Volume 6, Number 2 (2023)-Table of Contents
Open AccessArticle
Behavior and formula of the solutions of rational difference equations of order six
Annals of Communications in Mathematics 2023
, 6 (2)
, 72-85
DOI: https://doi.org/10.62072/acm.2023.060201
AbstractThis paper is devoted to find the form of the solution of the following rational difference equations : xn+1 = xn−3xn−5 xn−1(±1 ± xn−3xn−5) , where the initial conditions x−5, x−4, x−3, x−2, x−1, x0 are arbitrary non zero real numbers. Also, we study the behavior of the solutions.
Open AccessArticle
Implicative strong filters in hyper quasi-ordered residuated systems
Annals of Communications in Mathematics 2023
, 6 (2)
, 86-98
DOI: https://doi.org/10.62072/acm.2023.060202
AbstractQuasi-ordered residuated systems as a generalization of both quasi-ordered commutative residuated lattices and hoop-algebras were developed in 2018 by Bonzio and Chajda. The ideas of the theory of hyper structures were applied to this algebraic structure by this author and, at the same time, developed the concepts of filters in a hyper quasi-ordered residuated system. In this paper, the conditions that determine the concept of implicative strong filters in it. Some equivalent conditions were found that also determine this concept.
Open AccessArticle
A note on spacetimes in f(R)-gravity
Annals of Communications in Mathematics 2023
, 6 (2)
, 99-108
DOI: https://doi.org/10.62072/acm.2023.060203
AbstractIn this work, the investigation of spacetimes admitting semiconformal curvature tensor in f(R)-gravity theory is the major goal. First, semiconformally flat spacetimes in the presence of f(R)-gravity are investigated, and the relationship between isotropic pressure and energy density is discovered. Some energy conditions are then taken into account. Finally, spacetimes with divergence-free semiconformal curvature tensors in f(R)-gravity are explored.
Open AccessArticle
Galois connections and isomorphism of simultaneous ordered relations
Annals of Communications in Mathematics 2023
, 6 (2)
, 109-117
DOI: https://doi.org/10.62072/acm.2023.060204
AbstractIn order theory, partially ordered sets are only equipped with one relation which decides the entire structure/Hasse diagram of the set. In this paper we have presented how partially ordered sets can be studied under simultaneous partially ordered relations which we have called binary posets. The paper is motivated by the problem of operating a set simultaneously under two distinct partially ordered relations. It has been shown that binary posets follow duality principle just like posets do. Within this framework, some new definitions concerning maximal and minimal elements are also presented. Furthermore, some theorems on order isomorphism and Galois connections are derived.
Open AccessArticle
The Farey map exploited in the construction of a Farey mother wavelet
Annals of Communications in Mathematics 2023
, 6 (2)
, 118-132
DOI: https://doi.org/10.62072/acm.2023.060205
AbstractThe wavelet analysis of a function passes through its so-called wavelet transform. Such a transform is mathematically defined as a convolution product of the analyzed function with another analyzing function known as the mother wavelet by involving the scale and the translation parameters. This means that the mother wavelet construction is the starting and major point in the wavelet analysis. Besides, the choice of the mother wavelet remains a major problem in wavelet applications such as statistical series, time series, signal, and image processing. This needs more candidates of mother wavelets to be constructed. The main aim of the present paper is to construct a new mother wavelet by exploiting the well-known Farey map. We showed indeed that such a map may be a mother wavelet owing properties such as admissibility, moments, 2-scale relation, and reconstruction rule already necessary in the wavelet analysis of functions. By a suitable choice of translation-dilation parameters on the original Farey map, we succeeded to prove the main properties of a Farey wavelet analysis. The constructed mother looks to be suitable for many complicated applications such as hyperbolic PDEs.
Open AccessArticle
Applications of Soft Set Theory to the Subalgebras of CI-Algebras
Annals of Communications in Mathematics 2023
, 6 (2)
, 133-140
DOI: https://doi.org/10.62072/acm.2023.060206
AbstractIn this paper, the applicability of soft set theory to subalgebras of CI-algebras is investigated. CI-algebras are utilized in algebraic logic and computer science. Soft set theory is a framework for dealing with ambiguous or imprecise information. We employ soft sets to investigate the intersection and union of subalgebras, among other properties of subalgebras of CI-algebras. We demonstrate that soft set theory is a valuable tool for analyzing subalgebras of CI-algebras and developing new results in this domain. This paper contributes to the comprehension of soft set theory and its applications in CI algebras with the findings presented herein.