PEDRO ABELARDO
GARCÍA SÁNCHEZ
CATEDRÁTICO DE UNIVERSIDAD
JOSÉ CARLOS
ROSALES GONZÁLEZ
CATEDRÁTICO DE UNIVERSIDAD
Publicaciones en las que colabora con JOSÉ CARLOS ROSALES GONZÁLEZ (49)
2017
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Parametrizing Arf numerical semigroups
Journal of Algebra and its Applications, Vol. 16, Núm. 11
2014
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Constructing Almost Symmetric Numerical Semigroups from Irreducible Numerical Semigroups
Communications in Algebra, Vol. 42, Núm. 3, pp. 1362-1367
2013
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Affine semigroups having a unique betti element
Journal of Algebra and its Applications, Vol. 12, Núm. 3
2009
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Numerical semigroups
Springer USA
2008
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Every numerical semigroup is one half of a symmetric numerical semigroup
Proceedings of the American Mathematical Society, Vol. 136, Núm. 2, pp. 475-477
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Every numerical semigroup is one half of infinitely many symmetric numerical semigroups
Communications in Algebra, Vol. 36, Núm. 8, pp. 2910-2916
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Numerical semigroups having a toms decomposition
Canadian Mathematical Bulletin, Vol. 51, Núm. 1, pp. 134-139
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Strongly taut finitely generated monoids
Monatshefte fur Mathematik, Vol. 155, Núm. 2, pp. 119-124
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Systems of proportionally modular Diophantine inequalities
Semigroup Forum, Vol. 76, Núm. 3, pp. 469-488
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The set of solutions of a proportionally modular Diophantine inequality
Journal of Number Theory, Vol. 128, Núm. 3, pp. 453-467
2006
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Presentations of finitely generated cancellative commutative monoids and nonnegative solutions of systems of linear equations
Discrete Applied Mathematics, Vol. 154, Núm. 14, pp. 1947-1959
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The catenary and tame degree in finitely generated commutative cancellative monoids
Manuscripta Mathematica, Vol. 120, Núm. 3, pp. 253-264
2005
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Modular Diophantine Inequalities and Numerical Semigroups
Pacific Journal of Mathematics, Vol. 218, Núm. 2, pp. 379-398
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Numerical semigroups with a monotonic apery set
Czechoslovak Mathematical Journal, Vol. 55, Núm. 3, pp. 755-772
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Pseudo-symmetric numerical semigroups with three generators
Journal of Algebra, Vol. 291, Núm. 1, pp. 46-54
2004
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Arf numerical semigroups
Journal of Algebra, Vol. 276, Núm. 1, pp. 3-12
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Atomic Commutative Monoids and Their Elasticity
Semigroup Forum, Vol. 68, Núm. 1, pp. 64-86
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Every positive integer is the Frobenius number of a numerical semigroup with three generators
Mathematica Scandinavica, Vol. 94, Núm. 1, pp. 5-12
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Every positive integer is the Frobenius number of an irreducible numerical semigroup with at most four generators
Arkiv for Matematik, Vol. 42, Núm. 2, pp. 301-306
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Fundamental gaps in numerical semigroups
Journal of Pure and Applied Algebra, Vol. 189, Núm. 1-3, pp. 301-313