Publications
Numerical semigroups with embedding dimension three. Arch. Math. (Basel). 2004;83:488-496.Edit
On numerical semigroups with high embedding dimension. J. Algebra. 1998;203:567-578.Edit
Numerical semigroups with maximal embedding dimension. Int. J. Commut. Rings. 2003;2:47-53.Edit
Numerical simulations in two CPG models for bipedal locomotion. J. Vib. Control. 2007;13:1487-1503.Edit
A numerical study of iterative refinement schemes for weakly singular integral equations. Applied Mathematics Letters. 2005;18:571-576.Edit
Numerical study of substrate assimilation by a microorganism exposed to fluctuating concentration. Chemical Engineering Science. 2012;81:8-19.Edit
numericalsgps, a GAP package for numerical semigroups. ACM Communications in Computer Algebra. 2016;50(1):12-24.Edit
Numerical semigroups. Vol 20 Springer, New York 2009.Edit
Numerical semigroups and applications. Vol 1 Springer, [Cham] 2016.Edit
New families of Leibniz type rules for fractional calculus and their integral analogues. In: Recent advances in fractional calculus. Global, Sauk Rapids, MN; 1993. 2. p. 248-291p. (Global Res. Notes Ser. Math.).Edit
Nonoverlapping Domain Decomposition Applied to a Computational Fluid Mechanics Code. In: Amestoy PR, Berger P, Daydé M, Ruiz D, Duff I, Frayssé V et al., editors. Euro-Par'99 Parallel Processing: 5th International Euro-Par Conference Toulouse, France, August 31 – September 3, 1999 Proceedings. Vol 1685. Springer Berlin Heidelberg; 1999. 6. p. 608-612p. (Lecture Notes in Computer Science; vol 1685).Edit
A note on the large deviations for piecewise expanding multidimensional maps. In: Nonlinear dynamics new directions. Vol 11. Springer, Cham; 2015. 1. p. 1-10p. (Nonlinear Syst. Complex.; vol 11).Edit
Numerical semigroups with maximal embedding dimension [\refcno 2056070]. In: Focus on commutative rings research. Nova Sci. Publ., New York; 2006. 4. p. 47-53p. Edit
Numerical solution of partial differential equations with the tau method. In: First Meeting on Numerical Methods for Partial Differential Equations (Coimbra, 1995). Vol 11. Univ. Coimbra, Coimbra; 1997. 1. p. 111-121p. (Textos Mat. Sér. B; vol 11).Edit
A note on reversibility and Pell equations. Vol 75 SPM 2017.Edit
[2013-26] New canonical triple covers of surfaces .
[2009-39] New decidable upper bound of the second level in the Straubing-Thérien concatenation hierarchy .Edit
[2012-20] A new Kontorovich-Lebedev like transformation .