JP Journal of Algebra, Number Theory and Applications

The JP Journal of Algebra, Number Theory and Applications is a prestigious international journal indexed in the Emerging Sources Citation Index (ESCI). It publishes original research papers, both theoretical and applied in nature, in various branches of algebra and number theory. The journal also welcomes survey articles that contribute to the advancement of these fields.

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GENERALIZED SAMUEL NUMBER $wbar_phi(theta)$ AND AXE-FILTRATIONS ON A SEMIMODULE

Authors

  • Kouadjo Pierre BROU
  • Edjabrou Ulrich Blanchard KABLAM
  • Grah Gelin BOGUI

Keywords:

semiring, regular quasi-filtration, AP quasi-filtration, generalized Samuel numbers

DOI:

https://doi.org/10.17654/0972555526003

Abstract

This work extends the theory of Samuel numbers to semimodules by introducing a generalized number, $wbar_phi(theta)$ for two axe-filtrations. We establish its existence under regularity conditions, including the Approximable by Powers (AP) and weakly good properties. By adapting the concept of valuative reduction, we prove that this invariant is well-defined and robust, laying the foundation for a quantitative analysis of filtration structures on semimodules.

Received: September 19, 2025
Accepted: November 1, 2025

References

References

[1] K. P. Brou and E. D. Béché, Deep classification of a generalization of ring filtration in commutative algebra, International Journal of Algebra 19(2) (2025), 79-88. https://doi.org/10.12988/ija.2025.91962

[2] E. D. Akeke, S. Ouattara and P. Ayegnon, Another generalized Samuel number on a semi-ring, JP J. Algebra Number Theory Appl. 36(2) (2015), 123-139.

[3] E. D. Akeke and P. Ayegnon, Some aspects of generalized Samuel numbers and quasi graduations on a semi-ring, Pioneer J. Algebra Number Theory Appl. 5(1) (2013), 17-28.

[4] S. Ouattara, E. D. Akeke and P. Ayégnon, Generalized Samuel numbers and on a semi-module, Afr. Math. Ann. (AFMA) 2 (2011), 175-189.

[5] S. Ouattara, E. D. Akeke and P. Ayegnon, Another generalized Samuel number on a semi-ring, JP J. Algebra Number Theory Appl. 19(2) (2010), 185-201.

[6] M. Lejeune-Jalabert and B. Teissier, Integral closure of ideals and equisingularity, Ann. Fac. Sci. Toulouse Math. 17 (2008), 781-859.

[7] P. Ayégnon, Filtrations on a set and Samuel numbers, Afr. Mat. Ser. III 16 (2005), 139-144.

[8] P. Ayegnon, Extensions to filtrations of Samuel numbers associated with ideals, Communication in Algebra 22(9) (1994), 3249-3263.

[9] J. W. Petro, Some Results in the Theory of Pseudo-valuations, Ph.D. Dissertation, State University of Iowa, Iowa City, 1961.

[10] D. Rees, Variations associated with a local ring (1), Proc. London Math. Soc. (Series 3) 5 (1955), 107-128.

[11] P. Samuel, Some asymptotic properties of powers of ideals, Ann. of Math. 56 (1952), 11-21.

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Published

2025-11-17

Issue

Vol. 65 No. 1 (2026)

Section

Articles

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How to Cite

GENERALIZED SAMUEL NUMBER $wbar_phi(theta)$ AND AXE-FILTRATIONS ON A SEMIMODULE. (2025). JP Journal of Algebra, Number Theory and Applications, 65(1), 35-54. https://doi.org/10.17654/0972555526003

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