A note on stability of syzygy bundles on Enriques and bielliptic surfaces

Abstract

In this note, we prove that the syzygy bundle ML is cohomologically stable with respect to L for any ample and globally generated line bundle L on an Enriques (resp. bielliptic) surface over an algebraically closed field of characteristic ≠ 2 (resp. ≠ 2,3). In particular our result on complex Enriques surfaces improves a result of Torres-L\'opez and Zamora by removing a condition on Clifford index. Together with the results of Camere and Caucci--Lahoz, it implies that ML is stable with respect to L for an ample and globally generated line bundle L on any smooth minimal complex projective surface X of Kodaira dimension zero.