Approximations in n-ary algebraic systems

Abstract: Algebraic systems have many applications in the theory of sequential machines, formal languages, computer arithmetics, design of fast adders and error-correcting codes. The theory of rough sets has emerged as another major mathematical approach for managing uncertainty that arises from inexact, noisy, or incomplete information. This paper is devoted to the discussion of the relationship between algebraic systems, rough sets and fuzzy rough set models. We shall restrict ourselves to algebraic systems with one n… Show more

“…Davvaz in [15] studied approximations in algebraic systems. Ameri and Zahedi studied algebraic hypersystems in [16].…”

Applications of interval valued fuzzy n-ary polygroups with respect to t-norms (t-conorms)

“…Davvaz in [15] studied approximations in algebraic systems. Ameri and Zahedi studied algebraic hypersystems in [16].…”

Applications of interval valued fuzzy n-ary polygroups with respect to t-norms (t-conorms)

“…Recently, the research about n-ary hyperstructurs has been initiated by Davvaz and Vougiouklis who introduced these structure in [11] and studied by Davvaz, Dudek, Leoreanu-Fotea, Mirvakili, Vougiouklis, and others, see [8,12,13,20,21]. n-Ary hypergroups are a generalization of hypergroups in the sense of Marty, [see 4,5].…”

Construction of TernaryH_v-groups and TernaryP-hyperoperations

“…When both measurement and input are fuzzy, the approximation is the only truth we are dealing with. Various methods, borrowed and adapted from all areas, numeric analysis and algebra to functional analysis and differential equations, are put to work -see for example (Coroianu & all, 2019), (Dawaz, 2008), (Ishibuchi & all, 2006) and (Wang, Li, 2019). But remarkably, most methods used to achieve good approximations are based essentially on the continuum of the real numbers and, as I believe, do not use enough the intimate properties of the rational numbers.…”

Smooth approximations by continuous choice-functions