English

Isomorphisms between Morita context rings

Rings and Algebras 2011-07-01 v1

Abstract

Let (R,S,R ⁣MS,S ⁣NR,f,g)(R, S,_R\negthinspace M_S,_S\negthinspace N_R, f, g) be a general Morita context, and let T=[{cc} R &_RM_S_SN_R & S] be the ring associated with this context. Similarly, let T'=[{cc} R' & M' N' & S'] be another Morita context ring. We study the set Iso(T,T){Iso}(T,T') of ring isomorphisms from TT to TT'. Our interest in this problem is motivated by: (i) the problem to determine the automorphism group of the ring TT, and (ii) the recovery of the non-diagonal tiles problem for this type of generalized matrix rings. We introduce two classes of isomorphisms from TT to TT', the disjoint union of which is denoted by Iso0(T,T){Iso}_0(T,T'). We describe Iso0(T,T){Iso}_0(T,T') by using the Z\Z-graded ring structure of TT and TT'. Our main result characterizes Iso0(T,T){Iso}_0(T,T') as the set consisting of all semigraded isomorphisms and all anti-semigraded isomorphisms from TT to TT', provided that the rings RR' and SS' are indecomposable and at least one of MM' and NN' is nonzero; in particular Iso0(T,T){Iso}_0(T,T') contains all graded isomorphisms and all anti-graded isomorphisms from TT to TT'. We also present a situation where Iso0(T,T)=Iso(T,T){Iso}_0(T,T')={Iso}(T,T'). This is in the case where R,S,RR,S,R' and SS' are rings having only trivial idempotents and all the Morita maps are zero. In particular, this shows that the group of automorphisms of TT is completely determined.

Cite

@article{arxiv.1106.6192,
  title  = {Isomorphisms between Morita context rings},
  author = {C. Boboc and S. Dascalescu and L. van Wyk},
  journal= {arXiv preprint arXiv:1106.6192},
  year   = {2011}
}
R2 v1 2026-06-21T18:29:44.937Z