Representations and corepresentations of p-equipped posets

Abstract

For p a prime number and P a p-equipped finite partially ordered set we construct two different right-peak algebras (in the sense of KS) (r) and (c). We consider the category U(r) (U(c)) consisting of the finitely generated right (r)-modules ((c)-modules) which are socle-projective. The categories U(r) and U(c) have almost split sequences. We describe he Auslander-Reiten components CU(r) and CU(c) of the corresponding simple projective modules in U(r) and U(c). Then we prove that there is a bijective correspondence between CU(r) and CU(c), although the corresponding almost split sequences have different shapes.