Your search keyword '"monomial order"' showing total 203 results

1. When does a perturbation of the equations preserve the normal cone?

Author

Quy, Pham Hung and Trung, Ngo Viet

Subjects

*PERTURBATION theory, *HILBERT functions, *ALGEBRAIC geometry, *LOCAL rings (Algebra)

Abstract

Let (R,\frak {m}) be a local ring and I, J two arbitrary ideals of R. Let gr_J(R/I) denote the associated graded ring of R/I with respect to J, which corresponds to the normal cone in algebraic geometry. With regards to the finite determinacy of singularity with respect to the Jacobian ideal we study the problem for which ideal I = (f_1,\dots,f_r) does there exist a number N such that if f_i' \equiv f_i \mod J^N, i = 1,\dots,r, and I' = (f_1',\dots,f_r'), then gr_J(R/I) \cong gr_J(R/I'). This problem arises from a recent result of Ma, Quy and Smirnov in the case J is an \frak {m}-primary ideal, which solves a long standing conjecture of Srinivas and Trivedi on the invariance of Hilbert functions under small perturbations. Their approach involves Hilbert functions and cannot be used to study the above general problem. Our main result shows that such a number N exists if f_1,\dots,f_r is locally a regular sequence outside the locus of J. It has interesting applications to a range of related problems. [ABSTRACT FROM AUTHOR]

Published

2023

2. پایه گربنر ایدهآلهای دترمینانی.

Author

پایه گربنر ایدهآ

Abstract

Introduction Determinantal ideals are one of important topics in Algebraic Geometry and Commutative Algebra. There are several examples of varieties as rational normal scrolls which their defining ideals are generated by minors of a matrix. In general, Grobner bases for an ideals helps us to correspond a monomial ideal to the main ideal with the same invariants in some senses. In this paper, we compute a Grobner bases for an ideal generated by 2-minors of a 2×n matrix of monomials. Main results Let S = k[x1, ..., xn] be the polynomial ring over a field k. Let for 1 ≤ i ≤ n, Xi = {xil, 1 ≤ l ≤ s} for some positive integer s. Let M= [ m11(X1 ) ⋯ m1n (Xn) ⋮ ... ⋮ mt1 (X1) ⋯ mtn(Xn)] be a matrix such that mij(Xj) is a monomial of indeterminates in Xj. A t-minor [r1 r2 ... rt | c1 c2 ... ct] of M is determinant of the submatrix with rows r1 r2 ... rt and columns c1 c2 ... ct. Let It (M) be the ideal generated by all t-minors of M. Let ≤ be a monomial order and the following conditions are satisfied: 1. Each column is decreasing from top to bottom. 2. Each monomial in a column is greater that each monomial in a column in the right. 3. Each two monomials are different. With these assumptions, we have the following theorem. Theorem. For t = 2, set of all 2-minors of M is a Grobner bases for I2 (M). Proposition. Height of It (M) is equal to n-t+1. Conclusion A 2 by n matrix of monomials appears in some topics of algebraic combinatorics and if we omit each one of the above conditions, the theorem might be false. [ABSTRACT FROM AUTHOR]

Published

2023

3. Semi-ring Based Gröbner–Shirshov Bases over a Noetherian Valuation Ring

Author

Diop, Yatma, Mesmoudi, Laila, Sow, Djiby, Siles Molina, Mercedes, editor, El Kaoutit, Laiachi, editor, Louzari, Mohamed, editor, Ben Yakoub, L'Moufadal, editor, and Benslimane, Mohamed, editor

Published

2020

4. Valuative dimension and monomial orders.

Author

Kemper, Gregor and Yengui, Ihsen

Subjects

*ORDER, *ANALOGY

Abstract

The main result from this note provides a constructive characterization of the valuative dimension, which bears a strong analogy to Lombardi's [7] constructive characterization of the Krull dimension. While Lombardi's characterization uses the lexicographic monomial order, ours uses the graded (reverse) lexicographic order or, in fact, any graded rational monomial order. Apart from this, the paper contains some related results and some examples which readers may find illuminating. [ABSTRACT FROM AUTHOR]

Published

2020

5. The syzygy theorem for Bezout rings.

Author

Gamanda, Maroua, Lombardi, Henri, Neuwirth, Stefan, and Yengui, Ihsen

Subjects

*GROBNER bases

Abstract

We provide constructive versions of Hilbert's syzygy theorem for Z and Z/NZ following Schreyer's method. Moreover, we extend these results to arbitrary coherent strict Bézout rings with a divisibility test for the case of finitely generated modules whose module of leading terms is finitely generated. [ABSTRACT FROM AUTHOR]

Published

2020

6. Gröbner Bases

Author

Lakshmibai, V., Brown, Justin, Alladi, Krishnaswami, Series editor, Farkas, Hershel M., Series editor, Lakshmibai, V., and Brown, Justin

Published

2015

7. Constructive Ideal Theory

Author

Derksen, Harm, Kemper, Gregor, Gamkrelidze, Revaz V., Founded by, Derksen, Harm, and Kemper, Gregor

Published

2015

8. Gröbner Bases

Author

Cox, David A., Little, John, O’Shea, Donal, Axler, Sheldon, Series Editor, Ribet, Kenneth, Series Editor, Adams, Colin, Advisory Editor, Cox, David A., Advisory Editor, Gorkin, Pamela, Advisory Editor, Howe, Roger E., Advisory Editor, Orrison, Michael, Advisory Editor, Pipher, Jill, Advisory Editor, Santosa, Fadil, Advisory Editor, Little, John, and O’Shea, Donal

Published

2015

9. Additional Gröbner Basis Algorithms

Author

Cox, David A., Little, John, O’Shea, Donal, Axler, Sheldon, Series Editor, Ribet, Kenneth, Series Editor, Adams, Colin, Advisory Editor, Cox, David A., Advisory Editor, Gorkin, Pamela, Advisory Editor, Howe, Roger E., Advisory Editor, Orrison, Michael, Advisory Editor, Pipher, Jill, Advisory Editor, Santosa, Fadil, Advisory Editor, Little, John, and O’Shea, Donal

Published

2015

10. Gröbner Bases

Author

Grozin, Andrey, Needs, Richard, Series editor, Rhodes, William T., Series editor, Stanley, Harry Eugene, Series editor, Stutzmann, Martin, Series editor, and Grozin, Andrey

Published

2014

11. Adjoining Identities and Zeros to Semigroups

Author

Nathanson, Melvyn B. and Nathanson, Melvyn B., editor

Published

2014

12. Preliminaries on GIT

Author

Bini, Gilberto, Felici, Fabio, Melo, Margarida, Viviani, Filippo, Morel, J.-M., Editor-in-chief, Teissier, Bernard, Editor-in-chief, De Lellis, Camillo, Series editor, di Bernardo, Mario, Series editor, Figalli, Alessio, Series editor, Khoshnevisan, Davar, Series editor, Kontoyiannis, Ioannis, Series editor, Lugosi, Gabor, Series editor, Podolskij, Mark, Series editor, Serfaty, Sylvia, Series editor, Stroppel, Catharina, Series editor, Wienhard, Anna, Series editor, Bini, Gilberto, Felici, Fabio, Melo, Margarida, and Viviani, Filippo

Published

2014

13. Noetherianity up to Symmetry

Author

Draisma, Jan, Zecca, Pietro, Series editor, Conca, Aldo, Di Rocco, Sandra, Draisma, Jan, Huh, June, Sturmfels, Bernd, and Viviani, Filippo

Published

2014

14. Gröbner Bases and Buchberger’s Algorithm

Author

Joswig, Michael, Theobald, Thorsten, Joswig, Michael, and Theobald, Thorsten

Published

2013

15. A counterexample to the Gröbner ring conjecture

Author

Ihsen Yengui

Subjects

Combinatorics, Ring (mathematics), Algebra and Number Theory, Conjecture, Mathematics::Commutative Algebra, Domain (ring theory), Krull dimension, Ideal (ring theory), Monomial order, Valuation (algebra), Counterexample, Mathematics

Abstract

We propose a counterexample to the Grobner ring conjecture in the irrational case. More precisely, we construct a valuation domain V of Krull dimension 1 and a finitely generated ideal J of V [ X , Y ] equipped with some irrational monomial order LT ( J ) generated by the leading terms of the elements of J is not finitely generated.

Published

2021

16. Algorithm for Testing the Leibniz Algebra Structure

Author

Casas, José Manuel, Insua, Manuel A., Ladra, Manuel, Ladra, Susana, Hutchison, David, Series editor, Kanade, Takeo, Series editor, Kittler, Josef, Series editor, Kleinberg, Jon M., Series editor, Mattern, Friedemann, Series editor, Mitchell, John C., Series editor, Naor, Moni, Series editor, Nierstrasz, Oscar, Series editor, Pandu Rangan, C., Series editor, Steffen, Bernhard, Series editor, Sudan, Madhu, Series editor, Terzopoulos, Demetri, Series editor, Tygar, Doug, Series editor, Vardi, Moshe Y., Series editor, Weikum, Gerhard, Series editor, Moreno-Díaz, Roberto, editor, Pichler, Franz, editor, and Quesada-Arencibia, Alexis, editor

Published

2009

17. A Gröbner Basis Approach to CNF-Formulae Preprocessing

Author

Condrat, Christopher, Kalla, Priyank, Hutchison, David, editor, Kanade, Takeo, editor, Kittler, Josef, editor, Kleinberg, Jon M., editor, Mattern, Friedemann, editor, Mitchell, John C., editor, Naor, Moni, editor, Nierstrasz, Oscar, editor, Rangan, C. Pandu, editor, Steffen, Bernhard, editor, Sudan, Madhu, editor, Terzopoulos, Demetri, editor, Tygar, Doug, editor, Vardi, Moshe Y., editor, Weikum, Gerhard, editor, Grumberg, Orna, editor, and Huth, Michael, editor

Published

2007

18. Computing Gröbner Bases for Vanishing Ideals of Finite Sets of Points

Author

Farr, Jeffrey B., Gao, Shuhong, Hutchison, David, editor, Kanade, Takeo, editor, Kittler, Josef, editor, Kleinberg, Jon M., editor, Mattern, Friedemann, editor, Mitchell, John C., editor, Naor, Moni, editor, Nierstrasz, Oscar, editor, Pandu Rangan, C., editor, Steffen, Bernhard, editor, Sudan, Madhu, editor, Terzopoulos, Demetri, editor, Tygar, Dough, editor, Vardi, Moshe Y., editor, Weikum, Gerhard, editor, Fossorier, Marc P. C., editor, Imai, Hideki, editor, Lin, Shu, editor, and Poli, Alain, editor

Published

2006

19. Janet-Like Monomial Division

Author

Gerdt, Vladimir P., Blinkov, Yuri A., Hutchison, David, editor, Kanade, Takeo, editor, Kittler, Josef, editor, Kleinberg, Jon M., editor, Mattern, Friedemann, editor, Mitchell, John C., editor, Naor, Moni, editor, Nierstrasz, Oscar, editor, Pandu Rangan, C., editor, Steffen, Bernhard, editor, Sudan, Madhu, editor, Terzopoulos, Demetri, editor, Tygar, Dough, editor, Vardi, Moshe Y., editor, Weikum, Gerhard, editor, Ganzha, Victor G., editor, Mayr, Ernst W., editor, and Vorozhtsov, Evgenii V., editor

Published

2005

20. Automatic selection of the Groebner Basis’ monomial order employed for the synthesis of the inverse kinematic model of non-redundant open-chain robotic systems

Author

Ángel Valera Fernández, Vicente Mata Amela, Miguel Díaz-Rodríguez, and José Guzmán-Giménez

Subjects

Computer science, Mechanical Engineering, General Mathematics, Aerospace Engineering, Inverse, 020101 civil engineering, Ocean Engineering, 02 engineering and technology, Kinematics, Condensed Matter Physics, 0201 civil engineering, Computer Science::Robotics, Gröbner basis, 020303 mechanical engineering & transports, Robotic systems, 0203 mechanical engineering, Chain (algebraic topology), Mechanics of Materials, Automotive Engineering, Robot, Algorithm, Monomial order, Selection (genetic algorithm), Civil and Structural Engineering

Abstract

The methods most commonly used to synthesize the Inverse Kinematic Model (IKM) of open-chain robotic systems strongly depend on the robot’s geometry, which make them difficult to systematize. In a ...

Published

2021

21. Noether Normalization theorem and dynamical Gröbner bases over Bezout domains of Krull dimension 1.

Author

Gamanda, Maroua and Yengui, Ihsen

Subjects

*GROBNER bases, *DYNAMICAL systems, *BEZOUT'S identity, *KRULL rings, *DIMENSION theory (Topology), *BRANCHING processes

Abstract

We propose a new version of Noether normalization theorem over Bezout domains of Krull dimension one (the ring Z of integers as main example). We also show that one can avoid branching when computing dynamical Gröbner bases over a Bezout domain of Krull dimension one. [ABSTRACT FROM AUTHOR]

Published

2017

22. Joins, ears and Castelnuovo–Mumford regularity

Author

Rafael H. Villarreal, M. Vaz Pinto, and Jorge Alexandre Barbosa Neves

Subjects

Algebra and Number Theory, Polynomial ring, 010102 general mathematics, Graded ring, Ear decomposition, 01 natural sciences, Upper and lower bounds, Vertex (geometry), Combinatorics, Castelnuovo–Mumford regularity, 0103 physical sciences, Bipartite graph, 010307 mathematical physics, 0101 mathematics, Monomial order, Mathematics

Abstract

We introduce a new class of polynomial ideals associated to a simple graph, G. Let K [ E G ] be the polynomial ring on the edges of G and K [ V G ] the polynomial ring on the vertices of G. We associate to G an ideal, I ( X G ) , defined as the preimage of ( x i 2 − x j 2 : i , j ∈ V G ) ⊆ K [ V G ] by the map K [ E G ] → K [ V G ] which sends a variable, t e , associated to an edge e = { i , j } , to the product x i x j of the variables associated to its vertices. We show that K [ E G ] / I ( X G ) is a one-dimensional, Cohen–Macaulay, graded ring and we relate its degree with the number of vertices and connected components of the graph. We show that I ( X G ) is a binomial ideal and that, with respect to a fixed monomial order, its initial ideal has a generating set independent of the field K. We focus on the Castelnuovo–Mumford regularity of I ( X G ) providing the following sharp upper and lower bounds: μ ( G ) ≤ reg I ( X G ) ≤ | V G | − b 0 ( G ) + 1 , where μ ( G ) is the maximum vertex join number of the graph and b 0 ( G ) is the number of its connected components. We show that the lower bound is attained for a bipartite graph and use this to derive a new combinatorial result on the number of even length ears of nested ear decomposition.

Published

2020

23. Completing the Classification of Representations of SLn with Complete Intersection Invariant Ring

Author

Lukas Braun

Subjects

Algebra and Number Theory, 010102 general mathematics, Complete intersection, Special linear group, 0102 computer and information sciences, 01 natural sciences, Global dimension, Algebra, symbols.namesake, Gröbner basis, 010201 computation theory & mathematics, symbols, Geometry and Topology, 0101 mathematics, Invariant (mathematics), Complex number, Monomial order, Mathematics, Hilbert–Poincaré series

Abstract

We present a full list of all representations of the special linear group SLnover the complex numbers with complete intersection invariant ring of homological dimension greater than or equal to two, completing the classification of Shmelkin. For this task, we combine three techniques. Firstly, the graph method for invariants of SLndeveloped by the author to compute invariants, covariants and explicit forms of syzygies. Secondly, a new algorithm for finding a monomial order such that a certain basis of an ideal is a Gröbner basis with respect to this order, in between usual Gröbner basis computation and computation of the Gröbner fan. Lastly, a modification of an algorithm by Xin for MacMahon partition analysis to compute Hilbert series.

Published

2020

24. Completion in Operads via Essential Syzygies

Author

Philippe Malbos, Isaac Ren, Algèbre, géométrie, logique (AGL), Institut Camille Jordan [Villeurbanne] (ICJ), École Centrale de Lyon (ECL), Université de Lyon-Université de Lyon-Université Claude Bernard Lyon 1 (UCBL), Université de Lyon-Université Jean Monnet [Saint-Étienne] (UJM)-Institut National des Sciences Appliquées de Lyon (INSA Lyon), Université de Lyon-Institut National des Sciences Appliquées (INSA)-Institut National des Sciences Appliquées (INSA)-Centre National de la Recherche Scientifique (CNRS)-École Centrale de Lyon (ECL), Université de Lyon-Institut National des Sciences Appliquées (INSA)-Institut National des Sciences Appliquées (INSA)-Centre National de la Recherche Scientifique (CNRS), École normale supérieure - Lyon (ENS Lyon), Association for Computing Machinery, Institut Camille Jordan (ICJ), Université de Lyon-Institut National des Sciences Appliquées de Lyon (INSA Lyon), Université de Lyon-Institut National des Sciences Appliquées (INSA)-Institut National des Sciences Appliquées (INSA)-Université Jean Monnet - Saint-Étienne (UJM)-Centre National de la Recherche Scientifique (CNRS)-École Centrale de Lyon (ECL), Université de Lyon-Institut National des Sciences Appliquées (INSA)-Institut National des Sciences Appliquées (INSA)-Université Jean Monnet - Saint-Étienne (UJM)-Centre National de la Recherche Scientifique (CNRS), and École normale supérieure de Lyon (ENS de Lyon)

Subjects

Non commutative Gröbner bases, Computation, 010103 numerical & computational mathematics, Minimal models, Mathematics::Algebraic Topology, 01 natural sciences, Gröbner basis, Mathematics::K-Theory and Homology, Mathematics::Quantum Algebra, Mathematics::Category Theory, ComputingMethodologies_SYMBOLICANDALGEBRAICMANIPULATION, Computer Science::Symbolic Computation, Ideal (order theory), [MATH]Mathematics [math], 0101 mathematics, Monomial order, Associative property, Mathematics, Hilbert's syzygy theorem, Mathematics::Commutative Algebra, computing with syzygies, 010102 general mathematics, completion algorithms, Algebra, rewriting in operads, Rewriting

Abstract

International audience; We introduce an improved Gröbner basis completion algorithm for operads. To this end, we define operadic rewriting systems as a machinery to rewrite in operads, whose rewriting rules do not necessarily depend on an ambient monomial order. A Gröbner basis of an operadic ideal can be seen as a confluent and terminating operadic rewriting system; thus, the completion of a Gröbner basis is equivalent to the completion of a rewriting system. We improve the completion algorithm by filtering out redundant S-polynomials and testing only essential ones. Finally, we show how the notion of essential S-polynomials can be used to compute Gröbner bases for syzygy bimodules. This work is motivated by the computation of minimal models of associative algebras and symmetric operads. In this direction, we show how our completion algorithm extends to the case of shuffle operads. CCS Concepts • Computing methodologies → Combinatorial algorithms; Algebraic algorithms.

Published

2021

25. The syzygy theorem for Bézout rings

Author

Stefan Neuwirth, Ihsen Yengui, Henri Lombardi, Maroua Gamanda, Département de Mathematiques [Sfax], Faculté des Sciences de Sfax, Université de Sfax - University of Sfax-Université de Sfax - University of Sfax, Laboratoire de Mathématiques de Besançon (UMR 6623) (LMB), Université de Bourgogne (UB)-Université de Franche-Comté (UFC), Université Bourgogne Franche-Comté [COMUE] (UBFC)-Université Bourgogne Franche-Comté [COMUE] (UBFC)-Centre National de la Recherche Scientifique (CNRS), John Templeton Foundation (ID 60842), ANR-15-IDEX-0003,BFC,ISITE ' BFC(2015), Fédération Bourgogne Franche-Comté Mathématiques (BFC-Math ), Université de Bourgogne (UB)-Centre National de la Recherche Scientifique (CNRS)-Université de Franche-Comté (UFC), Université Bourgogne Franche-Comté [COMUE] (UBFC)-Université Bourgogne Franche-Comté [COMUE] (UBFC)-Université de Bourgogne (UB)-Centre National de la Recherche Scientifique (CNRS)-Université de Franche-Comté (UFC), Université Bourgogne Franche-Comté [COMUE] (UBFC)-Université Bourgogne Franche-Comté [COMUE] (UBFC), and ANR: 15-IDEX-0003,BFC,ISITE « BFC(2015)

Subjects

Pure mathematics, [MATH.MATH-AC]Mathematics [math]/Commutative Algebra [math.AC], Schreyer's syzygy algorithm, 010103 numerical & computational mathematics, 01 natural sciences, Constructive, Valuation ring, MSC 2010: 13D02, 13P10, 13C10, 13P20, 14Q20, Finitely-generated abelian group, 0101 mathematics, Syzygy theorem, Gröbner ring, Monomial order, strict Bézout ring, Mathematics, Algebra and Number Theory, Hilbert's syzygy theorem, Mathematics::Commutative Algebra, monomial order, valuation ring, Applied Mathematics, 010102 general mathematics, free resolution, Divisibility rule, Mathematics - Commutative Algebra, 16. Peace & justice, dynamical Gröbner basis, 13D02, 13P10, 13C10, 13P20, 14Q20, Schreyer's monomial order, Computational Mathematics

Abstract

International audience; We provide constructive versions of Hilbert's syzygy theorem for Z and Z/nZ following Schreyer's method. Moreover, we extend these results to arbitrary coherent strict Bézout rings with a divisibility test for the case of finitely generated modules whose module of leading terms is finitely generated.

Published

2019

26. Lyubeznik and Betti numbers for homogeneous ideals

Author

Farhad Rahmati and Parvaneh Nadi

Subjects

Pure mathematics, cohomologically full rings, 13D45, Mathematics::Commutative Algebra, 13F55, Betti number, General Mathematics, Polynomial ring, initial ideals, Field (mathematics), Homogeneous, Betti numbers, Lyubeznik numbers, 13P10, Monomial order, Mathematics

Abstract

Let [math] be the standard graded polynomial ring over a field [math] . We’ll study the Lyubeznik numbers of two homogeneous ideals of [math] whose initial ideals are linked for some monomial order over [math] . We’ll also investigate some relations between Lyubeznik and Betti numbers of homogeneous ideals.

Published

2020

27. Krull dimension and monomial orders.

Author

Kemper, Gregor and Viet Trung, Ngo

Subjects

*KRULL rings, *RING theory, *STOCHASTIC sequences, *POLYNOMIALS, *NOETHERIAN rings, *LOCAL rings (Algebra)

Abstract

Abstract: We introduce the notion of independent sequences with respect to a monomial order by using the least terms of polynomials vanishing at the sequence. Our main result shows that the Krull dimension of a Noetherian ring is equal to the supremum of the length of independent sequences. The proof has led to other notions of independent sequences, which have interesting applications. For example, we can show that is the maximum number of analytically independent elements in an arbitrary ideal J of a local ring R and that if are (not necessarily finitely generated) subalgebras of a finitely generated algebra over a Noetherian Jacobson ring. [Copyright &y& Elsevier]

Published

2014

28. Universal Lex Ideal Approximations of Extended Hilbert Functions and Hamilton Numbers

Author

Melvin Hochster and Tigran Ananyan

Subjects

Polynomial, Hilbert series and Hilbert polynomial, Sequence, Algebra and Number Theory, Degree (graph theory), Mathematics::Commutative Algebra, Polynomial ring, 010102 general mathematics, Field (mathematics), Commutative Algebra (math.AC), Mathematics - Commutative Algebra, 01 natural sciences, Combinatorics, symbols.namesake, 0103 physical sciences, symbols, FOS: Mathematics, 010307 mathematical physics, Ideal (ring theory), 0101 mathematics, Monomial order, Mathematics

Abstract

Let R ( h ) denote the polynomial ring in variables x 1 , … , x h over a specified field K. We consider all of these rings simultaneously, and in each use lexicographic (lex) monomial order with x 1 > ⋯ > x h . Given a fixed homogeneous ideal I in R ( h ) , for each d there is unique lex ideal generated in degree at most d whose Hilbert function agrees with the Hilbert function of I up to degree d. When we consider I R ( N ) for N ≥ h , the set B d ( I , N ) of minimal generators for this lex ideal in degree at most d may change, but B d ( I , N ) is constant for all N ≫ 0 . We let B d ( I ) denote the set of generators one obtains for all N ≫ 0 , and we let b d = b d ( I ) be its cardinality. The sequences b 1 , … , b d , … obtained in this way may grow very fast. Remarkably, even when I = ( x 1 2 , x 2 2 ) , one obtains a very interesting sequence, 0 , 2 , 3 , 4 , 6 , 12 , 924 , 409620 , … . This sequence is the same as H d − 1 + 1 for d ≥ 2 , where H d is the dth Hamilton number. The Hamilton numbers were studied by Hamilton and by Hammond and Sylvester because of their occurrence in a counting problem connected with the use of Tschirnhaus transformations in manipulating polynomial equations.

Published

2020

29. Noncommutative Gröbner Bases: Applications and Generalizations

Author

Philippe Malbos

Subjects

Algebra, Gröbner basis, Computer Science::Logic in Computer Science, Confluence, Rewriting, Algebraic number, Noncommutative geometry, Associative property, Monomial order, Resolution (algebra), Mathematics

Abstract

The aim of this chapter is to provide a summary of the theory of linear rewriting and the application of this theory to the construction of free resolutions for associative algebras. In Sect. 2, we present linear polygraphs as an algebraic setting for linear rewriting without a monomial order, and we review the fundamental notion of linear polygraphs. In Sect. 3, we recall several historical constructions on linear rewriting systems for associative algebras, and we show how the confluence properties are studied in these different approaches. We relate the notion of convergent linear polygraph with the notion of noncommutative Grobner basis. In Sect. 4, we describe an algorithmic way to compute free resolutions for algebras using a method introduced by Anick. Section 5 deals with extension of linear polygraphs, seen as higher dimensional linear rewriting systems, into polygraphic resolutions for algebras. We show how to construct such a resolution starting from a convergent presentation. In the last section, we show how to relate Koszulness for algebras with the property of confluence.

Published

2020

30. Depth of an Initial Ideal

Author

Akiyoshi Tsuchiya and Takayuki Hibi

Subjects

Physics, Combinatorics, Gröbner basis, Ring (mathematics), Mathematics::Commutative Algebra, Integer, Polynomial ring, Dimension (graph theory), Field (mathematics), Ideal (ring theory), Monomial order

Abstract

Given an arbitrary integer \(d>0\), we construct a homogeneous ideal I of the polynomial ring \(S = K[x_1, \ldots , x_{3d}]\) in 3d variables over a field K for which S/I is a Cohen–Macaulay ring of dimension d with the property that, for each of the integers \(0 \le r \le d\), there exists a monomial order \(

Published

2020

31. Semi-ring Based Gröbner–Shirshov Bases over a Noetherian Valuation Ring

Author

Laila Mesmoudi, Djiby Sow, and Yatma Diop

Subjects

Noetherian, Monoid, Monomial, Ring (mathematics), Pure mathematics, Mathematics::Commutative Algebra, Mathematics::Rings and Algebras, Computer Science::Symbolic Computation, Field (mathematics), Commutative property, Valuation ring, Monomial order, Mathematics

Abstract

Commutative and non commutative Grobner–Shirshov bases were first studied over fields and after extended to some particular rings. In theses works, the monomials are in a monoid. Recently, Bokut and al. gave a new extension of Grobner–Shirshov bases over a field by choosing the monomials in a semi-ring rather in a monoid. In this paper, we study Grobner–Shirshov bases where the monomials are in a semi-ring and the coefficients are in a noetherian valuation ring and we establish the relation between weak and strong Grobner bases.

Published

2020

32. On the transposition anti-involution in real Clifford algebras III: the automorphism group of the transposition scalar product on spinor spaces.

Author

Abłamowicz, Rafał and Fauser, Bertfried

Subjects

*ALGEBRAIC functions, *CLIFFORD algebras, *AUTOMORPHISMS, *GROUP theory, *SCALAR field theory, *SPINOR analysis, *ALGEBRAIC spaces, *QUADRATIC forms

Abstract

In Abłamowicz and Fauser [R. Abłamowicz and B. Fauser, On the transposition anti-involution in real Clifford algebras I: The transposition map, Linear Multilinear Alg. (to appear)] a signature ϵ = (p, q)-dependent transposition anti-involution of real Clifford algebras Cℓ p,q for non-degenerate quadratic forms was introduced. In Abłamowicz and Fauser [R. Abłamowicz and B. Fauser, On the transposition anti-involution in real Clifford algebras II: Stabilizer groups of primitive idempotents, Linear Multilinear Alg. (to appear)] we showed that, depending on the value of (p − q) mod 8, the map gives rise to transposition, complex Hermitian or quaternionic Hermitian conjugation of representation matrices in spinor representation. The resulting scalar product is in general different from the two known standard scalar products [R. Abłamowicz and B. Fauser, Clifford and Grassmann Hopf algebras via the BIGEBRA package for Maple, Comput. Phys. Commun. 170 (2005), pp. 115–130]. We provide a full signature (p, q)-dependent classification of the invariance groups of this product for p + q ≤ 9. The map is identified as the ‘star’ map known [D.S. Passman, The Algebraic Structure of Group Rings, Robert E. Krieger Publishing Company, Malabar, Florida, 1985] from the theory of (twisted) group algebras where the Clifford algebra Cℓ p,q is seen as a twisted group ring n = p + q. We discuss important subgroups of a stabilizer group G p,q (f) of a primitive idempotent f and we relate their transversals to spinor bases in spinor spaces realized as minimal left ideals Cℓ p,q  f. [ABSTRACT FROM PUBLISHER]

Published

2012

33. On the transposition anti-involution in real Clifford algebras II: stabilizer groups of primitive idempotents.

Author

Abłamowicz, Rafał and Fauser, Bertfried

Subjects

*CLIFFORD algebras, *IDEMPOTENTS, *GROUP theory, *GROUP rings, *STATISTICAL correlation, *SPINOR analysis, *IDEALS (Algebra)

Abstract

In the first article [R. Abłamowicz and B. Fauser, On the transposition anti-involution in real Clifford algebras I: The transposition map, Linear Multilinear Algebra, to appear] we showed that real Clifford algebras Cℓ(V, Q) possess a unique transposition anti-involution . The map reduces to reversion (resp. conjugation) for any Euclidean (resp. anti-Euclidean) signature. When applied to a general element of the algebra, it results in transposition of associated matrix of that element in the left regular representation of the algebra. In this article we show that, depending on the value of (p − q) mod 8, where ϵ = (p, q) is the signature of Q, the anti-involution gives rise to transposition, Hermitian complex and Hermitian quaternionic conjugation of representation matrices in spinor representations. We realize spinors in minimal left ideals S = Cℓ p,q  f generated by a primitive idempotent f. The map allows us to define a dual spinor space S*, and a new spinor norm on S, which is different, in general, from two spinor norms known to exist. We study a transitive action of generalized Salingaros' multiplicative vee groups G p,q on complete sets of mutually annihilating primitive idempotents. Using the normal stabilizer subgroup G p,q (f), we construct left transversals, spinor bases and maps between spinor spaces for different orthogonal idempotents f i summing up to 1. We classify the stabilizer groups according to the signature in simple and semisimple cases. [ABSTRACT FROM AUTHOR]

Published

2011

34. On the transposition anti-involution in real Clifford algebras I: the transposition map.

Author

Abłamowicz, Rafał and Fauser, Bertfried

Subjects

*CLIFFORD algebras, *MATHEMATICAL mappings, *SPINOR analysis, *MODULES (Algebra), *QUADRATIC forms, *STATISTICAL correlation, *IDEMPOTENTS

Abstract

A particular orthogonal map on a finite-dimensional real quadratic vector space (V, Q) with a non-degenerate quadratic form Q of any signature (p, q) is considered. It can be viewed as a correlation of the vector space that leads to a dual Clifford algebra Cℓ(V*, Q) of linear functionals (multiforms) acting on the universal Clifford algebra Cℓ(V, Q). The map results in a unique involutive automorphism and a unique involutive anti-automorphism of Cℓ(V, Q). The anti-involution reduces to reversion (resp. conjugation) for any Euclidean (resp. anti-Euclidean) signature. When applied to a general element of the algebra, it results in transposition of the element matrix in the left regular representation of Cℓ(V, Q). We also give an example for real spinor spaces. The general setting for spinor representations will be treated in part II of this work [R. Abłamowicz and B. Fauser, On the transposition anti-involution in real Clifford algebras II: Stabilizer groups of primitive idempotents, Linear Multilinear Algebra, to appear]. [ABSTRACT FROM AUTHOR]

Published

2011

35. Archimedean Orders on Certain Rings of Invariants.

Author

Tesemma, Mohammed, Wang, Haohao, and Arad, Z.

Subjects

*REFLECTION groups, *ASSOCIATIVE rings, *POLYNOMIALS, *INVARIANTS (Mathematics), *VECTOR spaces, *NUMERICAL analysis

Abstract

Let $\mathcal{G}\leq {\rm GL}_n (\mathbb{Z})$ act multiplicatively on the Laurent polynomial algebra k[x± 1] in n indeterminates x={x1, ...,xn}. Consider the initial algebra of the ring of invariants $k[\textbf{x}^{\pm1}]^{\mathcal{G}}$ with respect to some monomial order. We set a sufficient condition on $\mathcal{G}$ such that each initial algebra is represented by some weight vectors in ℝn. We also show that the condition is necessary in the case where the rank n = 2. [ABSTRACT FROM AUTHOR]

Published

2011

36. Computation of Non-Commutative Gröbner Bases in Grassmann and Clifford Algebras.

Author

Abłamowicz, Rafał

Abstract

Tensor, Clifford and Grassmann algebras belong to a wide class of non-commutative algebras that have a Poincaré-Birkhoff-Witt (PBW) 'monomial' basis. The necessary and sufficient condition for an algebra to have the PBW basis has been established by T. Mora and then V. Levandovskyy as the so called 'non-degeneracy condition'. This has led V. Levandovskyy to a re-discovery of the so called G-algebras (previously introduced by J. Apel) and GR-algebras (Gröbner-ready algebras). It was T. Mora who already in the 1990s considered a comprehensive and algorithmic approach to Gröbner bases for commutative and non-commutative algebras. It was T. Stokes who eighteen years ago introduced Gröbner left bases (GLB) and Gröbner left ideal bases (GLIB) for left ideals in Grassmann algebras, with the GLIB bases solving an ideal membership problem. Thus, a natural question is to first seek Gröbner bases with respect to a suitable admissible monomial order for ideals in tensor algebras T and then consider quotient algebras T/I. It was shown by Levandovskyy that these quotient algebras possess a PBW basis if and only if the ideal I has a Gröbner basis. Of course, these quotient algebras are of great interest because, in particular, Grassmann and Clifford algebras of a quadratic form arise this way. Examples of G-algebras include the quantum plane, universal enveloping algebras of finite dimensional Lie algebras, some Ore extensions, Weyl algebras and their quantizations, etc. Examples of GR-algebras, which are either G algebras or are isomorphic to quotient algebras of a G-algebra modulo a proper two-sided ideal, include Grassmann and Clifford algebras. After recalling basic concepts behind the theory of commutative Gröbner bases, a review of the Gröbner bases in PBW algebras, G-,and GR-algebras will be given with a special emphasis on computation of such bases in Grassmann and Clifford algebras. GLB and GLIB bases will also be computed. [ABSTRACT FROM AUTHOR]

Published

2010

37. On Multiplicative Invariants of Finite Reflection Groups.

Author

Tesemma, Mohammed

Subjects

FINITE groups, GROUP theory, MATHEMATICAL transformations, REFLECTION groups, SEMIGROUP algebras, MONOIDS

Abstract

This article focuses on two recent results on multiplicative invariants of finite reflection groups: Lorenz (2001) showed that such invariants are affine normal semigroup algebras, and Reichstein (2003) proved that the invariants have a finite SAGBI basis. Reichstein (2003) also showed that, conversely, if the multiplicative invariant algebra of a finite group G has a SAGBI basis, then G acts as a reflection group. There is no obvious connection between these two results. We will show that multiplicative invariants of finite reflection groups have a certain embedding property that implies both results simultaneously. [ABSTRACT FROM AUTHOR]

Published

2007

38. A test for monomial containment

Author

Thomas Kremer and Simon Keicher

Subjects

FOS: Computer and information sciences, Computer Science - Symbolic Computation, Monomial, Polynomial ring, 010103 numerical & computational mathematics, Symbolic Computation (cs.SC), Commutative Algebra (math.AC), 01 natural sciences, Combinatorics, Mathematics - Algebraic Geometry, 13P05, 13P10, 13P15, 14Q99, ComputingMethodologies_SYMBOLICANDALGEBRAICMANIPULATION, FOS: Mathematics, 0101 mathematics, Triangular sets, Algebraic Geometry (math.AG), Monomial order, Mathematics, Discrete mathematics, Containment (computer programming), Algebra and Number Theory, Ideal (set theory), Mathematics::Commutative Algebra, 010102 general mathematics, Mathematics - Commutative Algebra, Monomial basis, Computational Mathematics

Abstract

We present an algorithm to decide whether a given ideal in the polynomial ring contains a monomial without using Gr\"obner bases, factorization or sub-resultant computations., Comment: 15 pages

Published

2017

39. Standard Monomials and Extremal Vector Systems

Author

Lajos Rónyai and Tamás Mészáros

Subjects

Monomial, Applied Mathematics, System F, 010102 general mathematics, 010103 numerical & computational mathematics, Characterization (mathematics), 01 natural sciences, Combinatorics, Set (abstract data type), Discrete Mathematics and Combinatorics, 0101 mathematics, Algebraic number, Finite set, Monomial order, Quotient, Mathematics

Abstract

A set system F ⊆ 2 [ n ] shatters a given set S ⊆ [ n ] if 2 S = { F ∩ S : F ∈ F } . The Sauer-Shelah lemma states that in general, F shatters at least | F | sets. A set sytstem is called shattering-extremal if it shatters exactly | F | sets. In [Meszaros, T., “S-extremal set systems and Grobner bases”, Diploma Thesis, Budapest University of Technology and Economics, 2010] and [Meszaros, T., L. Ronyai, “Some combinatorial application of Grobner bases”, In: F. Winkler, Algebraic Informatics, CAI 2011, Lecture Notes in Computer Science 6742, Springer 2011, 64–83] an algebraic characterization of shattering-extremal set systems was given, which offered the possibility to generalize the notion of extremality to general finite vector systems. Here we generalize the results obtained for set systems to this more general setting, and as an application, strengthen a result of Dong, Li and Zhang from [Dong, T., Z. Li, S. Zhang, Finite sets of affine points with unique associated monomial order quotient bases, Journal of Algebra and its Applications 11(2) (2012), 1250025].

Published

2017

40. Foliations on $$\mathbb {CP}^2$$ CP 2 of degree d with a singular point with Milnor number $$d^2+d+1$$ d 2 + d + 1

Author

Claudia R. Alcántara

Subjects

Discrete mathematics, Pure mathematics, Mathematics::Dynamical Systems, General Mathematics, 010102 general mathematics, Holomorphic function, 010103 numerical & computational mathematics, Singular point of a curve, 01 natural sciences, Milnor number, Nilpotent, Singularity, Foliation (geology), Gravitational singularity, Mathematics::Differential Geometry, 0101 mathematics, Mathematics::Symplectic Geometry, Monomial order, Mathematics

Abstract

We study holomorphic foliations on $$\mathbb {CP}^2$$ of degree d with a singular point with Milnor number $$d^2+d+1$$ and non-zero linear part. Given a foliation, using the singular scheme of the foliation and the lexicographical monomial order, we give necessary and sufficient conditions to have this kind of singularities. We show that if the singularity is nilpotent, the Grobner basis with respect to this order gives us the normal form around the singular point. Finally, we prove that these foliations have no invariant lines and we exhibit a family of foliations with a nilpotent singularity with Milnor number $$d^2+d+1$$ , for d odd.

Published

2017

41. An elementary construction of monomial bases of modified quantum affine gln

Author

Li Luo and Chun-Ju Lai

Subjects

Algebra, Monomial, General Mathematics, 010102 general mathematics, 0103 physical sciences, 010307 mathematical physics, Affine transformation, 0101 mathematics, Monomial basis, 01 natural sciences, Quantum, Monomial order, Mathematics

Published

2017

42. The optimality of Feng–Rao designed minimum distance for Hermitian codes constructed by weight order based on pole order.

Author

Umehara, Daisuke, Miura, Shinji, Uyematsu, Tomohiko, and Okamoto, Eiji

Subjects

*ERROR-correcting codes, *CODING theory, *HERMITIAN forms, *GROBNER bases, *LINEAR statistical models, *ALGEBRAIC geometry

Abstract

The algebraic geometric code is known as a linear code that guarantees a relatively large minimum distance under the condition that the number of check symbols is kept constant, when the code length is long. Recently, Saints and Heegard presented a unified theory for decoding of the algebraic geometric code and the multidimensional cyclic code, based on the monomial order and the theory of Gröbner bases. Miura, on the other hand, extended the definition of the Feng–Rao designed distance to the case of arbitrary linear code and showed, based on the affine algebraic variety and the monomial order, that the Feng–Rao designed distance is relatively large in the algebraic geometric code. In that case, the Feng–Rao designed distance of the code depends on the definition of the monomial order. It is then important, from the viewpoint of code construction, to determine the class of the monomial orders that provides the maximum Feng–Rao designed distance. This paper considers the “Hermitian code” constructed from the Hermitian curve, which is a typical class of the algebraic geometric codes, and derives the class of the monomial orders that provides the maximum Feng–Rao designed distance. It is also shown that the Feng–Rao designed distance derived from the weight order based on the pole order has the optimal property. © 2000 Scripta Technica, Electron Comm Jpn Pt 3, 83(11): 85–95, 2000 [ABSTRACT FROM AUTHOR]

Published

2000

43. Computing syzygies in finite dimension using fast linear algebra

Author

Éric Schost, Vincent Neiger, Mathématiques & Sécurité de l'information (XLIM-MATHIS), XLIM (XLIM), Université de Limoges (UNILIM)-Centre National de la Recherche Scientifique (CNRS)-Université de Limoges (UNILIM)-Centre National de la Recherche Scientifique (CNRS), Cheriton School of Computer Science [Waterloo] (CS), and University of Waterloo [Waterloo]

Subjects

FOS: Computer and information sciences, Statistics and Probability, Computer Science - Symbolic Computation, Control and Optimization, General Mathematics, Dimension (graph theory), 010103 numerical & computational mathematics, Symbolic Computation (cs.SC), Space (mathematics), 01 natural sciences, Omega, syzygies, Combinatorics, Gröbner basis, fast linear algebra, Computer Science::Symbolic Computation, 0101 mathematics, Monomial order, Mathematics, [INFO.INFO-SC]Computer Science [cs]/Symbolic Computation [cs.SC], Numerical Analysis, Algebra and Number Theory, Mathematics::Commutative Algebra, Applied Mathematics, 010102 general mathematics, Basis (universal algebra), Matrix multiplication, Exponent, complexity

Abstract

We consider the computation of syzygies of multivariate polynomials in a finite-dimensional setting: for a $\mathbb{K}[X_1,\dots,X_r]$-module $\mathcal{M}$ of finite dimension $D$ as a $\mathbb{K}$-vector space, and given elements $f_1,\dots,f_m$ in $\mathcal{M}$, the problem is to compute syzygies between the $f_i$'s, that is, polynomials $(p_1,\dots,p_m)$ in $\mathbb{K}[X_1,\dots,X_r]^m$ such that $p_1 f_1 + \dots + p_m f_m = 0$ in $\mathcal{M}$. Assuming that the multiplication matrices of the $r$ variables with respect to some basis of $\mathcal{M}$ are known, we give an algorithm which computes the reduced Gr\"obner basis of the module of these syzygies, for any monomial order, using $O(m D^{\omega-1} + r D^\omega \log(D))$ operations in the base field $\mathbb{K}$, where $\omega$ is the exponent of matrix multiplication. Furthermore, assuming that $\mathcal{M}$ is itself given as $\mathcal{M} = \mathbb{K}[X_1,\dots,X_r]^n/\mathcal{N}$, under some assumptions on $\mathcal{N}$ we show that these multiplication matrices can be computed from a Gr\"obner basis of $\mathcal{N}$ within the same complexity bound. In particular, taking $n=1$, $m=1$ and $f_1=1$ in $\mathcal{M}$, this yields a change of monomial order algorithm along the lines of the FGLM algorithm with a complexity bound which is sub-cubic in $D$., Comment: 34 pages, 7 algorithms, Journal of Complexity

Published

2019

44. Valuative dimension and monomial orders

Author

Gregor Kemper and Ihsen Yengui

Subjects

Pure mathematics, Monomial, Algebra and Number Theory, 13P10, 13F30, 16P60, Mathematics::Commutative Algebra, 010102 general mathematics, Analogy, Characterization (mathematics), Lexicographical order, Commutative Algebra (math.AC), Mathematics - Commutative Algebra, 01 natural sciences, Constructive, Dimension (vector space), 0103 physical sciences, FOS: Mathematics, 010307 mathematical physics, Krull dimension, 0101 mathematics, Monomial order, Mathematics

Abstract

The main result from this note provides a constructive characterization of the valuative dimension, which bears a strong analogy to Lombardi's constructive characterization of the Krull dimension. While Lombardi's characterization uses the lexicographic monomial order, ours uses the graded (reverse) lexicographic order or, in fact, any graded rational monomial order. Apart from this, the paper contains some related results and some examples which readers may find illuminating., 7 pages

Published

2019

45. Gradient Boosts the Approximate Vanishing Ideal

Author

Hiroshi Kera and Yoshihiko Hasegawa

Subjects

FOS: Computer and information sciences, Computer Science - Machine Learning, Basis (linear algebra), Property (programming), Computer science, Computation, Algebraic variety, Machine Learning (stat.ML), General Medicine, Translation (geometry), Symbolic computation, Machine Learning (cs.LG), Statistics - Machine Learning, ComputingMethodologies_SYMBOLICANDALGEBRAICMANIPULATION, Algorithm, Time complexity, Monomial order

Abstract

In the last decade, the approximate vanishing ideal and its basis construction algorithms have been extensively studied in computer algebra and machine learning as a general model to reconstruct the algebraic variety on which noisy data approximately lie. In particular, the basis construction algorithms developed in machine learning are widely used in applications across many fields because of their monomial-order-free property; however, they lose many of the theoretical properties of computer-algebraic algorithms. In this paper, we propose general methods that equip monomial-order-free algorithms with several advantageous theoretical properties. Specifically, we exploit the gradient to (i) sidestep the spurious vanishing problem in polynomial time to remove symbolically trivial redundant bases, (ii) achieve consistent output with respect to the translation and scaling of input, and (iii) remove nontrivially redundant bases. The proposed methods work in a fully numerical manner, whereas existing algorithms require the awkward monomial order or exponentially costly (and mostly symbolic) computation to realize properties (i) and (iii). To our knowledge, property (ii) has not been achieved by any existing basis construction algorithm of the approximate vanishing ideal., Comment: 9+10 pages, 1+4 figures, AAAI'20

Published

2019

46. Irreducible Generalized Numerical Semigroups and uniqueness of the Frobenius element

Author

Rosanna Utano, Chris Peterson, Carmelo Cisto, and Gioia Failla

Subjects

Monoid, Pure mathematics, Monomial, Algebra and Number Theory, 010102 general mathematics, Order (ring theory), Irreducible Symmetric and pseudo-symmetric GNS, 0102 computer and information sciences, Frobenius element, Generalized numerical semigroups (GNS), Irreducible Symmetric and pseudo-symmetric GNS, Mathematics - Commutative Algebra, Commutative Algebra (math.AC), 01 natural sciences, Generalized numerical semigroups (GNS), Cardinality, 010201 computation theory & mathematics, Numerical semigroup, FOS: Mathematics, Mathematics - Combinatorics, Uniqueness, Combinatorics (math.CO), 0101 mathematics, Finite set, Monomial order, Frobenius element, Mathematics

Abstract

Let $\mathbb{N}^{d}$ be the $d$-dimensional monoid of non-negative integers. A generalized numerical semigroup is a submonoid $ S\subseteq \mathbb{N}^d$ such that $H(S)=\mathbb{N}^d \setminus S$ is a finite set. We introduce irreducible generalized numerical semigroups and characterize them in terms of the cardinality of a special subset of $H(S)$. In particular, we describe relaxed monomial orders on $\mathbb N^d$, define the Frobenius element of $S$ with respect to a given relaxed monomial order, and show that the Frobenius element of $S$ is independent of the order if the generalized numerical semigroup is irreducible., Comment: 15 pages

Published

2019

47. Semigrupos numéricos e ideales asociados

Author

Padrón Alemán, Enrique José and García Marco, Ignacio

Subjects

Conjunto de Apéry, Orden monomial, Semigrupos numéricos, Algoritmo de división, Base de Gr¨obner, Numerical semigroups, Gr¨obner Basis, Monomial order, Apéry Set, Division algorithm

Abstract

El objetivo de esta memoria es introducir al lector a la Teor´ıa de Semigrupos Num´ericos y de Bases de Gr¨obner, mostrando alguna interacci´on entre ellas. En primer lugar estudiamos la estructura de semigrupo num´erico. Demostramos que todo semigrupo num´erico est´a finitamente generado y tiene un ´unico sistema minimal de generadores. Tambi´en estudiamos diversos conjuntos notables asociados como el conjunto de Ap´ery y el de huecos. En el segundo cap´ıtulo estudiamos la teor´ıa cl´asica de Bases de Gr¨obner. Comenzamos introduciendo un orden monomial en el anillo de polinomios sobre un cuerpo, lo que nos permite descubrir un algoritmo de divisi´on que generaliza la divisi´on eucl´ıdea y, haciendo uso del mismo, hallar sistemas generadores de ideales con propiedades deseables. Finalmente, afrontamos dos problemas de la Teor´ıa de Semigrupos: el de pertenencia a un semigrupo y el de obtenci´on del conjunto de Ap´ery, ambos empleando las herramientas que brindan las bases de Gr¨obner. This manuscript aims to introduce the reader to both Numerical Semigroups and Gr¨obner Bases theories, showing some interactions between them. In the first chapter, we study the structure of numerical semigroup. We prove that every numerical semigroup is finitely generated and has a unique minimal set of generators. We also study several relevant sets associated to the semigroup as the Ap´ery set and the set of gaps. In the second chapter, we study classical Gr¨obner Bases theory defining a monomial order in the polynomial ring over a field. We describe a division algorithm which allows us to generalise the Euclidean division and we use this tool to find generating systems for ideals with reasonably good properties. Finally, we approach two problems of Numerical Semigroups theory: the semigroup membership problem and the computation of the Ap´ery set, both of them applying tools given by Gr¨obner bases.

Published

2019

48. Gröbner bases of reaction networks with intermediate species

Author

AmirHosein Sadeghimanesh and Elisenda Feliu

Subjects

Reduction (complexity), Gröbner basis, Pure mathematics, Steady state (electronics), Ideal (set theory), Mathematics::Commutative Algebra, Binomial (polynomial), Applied Mathematics, Linear algebra, Core network, Monomial order, Mathematics

Abstract

In this work we consider the computation of Grobner bases of the steady state ideal of reaction networks equipped with mass-action kinetics. Specifically, we focus on the role of intermediate species and the relation between the extended network (with intermediate species) and the core network (without intermediate species). We show that a Grobner basis of the steady state ideal of the core network always lifts to a Grobner basis of the steady state ideal of the extended network by means of linear algebra, with a suitable choice of monomial order. As illustrated with examples, this contributes to a substantial reduction of the computation time, due mainly to the reduction in the number of variables and polynomials. We further show that if the steady state ideal of the core network is binomial, then so is the case for the extended network, as long as an extra condition is fulfilled. For standard networks, this extra condition can be visually explored from the network structure alone.

Published

2019

49. The converse of a theorem by Bayer and Stillman

Author

HyunBin Loh

Subjects

Combinatorics, Applied Mathematics, Converse, FOS: Mathematics, Mathematics - Commutative Algebra, Commutative Algebra (math.AC), Lexicographical order, Monomial order, Mathematics

Abstract

Bayer-Stillman showed that $reg(I) = reg(gin_\tau(I))$ when $\tau$ is the graded reverse lexicographic order. We show that the reverse lexicographic order is the unique monomial order $\tau$ satisfying $reg(I) = reg(gin_\tau(I))$ for all ideals $I$. We also show that if $gin_{\tau_1}(I) = gin_{\tau_2}(I)$ for all $I$, then $\tau_1 = \tau_2$., Comment: 10 pages

Published

2016

50. Uniqueness of a Polynomial and a Differential Monomial Sharing a Small Function

Author

Molla Basir Ahamed, Ahamed Molla Basir, and Banerjee Abhijit

Subjects

Monomial, Polynomial, differential monomial, 010102 general mathematics, uniqueness, General Medicine, Monomial basis, 01 natural sciences, Polynomial matrix, Matrix polynomial, 010101 applied mathematics, Combinatorics, QA1-939, meromorphic function, Uniqueness, 0101 mathematics, small function, Monic polynomial, Monomial order, Mathematics

Abstract

In this paper taking a question in [1] into background we investigate the uniqueness of a non-constant polynomial with the differential monomial generated by a non-constant mermorphic function f. Our result will also extend a result of Banerjee-Majumder[2] given earlier. An open question is also posed, in the paper, for future investigation.

Published

2016