Dom
::ExpressionField
Domains of expressions forming a field
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Dom::ExpressionField(<Normal, <IsZero>
>)
Dom::ExpressionField(Normal, IsZero)(e
)
Dom::ExpressionField(Normal, IsZero)
creates
a domain of expressions forming a field, where the functions Normal
and IsZero
are
used to normalize expressions and test for zero.
The function Normal
is used to normalize
the expressions representing the elements, the function IsZero
is
used to test the expressions for zero. It is assumed that the field
has characteristic 0.
The domain cannot decide if the element expressions—given the normalizing function and zero test—actually form a field. It is up to the user to choose correct functions for normalizing and zero test and to enter only valid expressions as domains elements.
One should view this domain constructor as a pragmatic way to
create a field of characteristic 0 in an adhoc fashion. Note that
the default of using id
and iszero
does not yield
a field really, but it is often convenient and sensible to use the
resulting structure as a field.
Normal
must be a function which takes an
expression representing a domain element and returns the normalized
expression. Normal
should return FAIL
if the expression
is not valid.
If Normal
is not given, then the system function id
is used, i.e., only
the kernel simplifier is used to normalize expressions.
If a normalizing function other than id
is given, it is assumed that this
functions returns a normal form where the zero element is uniquely
represented by the constant 0
.
IsZero
must be a function which takes an
expression representing a domain element and returns TRUE
if the expression
represents zero and FALSE
otherwise.
If IsZero
is not given, then iszero
@ Normal
is used for zero testing. If Normal
is
equal to id
this
functional expression is simplified to iszero
.
If Normal
is equal to id
and IsZero
is equal
to iszero
, a
façade domain is created, i.e., the domain elements are simply
expressions and are not explicitly created by new
.
Otherwise the elements of the domain are explicitly created
by new
. Each
such element has one operand, which is the expression representing
the domain element. The element expressions are normalized after each
operation using the function Normal
.
Dom::ExpressionField(Normal, IsZero)(e)
creates
a field element represented by the expression e
.
The expression is normalized using the function Normal
.
If Normal
returns FAIL
, it is assumed
that the expression does not represent a valid field element. If this
test is not fully implemented the domain cannot decide if the expression
represents a valid field element. In this case it is up to the user
to enter only valid expressions as field elements.
If Normal
is equal to id
and IsZero
is equal
to iszero
, the
domain is only a façade domain. In this case the expression e
is
returned after being simplified by the builtin kernel simplifier.
If Normal = id
and IsZero = iszero
,
then Dom::ArithmeticalExpression
,
else Dom::BaseDomain
.
If Normal = id
and IsZero = iszero
,
then Ax::efficientOperation ("_divide"), Ax::efficientOperation
("_mult"), Ax::efficientOperation("_invert")
, else Ax::normalRep
.
If Normal = id
and IsZero =
iszero
and IsZero = iszero
, then Ax::systemRep
.
Dom::ExpressionField(normal)
creates a field
of rational expressions over the rationals. The expressions representing
the field elements are allways normalized by normal
:
Fn := Dom::ExpressionField(normal): a := Fn((x^2  1)/(x  1))
The field elements are explicit elements of the domain:
domtype(a)
In the domain Dom::ExpressionField(id, iszero@normal)
the
expressions representing the elements are normalized by the kernel
simplifier only:
Fi := Dom::ExpressionField(id, iszero@normal): a := Fi((x^2  1)/(x  1))
The elements of this domain are not normalized (when viewed
as rational expressions over the rationals), thus the domain does
not have the axiom Ax::normalRep
:
b := a/Fi(x + 1)  Fi(1)
But nevertheless this domain also represents the field of rational
expressions over the rationals, because zero is detected correctly
by the function iszero @ normal
:
iszero(b)

A function used to normalize the expressions of the domain;
default is 

A function used to test the expressions of the domain for zero;
default is 

An expression representing a field element. 
"characteristic"  The characteristic of the fields created by this constructor
is assumed to be 
"one"  The element represented by the expression 
"zero"  The element represented by the expression 