Extending (τ-)tilting subcategories and (co)silting modules

ASADOLLAHI, JAVAD; PADASHNIK, FARZAD; SADEGHI, SOMAYEH; TREFFINGER, HIPOLITO

Communications in Algebra

Taylor and Francis Ltd.

Año: 2024

Assume that B is a finite dimensional algebra, and A=B[P0] is the one-point extension algebra of B using a finitely generated projective B-module P0. The categories of B-modules and A-modules are connected via two adjoint functors known as the restriction and extension functors, denoted by R and E, respectively. These functors have nice homological properties and have been studied in the category mod-A of finitely presented modules that we extend to the category Mod-A of all A-modules. Our main focus is to investigate the behavior of important subcategories (tilting and τ-tilting subcategories) and objects (finendo quasi-tilting modules, silting modules, and cosilting modules) under these functors.