The interval neighborhoods in the real Grothendieck groups

Abstract

For a finite dimensional algebra A, the TF equivalence on the real Grothendieck group K0(proj A)R can be regarded as a completion of the g-fan. For example, the silting cones C(U) of 2-term presilting complexes U give the most fundamental family of TF equivalence classes. The next step is studying the TF equivalence classes around each silting cone C(U). Thus, in this paper, we investigate the closed interval neighborhood D(U) of C(U). As our main result, we give a 2|U|:1 correspondence between the TF equivalence classes in D(U) and those in K0(proj B)R, where B is the algebra appearing in the τ-tilting reduction at U. For this purpose, we give an explicit description of defining inequalities and the faces of D(U) as a polyhedral cone, by using 2-term simple-minded collections and M-TF equivalences.