Nakayama algebra

From HandWiki

In algebra, a Nakayama algebra or generalized uniserial algebra is an algebra such that each left or right indecomposable projective module has a unique composition series. They were studied by Tadasi Nakayama (1940) who called them "generalized uni-serial rings". These algebras were further studied by Herbert Kupisch (1959) and later by Ichiro Murase (1963-64), by Kent Ralph Fuller (1968) and by Idun Reiten (1982). An example of a Nakayama algebra is k[x]/(xn) for k a field and n a positive integer.

Current usage of uniserial differs slightly: an explanation of the difference appears here.

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