On the lifting problem in P4 in characteristic p
Abstract
Given P4k, with k algebraically closed field of characteristic p>0, and X⊂ P4k integral surface of degree d, let Y=X H be the general hyperplane section of X. We suppose that h0 IY(s) 0 and h0 IX(s)=0 for some s>0. This determines a nonzero element α∈ H1 IX(s) such that α· H=0 in H1 IX(s). We find different upper bounds of d in terms of s, p and the order of α and we show that these bounds are sharp. In particular, we see that d s2 for p<s and d s2-s+2 for p s.
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