionURL value, you can associate it with a particular function definition. Use the MathML Declare to associate a name with a lambda construct. </description> <MMLattribute> <name>definitionURL</name> <value> URL </value> <default> none </default> </MMLattribute> <functorclass> constructor </functorclass> <signature> (anything) -> function </signature> <signature> [definitionURL=functiondef](anything) -> function(definitionURL=functiondef) </signature> <example><fn><ci>F</ci></fn></example> <example><fn definitionURL="http://www.w3c/..."> <lt/><ci>G</ci></fn> </example> <!--Declaring Id to be the identity function.--> <example> <declare><fn><ci>Id</ci></fn><lambda><ci>x</ci><ci>x</ci></declare> </example> </MMLdefinition>
<MMLdefinition> <name> interval </name> <description> This is the MathML constructor element for building an interval on the real line. While an interval could be expressed by combining relations appropriately, they occur explicitly because of their frequence of occurrence in common use. </description> <MMLattribute> <name>type</name> <value> closed | open | open-closed | closed-open </value> <default> closed </default> </MMLattribute> <functorclass> constructor , binary </functorclass> <signature> [type=intervaltype](expression,expression) -> interval </signature> <example><reln><and/><ci>x</ci><cn>1</cn></reln></example> <example><reln><lt/><ci>x</ci></reln></example> </MMLdefinition>
<MMLdefinition>
<name> inverse </name>
<description>
This MathML element is applied to a function in order to
construct a new function that is to be interpreted as the
inverse function of the original function. For a particular
function F, inverse(F) composed with F behaves like the
identity map on the domain of F and F composed with inverse(F)
should be an identity function on a suitably restricted
subset of the Range of F.
The MathML definitionURL attribute should be used to resolve
notational ambiguities, or to restrict the inverse to a
particular domain or make it one-sided.
</description>
<MMLattribute>
<name>definitionURL</name>
<value> CDATA </value>
<default> none </default>
<!--none corresponds to using the default MathML definition ...-->
</MMLattribute>
<functorclass> operator, unary </functorclass>
<signature> (function) -> function </signature>
<signature> [definitionURL=URL](function) ->
function(definition) </signature>
<example><apply><inverse/><sin/></apply></example>
<example>
<apply>
<inverse definitionURL="www.w3c.org/MathML/Content/arcsin"/>
<sin/>
</apply>
</example>
<property><apply><forall/>
<bvar><ci>y</ci></bvar>
<apply><sin/>
<apply>
<apply><inverse/><sin/></apply>
<ci>y</ci>
</apply>
</apply>
<value><ci>y</ci></value>
</apply>
</property>
<property>
<apply>
<apply><inverse/><sin/></apply>
<apply>
<sin/>
<ci>x</ci>
</apply>
</apply>
<value><ci>x</ci></value>
</property>
<property>F(inverse(F)(y))<value>y</value></property>
</MathMLdefinition>
<MathMLdefinition> <name> sep </name> <description> This is the MathML infix constructor used to sub-divide PCDATA into separate components. for example, this is used in the description of a multipart number such as a rational or a complex number. </description> <functorclass> punctuation </functorclass> <example><cn type="complex-polar">123<sep/>456</cn></example> <example><cn>123</cn></example> </MathMLdefinition>
<MathMLdefinition>
<name> condition </name>
<description>
This is the MathML constructor for building conditions.
A condition differs from a relation in how it is used.
A relation is simply an expression, while a condition
is used as a predicate to place a conditions on a bound
variables.
For a compound condition use relations or apply
operators such as "and" or "or" or a set of
relations).
</description>
<functorclass> constructor, unary </functorclass>
<signature> ({reln|apply|set}) -> predicate </signature>
<example>
<condition>
<reln><lt/>
<apply><power/>
<ci>x</ci><cn>5</cn>
</apply>
<cn>3</cn>
</reln>
</condition>
</example>
</MathMLdefinition>
<MathMLdefinition> <name> declare </name> <description> This is the MathML constructor for redefining the properties and values with mathematical objects. For example V may be a name delcared to be a vector, or V may be a name which stands for a particular vector. The attribute values of the declare statement are assigned as the corresponding default attribute values of the first object. </description> <functorclass> modifier , (unary | binary) </functorclass> <MMLattribute> <name>definitionURL</definition> <value> Any valid URL </value> </MMLattribute> <MMLattribute> <name>type</name><value> MathMLType </value> </MMLattribute> <MMLattribute> <name>nargs</name><value> number of arguments for an object of type fn </value> </MMLattribute> <signature> [attributename=attributevalue](anything)
-> anything(attributevalue) </signature> <!-- The two argument form updates the properties of the first object to be those of the second. The attribute values override the properties of the "value". --> <signature> [attributename=attributevalue](anything,anything)
-> anything(attributevalue) </signature> <example><reln><and/><ci>x</ci><cn>1</cn></reln></example> <example><reln><lt/><ci>x</ci></reln></example> </MathMLdefinition>
<MathMLdefinition>
<name> lambda </name>
<description> The operation of lambda calculus that makes a
function from an expression and a variable. The definition
at this level uses only one variable. Lambda is a binary
function, where the first argument is the variable and
the second argument is a the expression.
Lambda( x, F ) is written as \lambda x [F] in the lambda
calculus literature.
The lambda function can be viewed as the inverse of function
application.
Although the expression F may contain x, the lambda expression
is interpreted to be free of x. That is, the x variable is
a variable local to the environment of the definition of
the function or operator. Formally, lambda(x,F) is free of
x, and any substitutions, evaluations or tests for x in
lambda(x,F) should not happen.
A lambda expression on an arbitrary function applied to a
simple argument is equivalent to the arbitrary function.
E.g. lambda(x, f(x)) == f. This is a common shortcut.
</description>
<functorclass> Nary , Constructor </functorclass>
<property>
<lambda><ci>x</ci>
<apply><fn><ci>F</ci></fn><ci>x</ci></apply>
</lambda>
<value> <fn><ci>F</ci></fn> </value>
</property>
<!-- Constructing a variant of the sine function -->
<example>
<lambda>
<ci> x </ci>
<apply><sin/>
<apply><plus/>
<ci> x </ci>
<cn> 3 </cn>
</apply>
</lambda>
</example>
<!-- the identity operator -->
<example>
<lambda><ci> x </ci> <ci> x </ci> </lambda>
</example>
<property>
<reln><identity/>
<lambda><ci>x</ci>
<apply><fn><ci>F</ci></fn><ci>x</ci></apply>
</lambda>
<fn><ci>F</ci></fn>
</reln>
</property>
<MathMLdefinition>
<MathMLdefinition>
<name> compose </name>
<description>
This is the MathML constructor for composing functions.
In order for a composition to be meaningful, the range of
the first function must be the domain of the second function,
etc. .
The result is a new function whose domain is the domain of
the first function and whose range is the range of the last
function and whose definition is equivalent to applying
each function to the previous outcome in turn as in:
(f @ g )( x ) == f( g(x) ).
This function is often denoted by a small circle infix
operator.
</description>
<functorclass> Nary , Operator </functorclass>
<signature> (fn*) -> fn </signature>
<example>
<apply><compose/>
<fn><ci> f </ci></fn>
<fn><ci> g </ci></fn>
</apply></example>
<property>
<apply><forall>
<bvar><ci>x</ci></bvar>
<reln><eq/>
<apply>
<apply><compose/>
<ci>f</ci>
<ci>g</ci>
</apply>
<ci>x</ci>
</apply>
<apply><ci>f</ci>
<apply><ci>g</ci>
<ci>x</ci>
</apply>
</apply>
</reln>
</apply>
</property>
</MathMLdefinition>
<MathMLdefinition>
<name> ident </name>
<description>
This is the MathML constructor for the identity function.
This function has the property that
f( x ) = x, for all x in its domain.
</description>
<functorclass> Nary , Operator </functorclass>
<signature> (symbol) -> symbol </signature>
<example>
<apply><ident/>
<ci> f </ci>
<ci> x </ci>
</apply>
</example>
<property>
<apply><forall>
<bvar><ci>x</ci></bvar>
<reln><eq/>
<apply><ident/>
<ci>f</ci>
<ci>x</ci>
</apply>
<ci>x</ci>
</reln>
</apply>
</property>
</MathMLdefinition>
<MMLdefinition>
<name> quotient </name>
<description> Integer quotient, the result of integer
division. For arguments a and b, it returns q,
where a = b*q+r, |r| < |b| and a*r ≥ 0 (or
the sign of r is the same as the sign of a).
</description>
<functorclass> Binary, Function </functorclass>
<signature> (integer, integer) -> integer </signature>
<signature> (symbolic, symbolic) -> symbolic </signature>
<!--
ForAll(bvar(a,b),identity(a ,b*Quotient(a,b) + Remainder(a,b))
-->
<property>
<apply><forall/>
<bvar><ci>a</ci></bvar>
<bvar><ci>b</ci></bvar>
<reln/><eq/>
<ci>a</ci>
<apply><plus/>
<apply><times/>
<ci>b</ci>
<apply><quotient/><ci>a</ci><ci>b</ci></apply>
</apply>
<apply><rem/><ci>a</ci><ci>b</ci></apply>
</apply>
<reln>
</apply>
</property>
<!-- 1 = quotient(5,4) -->
<property>
<apply><identity/>
<apply><quotient/>
<ci>5</ci>
<ci>4</ci>
</apply>
<ci>1</ci>
<apply>
</property>
</MMLdefinition>
<MMLdefinition>
<name> exp </name>
<description> The exponential function.
<Reference> M. Abramowitz and I. Stegun, Handbook of
Mathematical Functions, [4.2]
</Reference>
</description>
<functorclass> Unary, Function </functorclass>
<signature> real -> real </signature>
<signature> symbolic -> symbolic </signature>
<property><reln><eq/>
<apply><exp/><cn>0</cn></apply>
<cn>1</cn></reln>
</property>
<property><apply><identity/>
<apply><exp/><ci>x</ci></apply>
<apply><power/>
<cn>ExponentialE;</cn><ci>x</ci>
</apply>
</apply>
</property>
<property> exp(x) = limit( (1+x/n)^n, n, infinity ) </property>
</MMLdefinition>
<MMLdefinition>
<name>
factorial
</name>
<description>
This element is used to construct factorials
as in n! = n * (n-1) * (n-2 ) ... 1 .
</description>
<functorclass> Unary , function </functorclass>
<signature> ( algebraic ) -> algebraic </signature>
<example> <apply><factorial/><ci>n</ci></apply> </example>
<!-- for all n > 0, n! = n*(n-1)! -->
<property><apply><forall/>
<bvar><ci>n<ci></bvar>
<condition>
<reln><gt/><ci>n</ci><cn>0</cn></reln>
</condition>
<reln><eq/>
<apply><factorial/><ci>n</ci></apply>
<apply><times/>
<ci>n</ci>
<apply><factorial/>
<apply><minus/><ci>n</ci><cn>1</cn></apply>
</apply>
</apply>
</reln>
</property>
</MMLdefinition>
<MMLdefinition>
<name> divide </name>
<description>
The MathML operator that is used to construct
a "divided by" b. If a and b are from an algebraic
domain with a non-commutative times then this is defined
as a * (b)^(-1). The result is from the same algebraic
domain as the operands.
</description>
<MMLattribute>
<name> type </name>
<value> non-commutative </name>
<default> none </default>
</MMLattribute>
<functorclass> binary , function </functorclass>
<signature> (complex, complex) -> complex </signature>
<signature> (real, real) -> real </signature>
<signature> (rational, rational) -> rational </signature>
<signature> (integer, integer) -> rational </signature>
<signature> (symbolic, symbolic) -> symbolic </signature>
<example>
<apply> <divide/>
<ci> a </ci>
<ci> b </ci>
</apply>
</example>
<property>
<apply><forall/>
<bvar>a</bvar>
<reln><eq/>
<apply> <divide/>
<ci> a </ci>
<ci> 0 </ci>
<ci>Error, Division by 0</ci>
</apply>
</property>
</MMLdefinition>
<MMLdefinition>
<name> max </name>
<description>
Represent the maximum of a set of elements. The elements
may be given explicitly or described by membership in
some set. To be well defined, the elements must all be
comparable. </description>
<functorclass> function </functorclass>
<signature> ( ordered_set_element * ) -> ordered_set_element </signature>
<signature> ( condition ) -> ordered_set_element </signature>
<example>
<apply><max/><cn>2</cn><cn>3</cn> <cn>5</cn> </apply>
</example>
<example>
<apply><max/>
<condition>
<bvar><ci>x</ci></bvar>
<reln> <notin/>
<ci> x </ci>
<ci type="set"> B </ci>
</reln>
</condition>
</apply>
</example>
</MMLdefinition>
<MMLdefinition>
<name> min </name>
<description>
Represent the minimum of a set of elements. The elements
may be given explicitly or described by membership in
some set. To be well defined, the elements must all be
comparable. </description>
<functorclass> function </functorclass>
<signature> ( ordered_set_element * ) -> ordered_set_element </signature>
<signature> ( condition ) -> ordered_set_element </signature>
<example>
<apply><min/><cn>2</cn><cn>3</cn> <cn>5</cn> </apply>
</example>
<example>
<apply><min/>
<condition>
<bvar><ci>x</ci></bvar>
<reln> <notin/>
<ci> x </ci>
<ci type="set"> B </ci>
</reln>
</condition>
</apply>
</example>
</MMLdefinition>
<MMLdefinition>
<name> minus </name>
<description>
The subtraction operator of a group. </description>
<MMLattribute>
<name> definitionURL </name>
<value> URL </name>
<default> none </default>
</MMLattribute>
<functorclass>
Operator , (Unary | Binary )
</functorclass>
<signature>(real,real) -> real</signature>
<signature>(integer,integer) -> integer</signature>
<signature>(rational,rational) -> rational</signature>
<signature>(complex,complex) -> complex</signature>
<!--
Note that complex-cartesian is a data input format,
but the resulting data type is complex. !
-->
<signature> (vector,vector) -> vector</signature>
<signature>(matrix,matrix) -> matrix</signature>
<signature>(real) -> real </signature>
<signature>(integer) -> integer </signature>
<signature>(complex) -> complex </signature>
<signature>(rational) -> rational </signature>
<signature>(vector) -> vector </signature>
<signature>(matrix) -> matrix </signature>
<example>
<apply><minus/><cn>3</cn><cn>5</cn></apply>
</example>
<example>
<apply><minus/><cn>3</cn></apply>
</example>
<!-- Definition of the unary operator (-1) = -( 1 ) -->
<property>
<reln><eq/>
<bvar><ci>n</ci>
<apply><minus/><cn>1</cn></apply>
<cn>-1</cn>
</reln>
</property>
</MMLdefinition>
<MMLdefinition> <name> plus </name> <description> The N-ary addition operator of an algebraic structure. If no operands are provided, the expression represents the additive identity. If one operand a is provided, the expression represents a. If two or more operands are provided, the expression represents the group element corresponding to a left associative binary pairing of the operands. Issues with regard to the "value" of mixed operands are left up to the target system. If the author wishes to refer to specific type coercion rules, then the definitionURL attribute should be used to refer to a suitable specification. </description> <functorclass> Operator , Nary </functorclass> <signature>(real,real) -> real</signature> <signature>(integer,integer) -> integer</signature> <signature>(rational,rational) -> rational</signature> <signature> (vector,vector) -> vector</signature> <signature>(matrix,matrix) -> matrix</signature> <signature>(complex,complex) -> complex</signature> <signature>(symbolic,symbolic) -> symbolic </signature> <signature> real -> real </signature> <signature> rational -> rational </signature> <signature> integer -> integer </signature> <signature> symbolic -> symbolic </signature> <signature>(real) -> real </signature> <signature>(integer) -> integer </signature> <signature>(complex) -> complex </signature> <signature>(rational) -> rational </signature> <signature>(vector) -> vector </signature> <signature>(matrix) -> matrix </signature> <example><apply><plus/><cn>3</cn></apply></example> <example><apply><plus/><cn>3</cn><cn>5</cn></apply></example> <example><apply><plus/><cn>3</cn><cn>5</cn><cn>7</cn></apply></example> <!-- The properties for more restricted algebraic structures should be defined using a definitionURL --> <property> +() = 0 </property> <property> +(a) = a </property> <property> ForAll(a,Commutative, a + b = b + a)</property> </MMLdefinition>
<MMLdefinition>
<name> power </name>
<description> The powering operator </description>
<functorclass> binary, operator </functorclass>
<signature> (complex complex) -> complex </signature>
<signature> (real real) -> complex </signature>
<signature> (rational rational) -> complex </signature>
<signature> (rational integer) -> rational </signature>
<signature> (integer integer) -> rational </signature>
<signature> (symbolic symbolic) -> symbolic </signature>
<property> ForAll(a,a^0=1) </property>
<property> ForAll(a,a^1=a) </property>
<property> ForAll(a,1^a=1) </property>
<property>ForAll(a,0^0=Undefined)</property>
</MMLdefinition>
<MMLdefinition> <name> rem </name> <description> Integer remainder, the result of integer division. For arguments a and b, it returns r, where a = b*q+r, |r| < |b| and a*r ≥ 0 (the sign of r is the same as the sign of a when both are non-zero). </description> <functorclass> binary, function </functorclass> <signature> (integer integer) -> integer </signature> <signature> (symbolic symbolic) -> symbolic </signature> <property> a = b*rem(a,b) + rem(a,b) </property> <property>rem(a,0) = Division_by_Zero</property> </MMLdefinition>
<MMLdefinition>
<name> times </name>
<description> The multiplication operator of any
ring.
</description>
<functorclass> N-ary, Operator </functorclass>
<signature> (complex complex) -> complex </signature>
<signature> (real, real) -> real </signature>
<signature> (rational, rational) -> rational </signature>
<signature> (integer, integer) -> integer </signature>
<signature> (symbolic, symbolic) -> symbolic </signature>
<property>ForAll(bvars(a,b),condition(in({a,b},Commutative)),a*b=b*a)</property>
<property>ForAll(bvars(a,b,c),Associative,a*(b*c)=(a*b)*c), associativity </property>
<property> a*1=a </property>
<property> 1*a=a </property>
<property> a*0=0 </property>
<property> 0*a=0 </property>
</MMLdefinition>
<MMLdefinition>
<name> root </name>
<description>
Construct the nth root of an object.
The first argument "a" is the object and the
second object "n" denotes the root, as in
( a ) ^ (1/n)
</description>
<MMLattribute>
<name> type </name>
<value> real | complex | principle_branch </name>
<default> real </default>
</MMLattribute>
<functorclass> binary , function </functorclass>
<signature> ( anything , symbol ) -> root </signature>
<example>
<apply> <root/>
<ci> a </ci>
<ci> n </ci>
</apply>
</example>
<property> Forall(bvars(a,n),root(a,n) = a^(1/n)) </property>
</MMLdefinition>
<MMLdefinition>
<name> gcd </name>
<description>
This represents the greatest common divisor
of its arguments.
</description>
<MMLattribute>
<name> type </name>
<value> anything </name>
<default> integer </default>
</MMLattribute>
<functorclass> Function , Nary </functorclass>
<signature> [type=typevalue](typevalue*) -> typevalue </signature>
<example>
<apply><gcd/><cn>12</cn> <cn>17</cn></apply>
</example>
<property>Forall(p,q,(is(p,prime) and is(q,prime)) , gcd(p,q)=1 </property>
</MMLdefinition>
<MMLdefinition>
<name> and </name>
<description>
This is the logical "and" operator.
</description>
<functorclass> function, Nary </functorclass>
<signature> (boolean*) -> boolean </signature>
<example> <apply><and/><ci>p</ci><ci>q</ci></apply> </example>
<property> identity(true and p , p ) </property>
<property> identity(p and q , q and p ) </property>
</MMLdefinition>
<MMLdefinition> <name> or </name> <description> The logical "or" operator. </description> <functorclass> Binary, Function </functorclass> <signature> (boolean,boolean) -> boolean </signature> <signature> [type=boolean](symbolic symbolic)
-> symbolic </signature> <property> identity(true or p , true ) </property> ... </MMLdefinition>
<MMLdefinition> <name> or </name> <description> The logical "xor" operator. </description> <functorclass> Binary, Function </functorclass> <signature> (boolean,boolean) -> boolean </signature> <signature> [type=boolean](symbolic symbolic)
-> symbolic </signature> <property> ...</property> </MMLdefinition>
<MMLdefinition> <name> not </name> <description> The logical "not" operator. </description> <functorclass> Unary, Function </functorclass> <signature> (boolean) -> boolean </signature> <signature> [type=boolean](symbolic)
-> symbolic </signature> <property> ... </property> </MMLdefinition>
<MMLdefinition>
<Name> implies </Name>
<description> The implies operator. This represents
the construction "A implies B".
</description>
<functorclass> Binary, relation </functorclass>
<signature> (boolean,boolean) -> boolean </signature>
<property> <apply></forall>
<bvar><ci>A</ci></bvar>
<bvar><ci>B</ci></bvar>
<reln><eq/>
<apply><implies/>
<ci>A</ci>
<ci>B</ci>
</apply>
<apply><or/>
<ci>B</ci>
<apply><not/>
<ci> A </ci>
</apply>
</apply>
</reln>
</property>
</MMLdefinition>
<MMLdefinition> <name> forall </name> <description> The logical "For all" quantifier. </description> <functorclass> Nary, Operator </functorclass> <signature> (bvar*,condition?,(reln|apply)) -> boolean </signature> <property> ... </property> </MMLdefinition>
<MMLdefinition> <name> exists </name> <description> The logical "There exists" quantifier. </description> <functorclass> Nary, Operator </functorclass> <signature> (bvar*,condition?,(reln|apply)) -> boolean </signature> <property> ... </property> </MMLdefinition>
<MMLdefinition> <Name> eq </Name> <description> The equality operator. </description> <functorclass> Nary, relation </functorclass> <property> Commutative </property> <signature> (symbolic symbolic) -> boolean </signature> </MMLdefinition>
<MMLdefinition> <Name> neq </Name> <description> The notequals operator. </description> <functorclass> Nary, relation </functorclass> <property> Commutative </property> <signature> (symbolic symbolic) -> boolean </signature> </MMLdefinition>
<MMLdefinition> <Name> gt </Name> <description> The equality operator. </description> <functorclass> binary, relation </functorclass> <property> Commutative </property> <signature> (symbolic symbolic) -> boolean </signature> </MMLdefinition>
<MMLdefinition> <Name> lt </Name> <description> The inequality equality operator "<" </description> <functorclass> binary, relation </functorclass> <property> Commutative </property> <signature> (symbolic, symbolic*) -> boolean </signature> </MMLdefinition>
<MMLdefinition> <Name> geq </Name> <description> The inequality operator. >= </description> <functorclass> Nary, relation </functorclass> <signature> (symbolic, symbolic*) -> boolean </signature> <property> ... Commutative ? ... </property> </MMLdefinition>
<MMLdefinition> <Name> leq </Name> <description> The inequality operator </description> <functorclass> Nary, relation </functorclass> <property> Commutative </property> <signature> (symbolic symbolic) -> boolean </signature> </MMLdefinition>
<MMLdefinition>
<Name> ln </Name>
<description> The logarithmic function. Also called
the natural logarithm.
The inverse of the exponential function.
<Reference> M. Abramowitz and I. Stegun, Handbook of
Mathematical Functions, [4.1]
</Reference>
</description>
<functorclass> Unary, Function </functorclass>
<property>
Error( "logarithm has a singularity at 0" )
</property>
<signature> Intersect(real,positive) -> real </signature>
<signature> symbolic -> symbolic </signature>
<property> ln(1) = 0 </property>
<property> ln(exp(x)) = x, "for real x" </property>
<property> exp(ln(x)) = x, always </property>
</MMLdefinition>
<MMLdefinition>
<Name> log </Name>
<description> The logarithmic function (base 10), or any
any other user specified base. Also called
the natural logarithm.
The inverse of the exponential function.
<Reference> M. Abramowitz and I. Stegun, Handbook of
Mathematical Functions, [4.1]
</Reference>
</description>
<functorclass> Unary, Function </functorclass>
<signature> (real,logbase) -> real </signature>
<signature> symbolic -> symbolic </signature>
<property>
Error( "logarithm has a singularity at 0" )
</property>
</MMLdefinition>
<MMLdefinition>
<Name> int </Name>
<description>
The definite or indefinite integral of a function or algebraic
expression.
There are several forms of calling sequences depending on
the nature of the areguments, and whether or not it is a
definite integral.
</description>
<functorclass> Binary , Function </functorclass>
<signature> (function) -> function </signature>
<signature> (algebraic,bvar) -> algebraic </signature>
<signature> (algebraic,bvar,interval) -> algebraic </signature>
<signature> (algebraic,bvar,condition) -> algebraic </signature>
</MMLdefinition>
<MMLdefinition>
<Name> diff </Name>
<description>
For expressions, this represents the derivative of
its first argument evaluated at the second argument.
For Unary functions (only one argument) it represents
f'.
</description>
<functorclass> (Unary | Binary) , Function </functorclass>
<signature> (algebraic,bvar) -> algebraic </signature>
<property>Forall(x,diff( sin(x) , x ) = cos(x)) </property>
<property>Forall(x,diff( x , x ) = 1 ) </property>
<property>Forall(x,diff( x^2 , x ) = 2x) </property>
<property>identity( diff(sin) , cos ) </property>
</MMLdefinition>
<MMLdefinition>
<Name> partialdiff </Name>
<description>
For expressions, this represents the derivative of
its first argument evaluated at the second argument.
For Unary functions (only one argument) it represents
f'.
</description>
<functorclass> (Binary) , Function </functorclass>
<signature> (algebraic,bvar) -> algebraic </signature>
<property>Forall(x,diff( sin(x*y) , x ) = cos(x)) </property>
<property>Forall(x,y,diff( x*y , x ) = diff(x,x)*y + diff(y,x)*x ) </property>
<property>Forall(x,a,b,diff( a + b , x ) = diff(a,x) + diff(b,x) ) </property>
<property>identity( diff(sin) , cos ) </property>
</MMLdefinition>
<MMLdefinition>
<Name> totaldiff </Name>
<description>
If u is a function of x and y then the total differential
of u is:
du = diff(u(x,y),x) * dx + diff(u(x,y),y) * du
</description>
<functorclass> Nary , Function </functorclass>
<signature> (algebraic,bvar+) -> algebraic </signature>
<property>...</property>
</MMLdefinition>
<MMLdefinition>
<Name> lowlimit </Name>
<description> Construct a lower limit. Limits
are used in some integrals as alternative way
of describing the region over which an integral
is computed. (i.e., a connected component of the
real line.)
</description>
<functorclass> Constructor </functorclass>
<signature> (anything*) -> list </signature>
</MMLdefinition>
<MMLdefinition>
<Name> uplimit </Name>
<description> Construct a an upper limit. Limits
are used in some integrals as alternative way
of describing the region over which an integral
is computed. (i.e., a connected component of the
real line.)
</description>
<functorclass> Constructor </functorclass>
<signature> (anything*) -> list </signature>
</MMLdefinition>
<MMLdefinition>
<Name> bvar </Name>
<description>
The bvar element is the container element
for the "bound variable" of an operation.
For example, in an integral it specifies the
variable of integration. In a derivative, it
indicates which variable with respect to
which a function is being differentiated.
When the bvar element is used to quantifiy a derivative,
the bvar element may contain a child degree element which
specifies the order of the derivative with respect to that
variable. The bvar element is also used for the internal
variable in sums and products.
</description>
<functorclass> Constructor </functorclass>
<signature> (symbol) -> symbol </signature>
<example> <bvar><ci>x</ci></bvar></example>
</MMLdefinition>
<MMLdefinition>
<Name> degree </Name>
<description> A parameter used by some
MathML data-types to specify that, for example,
a bound variable is repeated several times.
</description>
<functorclass> Constructor </functorclass>
<signature> (algebraic) -> algebraic </signature>
<example> <degree><ci>x</ci></degree></example>
<property> ... </property>
</MMLdefinition>
<MMLdefinition>
<Name> set </Name>
<description> Construct a set. </description>
<functorclass> Nary, Constructor </functorclass>
<signature> (anything*) -> set </signature>
</MMLdefinition>
<MMLdefinition>
<Name> list </Name>
<description> Construct a list. </description>
<functorclass> Nary, Constructor </functorclass>
<signature> (anything*) -> list </signature>
</MMLdefinition>
<MMLdefinition>
<Name> union </Name>
<description> The union of two sets. </description>
<functorclass> Binary, Function </functorclass>
<signature> (set*) -> set </signature>
</MMLdefinition>
<MMLdefinition>
<Name> intersection </Name>
<description> The intersection of two sets. </description>
<functorclass> Binary, Function </functorclass>
<signature> (set set) -> set </signature>
</MMLdefinition>
<MMLdefinition>
<Name> in </Name>
<description>
The membership testing operation (also commonly
called "in" or "including"). Returns true if the first
argument is part of the second argument. The second
argument must be a set.
</description>
<functorclass> Binary, Function </functorclass>
<signature> (anything, set) -> boolean </signature>
</MMLdefinition>
<MMLdefinition>
<Name> notin </Name>
<description>
The membership exclusion operation (also commonly
called "notin" or "including").
It is defined as "not in".
</description>
<functorclass> Binary, Function </functorclass>
<signature> (anything set) -> boolean </signature>
</MMLdefinition>
<MMLdefinition>
<Name> subset </Name>
<description>
Boolean function whose value is determined by
whether or not one set is a subset of another.
</description>
<functorclass> Binary, Function </functorclass>
<signature> (set*) -> boolean </signature>
</MMLdefinition>
<MMLdefinition>
<Name> prsubset </Name>
<description>
Boolean function whose value is determined by
whether or not one set is a proper subset of another.
</description>
<functorclass> Binary, Function </functorclass>
<signature> (set, set) -> boolean </signature>
<property>...</property>
</MMLdefinition>
<MMLdefinition>
<Name> notsubset </Name>
<description>
Boolean function whose value is the complement
of "subset".
</description>
<functorclass> Binary, Function </functorclass>
<signature> (set, set) -> boolean </signature>
<property>...</property>
</MMLdefinition>
<MMLdefinition>
<Name> notprsubset </Name>
<description>
Boolean function whose value is the complement
of "proper subset".
</description>
<functorclass> Binary, Function </functorclass>
<signature> (set, set) -> boolean </signature>
<property>...</property>
</MMLdefinition>
<MMLdefinition>
<Name> setdiff </Name>
<description>
Function indicating the difference of two sets.
</description>
<functorclass> Binary, Function </functorclass>
<signature> (set, set) -> set </signature>
<property>...</property>
</MMLdefinition>
<MMLdefinition> <Name> sum </Name> <description> The sum element denotes the summation operator. Upper and lower limits for the sum, and more generally a domains for the bound variables are specified using uplimit, lowlimit or a condition on the bound variables. The index for the summation is specified by a bvar element. The sum element takes the attribute definition which can be used to override the default semantics. </description> <functorclass> Unary, Function </functorclass> <signature> (bvar*,((lowlimit,uplimit)|condition),algebraic) -> sum </signature> <signature> ... </signature> </MMLdefinition>
<MMLdefinition> <Name> product </Name> <description> The product element denotes the product operator. Upper and lower limits for the product, and more generally a domains for the bound variables are specified using uplimit, lowlimit or a condition on the bound variables. The index for the product is specified by a bvar element. The product element takes the attribute definition which can be used to override the default semantics. </description> <functorclass> Unary, Function </functorclass> <signature> (bvar*,((lowlimit,uplimit)|condition),algebraic)
-> product </signature> <signature> ... </signature> <signature> ... </signature> </MMLdefinition>
<MMLdefinition> <Name> limit </Name> <description> The sum element denotes the summation operator. Upper and lower limits for the sum, and more generally a domains for the bound variables are specified using uplimit, lowlimit or a condition on the bound variables. The index for the summation is specified by a bvar element. </description> <functorclass> Nary, Function </functorclass> <signature> (bvar*,(lowlimit | condition*),algebraic)
-> limit </signature> </MMLdefinition>
<MMLdefinition> <Name> tendsto </Name> <description> tendsto is used to specify how a limit is computed. It accepts a type attribute that determines the manner in which it tends to a value. </description> <functorclass> binary, Function </functorclass> <signature> (symbol,anything) -> condition(limit) </signature> <signature> [type=direction](symbol,anything) ->
condition(limit) </signature> </MMLdefinition>
<MMLdefinition>
<Name> sin </Name>
<description> The circular trigonometric function sine
<Reference> M. Abramowitz and I. Stegun, Handbook of
Mathematical Functions, [4.3]
</Reference>
</description>
<functorclass> Unary, Function </functorclass>
<signature> real -> real </signature>
<signature> symbolic -> symbolic </signature>
<property> sin(0) = 0 </property>
<property> sin(integer*Pi) = 0 </property>
<property> sin((Z+1/2)*Pi) = (-1)^Z, "for integer Z" </property>
<property> -1 <= sin(real) </property>
<property> sin(real) <= 1 </property>
<property> sin(3*x)=-4*sin(x)^3+3*sin(x), "triple angle formula"
<Reference> ditto, [4.3.27] </Reference>
</property>
</MMLdefinition>
<MMLdefinition>
<Name> cos </Name>
<description> The cosine function.
<Reference> M. Abramowitz and I. Stegun, Handbook of
Mathematical Functions, [4.3]
</Reference>
</description>
<functorclass> Unary, Function </functorclass>
<signature> real -> real </signature>
<signature> symbolic -> symbolic </signature>
<property> cos(0) = 1 </property>
<property> cos(integer*Pi+Pi/2) = 0 </property>
<property> cos(Z*Pi) = (-1)^Z, "for integer Z" </property>
<property> -1 <= cos(real) </property>
<property> cos(real) <= 1 </property>
</MMLdefinition>
<MMLdefinition>
<Name> tan </Name>
<description> The tangent function.
<Reference> M. Abramowitz and I. Stegun, Handbook of
Mathematical Functions, [4.3]
</Reference>
</description>
<functorclass> Unary, Function </functorclass>
<signature> real -> real </signature>
<signature> symbolic -> symbolic </signature>
<property> tan(integer*Pi) = 0 </property>
<property> tan(x) = sin(x)/cos(x) </property>
</MMLdefinition>
<MMLdefinition>
<Name> sec </Name>
<description> The secant function.
<Reference> M. Abramowitz and I. Stegun, Handbook of
Mathematical Functions, [4.3]
</Reference>
</description>
<functorclass> Unary, Function </functorclass>
<signature> real -> real </signature>
<signature> symbolic -> symbolic </signature>
<property> sec(x) = 1/cos(x) </property>
</MMLdefinition>
<MMLdefinition>
<Name> csc </Name>
<description> The cosecant function.
<Reference> M. Abramowitz and I. Stegun, Handbook of
Mathematical Functions, [4.3]
</Reference>
</description>
<functorclass> Unary, Function </functorclass>
<signature> real -> real </signature>
<signature> symbolic -> symbolic </signature>
<property> csc(x) = 1/sin(x) </property>
</MMLdefinition>
<MMLdefinition>
<Name> cot </Name>
<description> The cotangent function.
<Reference> M. Abramowitz and I. Stegun, Handbook of
Mathematical Functions, [4.3]
</Reference>
</description>
<functorclass> Unary, Function </functorclass>
<signature> real -> real </signature>
<signature> symbolic -> symbolic </signature>
<property> cot(integer*Pi+Pi/2) = 0 </property>
<property> cot(x) = cos(x)/sin(x) </property>
</MMLdefinition>
<MMLdefinition>
<Name> sinh </Name>
<description> The hyperbolic sine function.
<Reference> M. Abramowitz and I. Stegun, Handbook of
Mathematical Functions, [4.3]
</Reference>
</description>
<functorclass> Unary, Function </functorclass>
<signature> real -> real </signature>
<signature> symbolic -> symbolic </signature>
<property>...</property>
</MMLdefinition>
<MMLdefinition>
<Name> sinh </Name>
<description> The hyperbolic sine function.
<Reference> M. Abramowitz and I. Stegun, Handbook of
Mathematical Functions, [4.3]
</Reference>
</description>
<functorclass> Unary, Function </functorclass>
<signature> real -> real </signature>
<signature> symbolic -> symbolic </signature>
<property>...</property>
</MMLdefinition>
<MMLdefinition>
<Name> tanh </Name>
<description> The hyperbolic tangent function.
<Reference> M. Abramowitz and I. Stegun, Handbook of
Mathematical Functions, [4.3]
</Reference>
</description>
<functorclass> Unary, Function </functorclass>
<signature> real -> real </signature>
<signature> symbolic -> symbolic </signature>
<property>...</property>
</MMLdefinition>
<MMLdefinition>
<Name> sech </Name>
<description> The hyperbolic secant function.
<Reference> M. Abramowitz and I. Stegun, Handbook of
Mathematical Functions, [4.3]
</Reference>
</description>
<functorclass> Unary, Function </functorclass>
<signature> real -> real </signature>
<signature> symbolic -> symbolic </signature>
<property>...</property>
</MMLdefinition>
<MMLdefinition>
<Name> csch </Name>
<description> The hyperbolic cosecant function.
<Reference> M. Abramowitz and I. Stegun, Handbook of
Mathematical Functions, [4.3]
</Reference>
</description>
<functorclass> Unary, Function </functorclass>
<signature> real -> real </signature>
<signature> symbolic -> symbolic </signature>
<property>...</property>
</MMLdefinition>
<MMLdefinition>
<Name> coth </Name>
<description> The hyperbolic cotangent function.
<Reference> M. Abramowitz and I. Stegun, Handbook of
Mathematical Functions, [4.3]
</Reference>
</description>
<functorclass> Unary, Function </functorclass>
<signature> real -> real </signature>
<signature> symbolic -> symbolic </signature>
<property>...</property>
</MMLdefinition>
<MMLdefinition>
<Name> arcsin </Name>
<description> The inverse of the sine function.
<Reference> M. Abramowitz and I. Stegun, Handbook of
Mathematical Functions, [4.4]
</Reference>
</description>
<functorclass> Unary, Function </functorclass>
<signature> real -> real </signature>
<signature> symbolic -> symbolic </signature>
<property> sin(arcsin(x)) = x </property>
<property> arcsin(sin(x)) = x, "for x between -Pi/2 and Pi/2" </property>
</MMLdefinition>
<MMLdefinition>
<Name> arccos </Name>
<description> The inverse of the cosine function.
<Reference> M. Abramowitz and I. Stegun, Handbook of
Mathematical Functions, [4.4]
</Reference>
</description>
<functorclass> Unary, Function </functorclass>
<signature> real -> real </signature>
<signature> symbolic -> symbolic </signature>
<property> cos(arccos(x)) = x </property>
<property> arccos(cos(x)) = x, "for x between 0 and Pi" </property>
</MMLdefinition>
<MMLdefinition>
<Name> arctan </Name>
<description> The inverse of the tangent function.
<Reference> M. Abramowitz and I. Stegun, Handbook of
Mathematical Functions, [4.4]
</Reference>
</description>
<functorclass> Unary, Function </functorclass>
<signature> real -> real </signature>
<signature> symbolic -> symbolic </signature>
<property> tan(arctan(x)) = x </property>
<property> arctan(tan(x)) = x, "for x between -Pi/2 and Pi/2" </property>
</MMLdefinition>
<MMLdefinition>
<Name> mean </Name>
<description>
Given k unspecified scalar arguments they are treated as equiprobable
values of a random variable and the mean is computed as:
mean( a1, a2, ... an) Sum( ai, i=1... n )/ n.
(see section 7.7 in CRC's Standard Mathematical tables and Formulae).
More generally, if the first argument is a symbol X of type
"discrete_random_variable", this is the 1st moment of the
random variable X and is defined as
E[ X ] = Sum( x*f(x), x in S )
where the probability that x = x_i is P( x = x_i) = f(x_i) .
The arguments are either all data, all discrete random variables,
or all continuous random variables.
The generalizes to continuous distributions and
k dimenions following the definitions provided in the reference:
<Reference> CRC Standard Mathematical Tables and Formulae,
editor: Dan Zwillinger, CRC Press Inc., 1996, [7.1.2] and [7.7]
</Reference>
</description>
<MMLattribute>
<name>type</name>
<values> random_variable | continuous_random_variable | data </value>
<default> data </default>
</MMLattribute>
<functorclass>Nary , Operator </functorclass>
<signature>(scalar*) -> scalar</signature>
<signature>(scalar(type=data)*) -> scalar</signature>
<signature>(symbol(type=random_variable)*) -> scalar</signature>
<signature>(symbol(type=continuous_random_variable)*) -> scalar</signature>
<property> </property>
</MMLdefinition>
<MMLdefinition>
<Name> sdev </Name>
<description>
This represents the standard deviation.
Given k unspecified scalar arguments they are treated as equiprobable
values of a random variable and the "standard deviation" is
computed as the square root of the second moment about the mean U.
sdev( a1, a2, ... an)^2 = E( (X - U)^2 ).
If the first argument is a symbol X of type
"discrete_random_variable", then all arguments are treated as
discrete random variables, instead of data and the second moment
about the mean is computed as
Sum( ( x_i - U )^2 * f(x_i) , x_i in S )
as
where the probability that x = x_i is P( x = x_i) = f(x_i) .
The arguments are either all data, all discrete random variables,
or all continuous random variables.
The generalizes to continuous distributions and to
k dimenions following the definitions found in:
<Reference> CRC Standard Mathematical Tables and Formulae,
editor: Dan Zwillinger, CRC Press Inc., 1996, [7.1.2] and [7.7]
</Reference>
</description>
<MMLattribute>
<name>type</name>
<values> random_variable | continuous_random_variable | data </value>
<default> data </default>
</MMLattribute>
<functorclass>Nary , Operator </functorclass>
<signature>(scalar*) -> scalar</signature>
<signature>(scalar(type=data)*) -> scalar</signature>
<signature>(symbol(type=discrete_random_variable)*) -> scalar</signature>
<signature>(symbol(type=continuous_random_variable)*) -> scalar</signature>
<property> </property>
</MMLdefinition>
<MMLdefinition>
<Name> var </Name>
<description>
This computes the second centered moment, also known as the variance.
Given k unspecified scalar arguments they are treated as equiprobable
values of a random variable and the "variance" is
computed as the second moment about the mean U.
var( a1, a2, ... an) = E( (X - U)^2 ).
If the first argument is a symbol X of type
"discrete_random_variable", then all arguments are treated as
discrete random variables, instead of data and the second moment
about the mean is computed as in section [7.7] (see reference below.)
Sum( ( x_i - U )^2 * f(x_i) , x_i in S )
as
where the probability that x = x_i is P( x = x_i) = f(x_i) .
The arguments are either all data, all discrete random variables,
or all continuous random variables.
The generalizes to continuous distributions and to
k dimenions following the definitions found in:
<Reference> CRC Standard Mathematical Tables and Formulae,
editor: Dan Zwillinger, CRC Press Inc., 1996, [7.1.2] and [7.7]
</Reference>
</description>
<MMLattribute>
<name>type</name>
<values> random_variable | continuous_random_variable | data </value>
<default> data </default>
</MMLattribute>
<functorclass>Nary , Operator </functorclass>
<signature>(scalar*) -> scalar</signature>
<signature>(scalar(type=data)*) -> scalar</signature>
<signature>(symbol(type=discrete_random_variable)*) -> scalar</signature>
<signature>(symbol(type=continuous_random_variable)*) -> scalar</signature>
</MMLdefinition>
<MMLdefinition>
<Name> median </Name>
<description>
This represents the median of n data values.
If n =2k + 1 then the mode is x_k.
If n = 2k then the median is (x_k + x_(k+1)/2).
(Note this discription assumes that the data has been
sorted into ascending order.)
<Reference> CRC Standard Mathematical Tables and Formulae,
editor: Dan Zwillinger, CRC Press Inc., 1996, [7.7]
</Reference>
</description>
<functorclass>Nary , Operator</functorclass>
<signature>(scalar*) -> scalar</signature>
</MMLdefinition>
<MMLdefinition>
<Name> mode </Name>
<description>
This represents the mode of n data values.
The mode is the data value that occurs with the
greatest frequency.
<Reference> CRC Standard Mathematical Tables and Formulae,
editor: Dan Zwillinger, CRC Press Inc., 1996, [7.7]
</Reference>
</description>
<functorclass>Nary , Operator</functorclass>
<signature>(scalar*) -> scalar</signature>
</MMLdefinition>
<MMLdefinition>
<Name> moment </Name>
<description>
This computes the ith moment of a set of data, or a random variable..
Given k scalar arguments of unspecified type, they are treated
as equiprobable values of a random variable. and the "moments" are
computed as the second moment about the mean U.
moment( degree=i, scalar*)= E( X^i ).
If the first data argument x1 is a symbol X of type
"discrete_random_variable", then all arguments are treated as
discrete random variables, instead of data and the ith moment
about the mean is computed as
Sum( (x)^i * f(x) , x in S )
where the probability that x = x_i is P( x = x_i) = f(x_i) .
The arguments are either all data, all discrete random variables,
or all continuous random variables.
The generalizes to continuous distributions and to
k dimenions following the definitions found in:
<Reference> CRC Standard Mathematical Tables and Formulae,
editor: Dan Zwillinger, CRC Press Inc., 1996, [7.1.2]
</Reference>
</description>
<MMLattribute>
<name>type</name>
<values> random_variable | continuous_random_variable | data </value>
<default> data </default>
</MMLattribute>
<functorclass>Nary , Operator </functorclass>
<signature>(degree,scalar*) -> scalar</signature>
<signature>(degree,scalar(type=data)*) -> scalar</signature>
<signature>(degree,symbol(type=discrete_random_variable)*) -> scalar</signature>
<signature>(degree, symbol(type=continuous_random_variable)*) -> scalar</signature>
</MMLdefinition>
<MMLdefinition> <Name> vector </Name> <description> A vector is an ordered n-tuple of values representing an element of an n-dimensional vector space. The "values" are all from the same ring, typically real or complex. They may be numbers, symbols, or general algebraic expressions. The type attribute can be used to specify the type of vector that is represented. <Reference> CRC Standard Mathematical Tables and Formulae, editor: Dan Zwillinger, CRC Press Inc., 1996, [2.4] </Reference> </description> <MMLattribute> <name> type </name> <value> real | complex | symbolic | anything </value> <default> real </default> </MMLattribute> <MMLattribute> <name> other </name> <value> row | column </value> <default> row </default> </MMLattribute> <functorclass> constructor , N-ary </functorclass> <signature> ((cn|ci|apply)*) -> vector(type=real) </signature> <signature> [type=vectortype]((cn|ci|apply)*) -> vector(type=vectortype) </signature><property> <!-- scalar multiplication--> <apply><forall/> <bvar><ci>b</ci></bvar> <bvar><ci>v1</ci></bvar> <bvar><ci>v2</ci></bvar> <reln> <apply><times/> <ci>ci>b</ci> <vector><ci>ci>v1</ci><ci>ci>v2</ci></vector> </apply> <vector> <apply><ci>b</ci><ci>v1</ci></apply> <apply><ci>b</ci><ci>v2</ci></apply> </vector> </reln> </apply> </property> <property> vector addition </property> <property> distributive over scalars</property> <property> associativity.</property> <property> Matrix * column vector </property> <property> row vector * Matrix </property> </property> </MMLdefinition>
<MMLdefinition>
<Name> matrix </Name>
<description>
This is the constructor for a matrix. The matrix is
constructed from matrix rows. The type and properties
spell out the normal interaction with vectors and
scalars.
<Reference> CRC Standard Mathematical Tables and Formulae,
editor: Dan Zwillinger, CRC Press Inc., 1996, [2.5.1]
</Reference>
</description>
<MMLattribute>
<name>type</name>
<value>real | complex | integer | symbolic | anything </value>
<default> real </default>
</MMLattribute>
<functorclass>constructor , N-ary </functorclass>
<signature>(matrixrow*) -> matrix</signature>
<signature>
[type=matrixtype](matrixrow*) ->
matrix(type=matrixtype)</signature>
<property>scalar multiplication </property>
<property>Matrix*column vector</property>
<property>Addition</property>
<property>Matrix*Matrix</property>
</MMLdefinition>
<MMLdefinition>
<Name> matrixrow </Name>
<description>
This is a constructor for describing the rows of a matrix.
This only occurs inside a matrix. Its "type" is determined
from the containing matrix element.
</description>
<functorclass>constructor , N-ary</functorclass>
<signature>(cn|ci|apply)->matrixrow </signature>
</MMLdefinition>
<MMLdefinition>
<Name>determinant</Name>
<description>The "determinant" of a matrix.
<Reference> CRC Standard Mathematical Tables and Formulae,
editor: Dan Zwillinger, CRC Press Inc., 1996, [2.5.4]
</Reference>
</description>
<functorclass>Unary, operator</functorclass>
<signature>(matrix)-> scalar </signature>
</MMLdefinition>
<MMLdefinition>
<Name> </Name>
<description>The transpose of a matrix or vector.
<Reference> CRC Standard Mathematical Tables and Formulae,
editor: Dan Zwillinger, CRC Press Inc., 1996, [2.4] and [2.5.1]
</Reference>
</description>
<functorclass>Unary, Operator</functorclass>
<signature>(vector)->vector(other=row)</signature>
<signature>[other=column](vector)->vector(other=row)</signature>
<signature>[other=row](vector)->vector(other=column)</signature>
<signature>(matrix)->matrix</signature>
<property>transpose(transpose(A))= A</property>
<property>transpose(transpose(V))= V</property>
</MMLdefinition>
<MMLdefinition>
<Name> select </Name>
<description>
The operator used to extract sub-objects from vectors, matrices
matrix rows and lists.
Elements are accessed by providing one index element for each
dimension. For Matrices, sub-matrices are selected by providing
one fewer index items. For a matrix A and a column vector V :
select( i,j , A )is the i,j th element of A.
select(i , A ) is the matrixrow formed from the ith row of A.
select( i , V ) is the ith element of V.
select( V ) is the sequence of all elements of V.
select(A) is the sequence of all elements of A, extracted row
by row.
select(i,L) is the ith element of a list.
select(L) is the sequence of elements of a list.
</description>
<functorclass>N-ary, operator)</functorclass>
<signature>(scalar,scalar,matrix)->scalar</signature>
<signature>(scalar,matrix)->matrixrow</signature>
<signature>(matrix)->scalar* </property>
<signature>(scalar,(vector|list|matrixrow))->scalar</signature>
<signature>(vector|list|matrixrow)->scalar*</signature>
<property>
Forall(
bvar(A(type=matrix)),bvar(V(type=vector)),
select(A) = select(V)
)
</property>
<property>For all vectors V, V = vector(select(V))</property>
</MMLdefinition>