DA Romano - Open J. Math. Sci, 2021 - academia.edu
In this article, we continue our research on quasi-ordered residuated systems introduced in 2018 by S. Bonzio and I. Chajda and various types of filters in them. Some fundamental …
DA Romano - J. Int. Math. Virtual Inst, 2022 - researchgate.net
The concept of quasi-ordered residuated systems was introduced in 2018 by S. Bonzio and I. Chajda. This author designed the concepts of ideals and filters in such systems as …
DA Romano - Quasigroups and Related Systems, 2022 - ibn.idsi.md
The concept of quasi-ordered residuated systems was introduced by Bonzio and Chajda in 2018. The author introduced the concept of filters in such systems as well as some types of …
DA Romano - Contributions to Mathematics, 2021 - shahindp.com
In this article, the notion of weakly irreducible filters in strong quasi-ordered residuated systems is introduced and analyzed. It is shown that any weakly irreducible filter is a prime …
DA Romano - Contributions to Mathematics, 2020 - academia.edu
The concept of residuated relational systems ordered under a quasi-order relation (in short: QRS) was introduced by Bonzio and Chajda [Asian–Eur. J. Math. 11 (2018) Art# 1850024] …
DA Romano - Bull. Int. Math. Virtual Inst, 2021 - academia.edu
The concept of residuated relational systems ordered under a quasi-order relation was introduced in 2018 by S. Bonzio and I. Chajda as a structure A=⟨ A,·,→, 1, R⟩, where (A,·) is …
The concept of quasi-ordered residuated system was defined in 2018 by Bonzio and Chajda. The present author defined the notion of filters in quasi-ordered residuated system …
DA ROMANO - Annals of Communications in Mathematics, 2023 - academia.edu
Quasi-ordered residuated systems as a generalization of both quasi-ordered commutative residuated lattices and hoop-algebras was developed in 2018 by Bonzio and Chajda. The …
DA Romano - Communications in Advanced Mathematical …, 2022 - dergipark.org.tr
The concept of residuated relational systems ordered under a quasi-order relation was introduced in 2018 by S. Bonzio and I. Chajda as a structure $\mathfrak {A}=\langle …