On irrationality of surfaces in P3
Abstract
The degree of irrationality irr(X) of a n-dimensional complex projective variety X is the least degree of a dominant rational map X Pn. It is a well-known fact that given a product X× Pm or a n-dimensional variety Y dominating X, their degrees of irrationality may be smaller than the degree of irrationality of X. In this paper, we focus on smooth surfaces S⊂P3 of degree d≥ 5, and we prove that irr(S×Pm)=irr(S) for any positive integer m, whereas irr(Y)<irr(S) occurs for some Y dominating S if and only if S contains a rational curve.
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