A Variety Containing EMV-Algebras and Pierce Sheaves

Abstract

According to Dvz, we know that the class of all EMV-algebras, EMV, is not a variety, since it is not closed under the subalgebra operator. The main aim of this work is to find the least variety containing EMV. For this reason, we introduced the variety wEMV of wEMV-algebras of type (2,2,2,2,0) induced by some identities. We show that, adding a derived binary operation to each EMV-algebra (M;,,,0), we extend its language, so that (M;,,,,0), called an associated wEMV-algebra, belongs to wEMV. Then using the congruence relations induced by the prime ideals of a wEMV-algebra, we prove that each wEMV-algebra can be embedded into an associated wEMV-algebra. We show that wEMV is the least subvariety of the variety of wEMV-algebras containing EMV. Finally, we study Pierce sheaves of proper EMV-algebras.