On del Pezzo elliptic varieties of degree ≤ 4

Abstract

html:<a href="hrefstring"> Let Y be a del Pezzo variety of degree d≤ 4 and dimension n≥ 3, let H be an ample class such that -KY=(n-1)H and let Z⊂ Y be a 0-dimensional subscheme of length d such that the subsystem of elements of |H| with base locus Z gives a rational morphism πZ Y Pn-1. Denote by π X Pn-1 the elliptic fibration obtained by resolving the indeterminacy locus of πZ. Extending the results of [arXiv:1305.3340] we study the geometry of the variety X and we prove that the Mordell-Weil group of π is finite if and only if the Cox ring of X is finitely generated.