decomposeMonomialAlgebra f
decomposeMonomialAlgebra R
decomposeMonomialAlgebra B
decomposeMonomialAlgebra(B,A)
decomposeMonomialAlgebra M
Let K[B] be the monomial algebra of the degree monoid of the target of f and analogously K[A] for source of f. Assume that K[B] is finite as a K[A]-module.
The monomial algebra K[B] is decomposed as a direct sum of monomial ideals in K[A] with twists in G(B).
If R with degrees B is specified then A is computed via findGeneratorsOfSubalgebra.
Note that the shift chosen by the function depends on the monomial ordering of K[A] (in the non-simplicial case).
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Decomposition over a polynomial ring
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Specifying R:
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Specifying a monomial algebra:
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Specifying a monomial curve by a list of positive integers:
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Some simpler examples:
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Consider the family of smooth monomial curves in $\mathbb{P}^3$, the one of degree $d$ having parametrization $$ (s,t) \rightarrow (s^d, s^{d-1}t, st^{d-1} t^d) \in \mathbb{P}^3. $$
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See also decomposeHomogeneousMA:
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The object decomposeMonomialAlgebra is a method function with options.