Author:
Hashemi Amir,Orth Matthias,Seiler Werner M.
Abstract
AbstractComplementary decompositions of monomial ideals—also known as Stanley decompositions—play an important role in many places in commutative algebra. In this article, we discuss and compare several algorithms for their computation. This includes a classical recursive one, an algorithm already proposed by Janet and a construction proposed by Hironaka in his work on idealistic exponents. We relate Janet’s algorithm to the Janet tree of the Janet basis and extend this idea to Janet-like bases to obtain an optimised algorithm. We show that Hironaka’s construction terminates, if and only if the monomial ideal is quasi-stable. Furthermore, we show that in this case the algorithm of Janet determines the same decomposition more efficiently. Finally, we briefly discuss how these results can be used for the computation of primary and irreducible decompositions.
Publisher
Springer Science and Business Media LLC
Subject
Applied Mathematics,Algebra and Number Theory
Reference34 articles.
1. Albert, M., Fetzer, M., Sáenz-de Cabezón, E., Seiler, W.: On the free resolution induced by a Pommaret basis. J. Symb. Comp. 68(2), 4–26 (2015)
2. Albert, M., Fetzer, M., Seiler, W.: Janet bases and resolutions in CoCoALib. Computer algebra in scientific computing. CASC 2015, pp. 15–29. Springer-Verlag, Chaim (2015)
3. Albert, M., Seiler, W.: Resolving decompositions for polynomial modules. Mathematics 6, 161 (2018)
4. Alonso, M., Castro-Jiménez, F., Hauser, H.: Encoding algebraic power series. Found. Comp. Math. 18, 789–833 (2018)
5. Alonso, M.E., Marinari, M.G., Mora, T.: Oracle-supported drawing of the Gröbner escalier. Atti Accad. Peloritana dei Pericolanti 98(2), A3 (2020)
Cited by
2 articles.
订阅此论文施引文献
订阅此论文施引文献,注册后可以免费订阅5篇论文的施引文献,订阅后可以查看论文全部施引文献