Amalgamation of rings defined by b\'ezout-like conditions

Abstract

Let f:A B be a ring homomorphism and let J be an ideal of B. In this paper, we investigate the transfer of notions elementary divisor ring, Hermite ring and B\'ezout ring to the amalgamation AfJ. We provide necessary and sufficient conditions for AfJ to be an elementary divisor ring where A and B are integral domains. In this case it is shown that AfJ is an Hermite ring if and only it is a B\'ezout ring. In particular, we study the transfer of the previous notions to the amalgamated duplication of a ring A along an A-submodule E of Q(A) such that E2⊂eq E.