An application of John ellipsoids to the Szego kernel on unbounded convex domains
Abstract
We use convex geometry tools, in particular John ellipsoids, to obtain a size estimate for the Szego kernel on the boundary of a class of unbounded convex domains in Cn. Given a polynomial b:Rn → R satisfying a certain growth condition, we consider domains of the type b = \ z∈Cn+1\,:\, Im[zn+1] > b( Re[z1],…, Re[zn]) \.
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