English

Implication Zroupoids and Birkhoff Systems

Logic 2020-01-20 v1

Abstract

An algebra A=A,,0A = \langle A, \to, 0 \rangle, where \to is binary and 00 is a constant, is called an implication zroupoid (I-zroupoid, for short) if A satisfies the identities: (xy)z((zx)(yz))(x \to y) \to z \approx ((z' \to x) \to (y \to z)')', where x:=x0x' := x \to 0, and 000'' \approx 0. These algebras generalize De Morgan algebras and \lor-semilattices with zero. Let I denote the variety of implication zroupoids. For details on the motivation leading to these algebras, we refer the reader to [San12] (or the relevant papers mentioned at the end of this paper). The investigations into the structure of the lattice of subvarieties of I, begun in [San12], have continued in [CS16a, CS16b, CS17a, CS17b, CS18a, CS18b, CS19] and [GSV19]. The present paper is a sequel to this series of papers and is devoted to making further contributions to the theory of implication zroupoids. The identity (BR): x(xy)x(xy)x \land (x \lor y) \approx x \lor (x \land y) is called the Birkhoff's identity. The main purpose of this paper is to prove that if A is an algebra in the variety I, then the derived algebra Amj:=A;,A_{mj} := \langle A; \land, \lor \rangle, where ab:=(ab)a \land b := (a \to b')' and ab:=(ab)a \lor b := (a' \land b')', satisfies the Birkhoff's identity. As a consequence, we characterize the implication zroupoids A whose derived algebras AmjA_{mj} are Birkhoff systems. It also follows from the main result that there are bisemigroups that are not bisemilattices but satisfy the Birkhoff's identity, which suggests a more general notion, than Birkhoff systems, of "Birkhoff bisemigroups" as bisemigroups satisfying the Birkhoff's identity. The paper concludes with an open problem on Birkhoff bisemigroups.

Keywords

Cite

@article{arxiv.2001.06150,
  title  = {Implication Zroupoids and Birkhoff Systems},
  author = {Juan M. Cornejo and Hanamantagouda P. Sankappanavar},
  journal= {arXiv preprint arXiv:2001.06150},
  year   = {2020}
}

Comments

12 pages

R2 v1 2026-06-23T13:13:39.568Z