A weighted isoperimetric inequality in a wedge
Abstract
Let c, k1,..., kN be non-negative numbers, and define a measure μ in the wedge W:= \x∈ R N :\, xi >0, i=1,...,N\ by dμ = ec|x|2 x1 k1...xN kN \, dx . It is shown that among all measurable subsets of W with fixed μ -measure, the intersection of W with a ball centered at the origin renders the weighted perimeter relative to W a minimum.
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