Quantum projective planes and Beilinson algebras of 3-dimensional quantum polynomial algebras for Type S'

Abstract

Let A=A(E,σ) be a 3-dimensional quantum polynomial algebra where E is P2 or a cubic divisor in P2, and σ∈ AutkE. Artin-Tate-Van den Bergh proved that A is finite over its center if and only if the order |σ| of σ is finite. As a categorical analogy of their result, the author and Mori showed that the following conditions are equivalent; (1) |σ3|<∞, where is the Nakayama automorphism of A. (2) The norm \|σ\| of σ is finite. (3) The quantum projective plane Proj ncA is finite over its center. In this paper, we will prove for Type S' algebra A that the following conditions are equivalent; (1) Proj ncA is finite over its center. (2) The Beilinson algebra ∇ A of A is 2-representation tame. (3) The isomorphism classes of simple 2-regular modules over ∇ A are parametrized by P2.