Strong Stability of Cotangent Bundles of Cyclic Covers

Abstract

Let X be a smooth projective variety over an algebraically closed field k of characteristic p>0 of X≥ 4 and Picard number (X)=1. Suppose that X satisfies Hi(X,Fm*X(jX)-1)=0 for any ample line bundle on X, and any nonnegative integers m,i,j with 0≤ i+j< X, where FX:X→ X is the absolute Frobenius morphism. We prove that by procedures combining taking smooth hypersurfaces of dimension ≥ 3 and cyclic covers along smooth divisors, if the resulting smooth projective variety Y has ample (resp. nef) canonical bundle ωY, then Y is strongly stable (resp. strongly semistable) with respect to any polarization.