Comparison of two constructions of noncommutative surfaces with exceptional collections of length 4

Abstract

Recently the Euler forms on numerical Grothendieck groups of rank 4 whose properties mimick that of the Euler form of a smooth projective surface have been classified. This classification depends on a natural number m, and suggests the existence of noncommutative surfaces which up to that point had not been considered for m≥ 2. These have been constructed for m=2 using noncommutative P1-bundles, and for all m≥ 2 by a different construction using maximal orders on BlxP2. In this article we compare the constructions for m=2, i.e. we compare the categories arising from half-ruled del Pezzo quaternion orders on F1 with noncommutative P1-bundles on P1. This can be seen as a noncommutative instance of the classical isomorphism F1xP2.