computes reduced forms modulo regular differential chains - Maple Help

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DifferentialAlgebra[ReducedForm] - computes reduced forms modulo regular differential chains

Calling Sequence

ReducedForm (p, ideal, opts)

ReducedForm (L, ideal, opts)

Parameters

p

-

a differential polynomial

ideal

-

a differential polynomial ideal or ring

L

-

a list or a set of differential polynomials

opts (optional)

-

a sequence of options

Description

• 

Assume ideal is a regular differential chain. Denote R its embedding differential polynomial ring and I the differential ideal that it defines.

• 

The function call ReducedForm (p, ideal) returns a differential polynomial, which is a reduced form of p in R/I, as explained below.

• 

The reduced form of a differential polynomial p, is a differential polynomial q, equivalent to p modulo I. It is 0 if p belongs to I. If p does not belong to I, its reduced form is obtained by applying some simplifications, using the regular differential chain, without introducing any rational fraction in the result.

• 

The function call ReducedForm (L, ideal) returns the list or the set of the reduced forms of the elements of L with respect to ideal.

• 

If ideal is a list of regular differential chains, then the function call ReducedForm (p, ideal) returns the list of the reduced forms of p with respect to all the chains, and, the function call ReducedForm (L, ideal) returns the list of the reduced forms of L with respect to all the chains.

• 

If ideal is a differential polynomial ring, then the function call ReducedForm (p, ideal) returns p, and, the function call ReducedForm (L, ideal) returns L. In both cases, the differential polynomials are expanded.

• 

This command is part of the DifferentialAlgebra package. It can be called using the form ReducedForm(...) after executing the command with(DifferentialAlgebra). It can also be directly called using the form DifferentialAlgebra[ReducedForm](...).

Examples

withDifferentialAlgebra:

R:=DifferentialRingderivations=x,y,blocks=w,v,u,t

R:=differential_ring

(1)

ideal:=RosenfeldGroebnerux24u,ux,yvyu+1,vx,xux,R

ideal:=regular_differential_chain

(2)

Equationsideal,solved

vx,x=ux,vy=14uuxuy+uxuyu,ux2=4u,uy2=2u

(3)

The simplification by the above rewrite rules is not performed since it would give a rational differential fraction

ReducedFormvy,ideal

vy

(4)

The simplification is performed, however, in this case

ReducedFormuvy,ideal

14uxuyu14uxuy

(5)

In this case, the reduced form is obtained by simplifying partially the differential polynomial

p:=w+1uvy+ux,yt

p:=w+1uvy+ux,yt

(6)

rf:=ReducedFormp,ideal1

rf:=14wuxuyu14wuxuy+14uxuyu+ux,yt14uxuy

(7)

BelongsToprf,ideal1

true

(8)

See Also

DifferentialAlgebra, RosenfeldGroebner, NormalForm, BelongsTo, PDEtools[ReducedForm]


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