On the best constant in the nonlocal isoperimetric inequality of Almgren and Lieb
Abstract
In 1989 Almgren and Lieb proved a rearrangement inequality for the Sobolev spaces of fractional order Ws,p. The case p = 2 of their result implies the nonlocal isoperimetric inequality \[ Ps(E)|E|N-2sN Ps(B1)|B1|N-2sN,\ \ \ \ \ \ \ 0<s<1/2, \] where Ps indicates the fractional s-perimeter, and B1 is the unit ball in . In this note we explicitly compute the best constant, and show that for any 0<s<1/2, one has \[ Ps(B1)|B1|N-2sN = N π N2 + s (1-2s)s ( N2+1)2sN (1-s)(N+2-2s2). \]
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