Abstract
This article studies the homological properties of generalized group algebra L 1(G, A) of a locally compact group G over a Banach algebra A with an identity of norm 1. It is shown that if L 1(G, A) is right continuous then G is finite and A is right continuous. It is also shown that L 1(G, A) is right self-injective if and only if G is finite and A is right self-injective.
Notes
Communicated by S. K. Sehgal.
Dedicated to the memory of late Professor Irving Kaplansky.