Quantum Projective Planes Finite over their Centers

Abstract

For a 3-dimensional quantum polynomial algebra A=A(E,σ), Artin-Tate-Van den Bergh showed that A is finite over its center if and only if |σ|<∞. Moreover, Artin showed that if A is finite over its center and E≠ P2, then A has a fat point module, which plays an important role in noncommutative algebraic geometry, however the converse is not true in general. In this paper, we will show that, if E≠ P2, then A has a fat point module if and only if the quantum projective plane Proj nc A is finite over its center in the sense of this paper if and only if |*σ3|<∞ where is the Nakayama automorphism of A.In particular, we will show that if the second Hessian of E is zero, then A has no fat point module.