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arxiv: 2001.04228 · v2 · pith:CD6Y7DZN · submitted 2020-01-13 · math.AG · cs.NA· math.NA

Solving Decomposable Sparse Systems

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classification math.AG cs.NAmath.NA
keywords systemsdecompositiongaloisimprimitivesparsedecomposablefamilygroup
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Amendola et al. proposed a method for solving systems of polynomial equations lying in a family which exploits a recursive decomposition into smaller systems. A family of systems admits such a decomposition if and only if the corresponding Galois group is imprimitive. When the Galois group is imprimitive we consider the problem of computing an explicit decomposition. A consequence of Esterov's classification of sparse polynomial systems with imprimitive Galois groups is that this decomposition is obtained by inspection. This leads to a recursive algorithm to solve decomposable sparse systems, which we present and give evidence for its efficiency.

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