Maranda's Theorem for Pure-Injective Modules and Duality

Abstract

Let R be a discrete valuation domain with field of fractions Q and maximal ideal generated by π. Let be an R-order such that Q is a separable Q-algebra. Maranda showed that there exists k∈N such that for all -lattices L and M, if L/Lπk M/Mπk then L M. Moreover, if R is complete and L is an indecomposable -lattice, then L/Lπk is also indecomposable. We extend Maranda's theorem to the class of R-reduced R-torsion-free pure-injective -modules. As an application of this extension, we show that if is an order over a Dedekind domain R with field of fractions Q such that Q is separable then the lattice of open subsets of the R-torsion-free part of the right Ziegler spectrum of is isomorphic to the lattice of open subsets of the R-torsion-free part of the left Ziegler spectrum of . Finally, with k as in Maranda's theorem, we show that if M is R-torsion-free and H(M) is the pure-injective hull of M then H(M)/H(M)πk is the pure-injective hull of M/Mπk. We use this result to give a characterisation of R-torsion-free pure-injective -modules and describe the pure-injective hulls of certain R-torsion-free -modules.