SOME TYPES OF PARTIAL GENERALIZED HYPERSUBTITUTIONS OF MANY-SORTED ALGEBRAS

  • Dawan Chumpungam
  • Sorasak Leeratanavalee
Keywords: many-sorted algebra, i-sorted partial Σ-generalized hypersubstitution, i-sorted Σ-algebras, Σ-terms

Abstract

One of important study in Universal algebra is to classify algebras into varieties and classify varieties into hypervarieties. The concept of a hypersubstitution, which is a tool used to study hyperidentities, was introduced by K. Denecke, D. Lau, R. P¨oschel and D. Schweigert [3]. In 2000, S. Leeratanavalee and K. Denecke [6] extended the above conceptto the concept of a generalized hypersubstitution. In Universal algebra, we do not study only algebras which have one base set but many base sets. In 1970, G. Birkhoff and John D. Lipson [1] extended the concept of base structure of algebras from one-sorted to many-sorted, that is called heterogeneous algebras or many-sorted algebras. In this present paper, we show that the set of partial generalized hypersubstitutions Σ|I|,n(i)-HypG forms a monoid.

Published
2021-01-06