The Pólya-Szegő inequality for smoothing rearrangements

Abstract: A basic version of the Pólya-Szegő inequality states that if Φ is a Young function, the Φ-Dirichlet energy-the integral of Φ( ∇f )-of a suitable function f ∈ V(R n ), the class of nonnegative measurable functions on R n that vanish at infinity, does not increase under symmetric decreasing rearrangement. This fact, along with variants that apply to polarizations and to Steiner and certain other rearrangements, has numerous applications. Very general versions of the inequality are proved that hold for all smooth… Show more