Counting Restricted Functions on a Formation of Points Having Positive Integral Coordinates

Authors

  • Robert Corcino
  • Marcelo Alquiza
  • Jose Marlon Caumeran

Keywords:

counting, restricted functions, positive integral, recurrence relation, continuous

Abstract

In this paper we establish some formulas in counting restricted functions f1s under each of the following conditions:

(i) f(a) < g(a), ∀a ∈ S where g is any non-negative real-valued continuous function.

(ii) g1 (a) < f(a) < g2(a), ∀a ∈ S where g1 and g2 are any two non-negative real-valued continuous functions.

Downloads

Published

04/08/2024

How to Cite

Corcino, R., Alquiza, M., & Caumeran, J. M. (2024). Counting Restricted Functions on a Formation of Points Having Positive Integral Coordinates. ASIA PACIFIC JOURNAL OF SOCIAL INNOVATION, 19(1). Retrieved from https://journals.msuiit.edu.ph/tmf/article/view/332

Issue

Vol. 19 No. 1 (2005): THE MINDANAO FORUM

Section

Articles

Most read articles by the same author(s)