Hanpeng Gao
Published 2021-02-02Version 1
Let $B$ be an one-point extension of a finite dimensional $k$-algebra $A$ by a simple $A$-module at a source point $i$. In this paper, we classify the $\tau$-tilting modules over $B$. Moreover, it is shown that there are equations $$|\tilt B|=|\tilt A|+|\tilt A/\langle e_i\rangle|\quad \text{and}\quad |\stilt B|=2|\stilt A|+|\stilt A/\langle e_i\rangle|.$$ As a consequence, we can calculate the numbers of $\tau$-tilting modules and support $\tau$-tilting modules over linearly Dynkin type algebras whose square radical are zero.
Comments: 8 pages; accepted by Journal of algebra and its applications
On the number of support $τ$-tilting modules over Nakayama algebras
Distributive lattices of tilting modules and support $τ$-tilting modules over path algebras
Universal derived equivalences of posets of tilting modules
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