Rational quartic curves in the Mukai-Umemura variety

Abstract

Let X be the Fano threefold of index one, degree 22, and Pic(X). Such a threefold X can be realized by a regular zero section s of (2F*) 3 over Grassmannian variety Gr(3,V), V=7 with the universal subbundle F. When the section s is given by the net of the SL2-invariant skew forms, we call it by the Mukai-Umemura (MU) variety. In this paper, we prove that the Hilbert scheme of rational quartic curves in the MU-variety is smooth and compute its Poincar\'e polynomial by applying the Biaynicki-Birula's theorem.

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