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RegularChains[ConstructibleSetTools][RepresentingRegularSystems] - return the list of regular systems in a constructible set
Calling Sequence
RepresentingRegularSystems(cs, R)
Parameters
cs
-
constructible set
R
polynomial ring
Description
The command RepresentingRegularSystems(cs,R) returns a list of regular systems which defines the constructible set cs, that is, a list of regular systems (whose polynomials belong to R) such that the union of their zero sets is exactly equal to cs.
Recall that every constructible set built by the ConstructibleSetTools module is in fact represented by a list of regular systems representing it in the above sense.
See ConstructibleSetTools and RegularChains for the related mathematical concepts, in particular for the ideas of a constructible set, a regular system, and a regular chain.
The command RepresentingRegularSystems is part of the RegularChains[ConstructibleSetTools] package, so it can be used in the form RepresentingRegularSystems(..) only after executing the command with(RegularChains[ConstructibleSetTools]). However, it can always be accessed through the long form of the command by using RegularChains[ConstructibleSetTools][RepresentingRegularSystems](..).
Examples
First, define a polynomial ring and two polynomials of .
Using GeneralConstruct, construct a constructible set from the common solutions of and which do not cancel
Now retrieve the regular systems from cs.
Next extract the representing chains and inequations
The first inequation is since this polynomial can vanish inside the quasi-component of the first regular chain.
The second inequation is simply since cannot vanish inside the quasi-component of the second regular chain.
See Also
ConstructibleSet, ConstructibleSetTools, GeneralConstruct, Info, QuasiComponent, RegularChains, RegularSystem, RepresentingChain
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