On the relations between fundamental frequency and torsional rigidity in the case of anisotropic energies
Abstract
We consider variational energies of the form \[EH(u)=12∫ H2(∇ u)\,dx\] defined on the Sobolev space H10(), where H is a general seminorm. Our primary objective is to investigate optimization problems associated with the first eigenvalue λH() and the torsional rigidity TH() induced by the seminorm H. In particular, we focus on functionals of the type \[Fq,(H)=λH()\,THq(),\] where q>0 is a fixed real parameter. The optimization is performed with respect to the control H; we analyze both minimization and maximization problems for Fq,(H), as H ranges over a suitable class of seminorms.
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