Brunn-Minkowski type inequalities for the lattice point enumerator
Abstract
Geometric and functional Brunn-Minkowski type inequalities for the lattice point enumerator Gn(·) are provided. In particular, we show that Gn((1-λ)K + λ L + (-1,1)n)1/n≥ (1-λ)Gn(K)1/n+λGn(L)1/n for any non-empty bounded sets K, L⊂Rn and all λ∈(0,1). We also show that these new discrete versions imply the classical results, and discuss some links with other related inequalities.
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