On non-vanishing of cohomologies of generalized Raynaud polarized surfaces
Abstract
We consider a family of slightly extended version of the Raynaud's surfaces X over the field of positive characteristic with Mumford-Szpiro type polarizations Z, which have Kodaira non-vanishing H1(X, Z-1) 0. The surfaces are at least normal but smooth under a special condition. We compute the cohomologies Hi(X, Zn), for intergers i and n, and study their (non-)vanishing. Finally, we give a fairly large family of non Mumford-Szpiro type polarizations Za,b with Kodaira non-vanishing.
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