Some isoperimetric inequalities with respect to monomial weights

Abstract

We solve a class of isoperimetric problems on R2+ :=\ (x,y)∈ R 2 : y>0 \ with respect to monomial weights. Let α and β be real numbers such that 0 α <β+1, β 2 α. We show that, among all smooth sets in R 2+ with fixed weighted measure yβ dxdy, the weighted perimeter ∫∂ yα \, ds achieves its minimum for a smooth set which is symmetric w.r.t. to the y--axis, and is explicitly given. Our results also imply an estimate of a weighted Cheeger constant and a lower bound for the first eigenvalue of a class of nonlinear problems.