On an analogue of the Markov equation for exceptional collections of length 4

Abstract

We classify the solutions to a system of equations, introduced by Bondal, which encode numerical constraints on full exceptional collections of length 4 on surfaces. The corresponding result for length 3 is well-known and states that there is essentially one solution, namely the one corresponding to the standard exceptional collection on the surface P2. This was essentially proven by Markov in 1879. It turns out that in the length 4 case, there is one special solution which corresponds to P1×P1 whereas the other solutions are obtained from P2 by a procedure we call numerical blowup. Among these solutions, three are of geometric origin (P2 \\, P1×P1 and the ordinary blowup of P2 at a point). The other solutions are parametrized by N and very likely do not correspond to commutative surfaces. However they can be realized as noncommutative surfaces, as was recently shown by Dennis Presotto and the first author.