Amazing examples of nonrational smooth spectral surfaces

Abstract

In this paper we construct first examples of smooth projective surfaces of general type satisfying the following conditions: there are 1) an ample integral curve C with C2=1 and h0(X,OX(C))=1; 2) a divisor D with (D, C)X=g(C)-1, hi(X,OX(D))=0, i=0,1,2, and h0(X, OX(D+C))=1. Such conditions arise from necessary and sufficient conditions for the existence of non-trivial commutative subalgebras of rank one in D, a completion of the algebra of partial differential operators in two variables, which can be thought of as a simple algebraic analogue of the algebra of analytic pseudodifferential operators on a manifold. We extract these conditions by elaborating the classification theorem of commutative subalgebras in D due to the second author for the case of rank one subalgebras. Amazingly, the commutative subalgebras with such spectral surfaces do not admit isospectral deformations.