Algebraic reverse Khovanskii--Teissier inequality via Okounkov bodies

Abstract

Let X be a projective variety of dimension n over an algebraically closed field of arbitrary characteristic and let A, B, C be nef divisors on X. We show that for any integer 1≤ k≤ n-1, (Bk· An-k)· (Ak· Cn-k)≥ k!(n-k)!n!(An)· (Bk· Cn-k). The same inequality in the analytic setting was obtained by Lehmann and Xiao for compact K\"ahler manifolds using the Calabi--Yau theorem, while our approach is purely algebraic using (multipoint) Okounkov bodies. We also discuss applications of this inequality to B\'ezout-type inequalities and inequalities on degrees of dominant rational self-maps.

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