Measures of irrationality of the Fano surface of a cubic threefold
Abstract
For X a smooth cubic threefold we study the Pl\"ucker embedding of the Fano surface of lines S of X. We prove that if X is general then the minimal gonality of a covering family of curves of S is four and that this happens for a unique family of curves. The analysis also shows that there is a unique pentagonal connecting family of curves, which leads to the fact that the connecting gonality of S is five whereas the degree of irrationality, i.e.\ the minimal degree of a rational map from S to P2, is six.
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