Ponka Adjunction

Abstract

For a signature and its subsignature ≠ 0 without 0-ary operation symbols, we prove (1) that there are strong Lawvere adjoint cylinders between the category Ssl, of sup-semilattices, and the categories ∫SslIsys, of sup-semilattice inductive systems of -algebras, and ∫SslIsys≠ 0, of sup-semilattice inductive systems of ≠ 0-algebras; (2) that there exists an adjunction between Ssl and the category Alg(≠ 0), of ≠ 0-algebras; (3) that there exists an adjunction between the categories Ssl and Lnb, the category of left normal bands; (4) after defining and stating several technical results on the category PAlg(≠ 0), of Ponka ≠ 0-algebras, and defining functors J≠ 0 from PAlg(≠ 0) to Alg(≠ 0)Lnb, the tensor product of Alg(≠ 0) and Lnb, and P≠ 0 from Alg(≠ 0)Lnb to Alg(≠ 0), we prove that P≠ 0 J≠ 0 has a left adjoint; finally, (5) after defining a functor Is≠ 0 from PAlg(≠ 0) to ∫SslIsys≠ 0 we prove the main result of this paper: that Is≠ 0 has a left adjoint P≠ 0, which is the Ponka sum.