Volumes in Calabi-Yau Complete Intersection of Products of Projective Space

Abstract

We prove that the birational automorphism group of a general Calabi-yau complete intersection X given by ample divisors in Pn1×·s×Pnl is always Lorentzain. Applying the Kawamata-Morrison cone theorem on such X, we compute volX(D+sA) for any divisor D∈ ∂Eff(X) and ample divisor A when s is small. We also provide examples of volumes of certain Cartier divisors that involve the digamma function.

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