Morphisms from a very general hypersurface
Abstract
Let X be a very general hypersurface of degree d in the projective (n+1)-space with n 3, and f: X Y a non-birational surjective morphism to a normal projective variety Y. We first prove that Y is a klt Fano variety if deg \, f C for some constant C = C(n, d) depending only on n and d. Next we prove an optimal upper bound deg \, f deg \, X provided that Y is factorial, deg \, f is prime and deg \, f E(n) for some constant E(n) (with E(n) = n(n+1) when Y is smooth). As a corollary, we show that Y Pn under some conditions on Y and deg \, f.
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