Projectively Wakamatsu Tilting Modules over One-Point Extensions
Abstract
Let = [M] be the one-point extension of an algebra by a -module M. We establish a method to lift projectively Wakamatsu tilting (PWT) modules from mod\, to mod\, by adding the new projective module, and prove that this lifting process perfectly preserves mutation relations under certain homological conditions. Furthermore, for source point extensions of representation-finite algebras, we obtain a complete classification of PWT -modules in terms of those over . In particular, we establish a bijection \[ PWT() PWT() RPWT(, Si). \] which yields the counting formula about |PWT()|.
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