Non-linear Gagliardo--Nirenberg inequality involving a second-order elliptic operator in non-divergent form

Abstract

We obtain the inequalities of the form ∫|∇ u(x)|2h(u(x))\, d x≤ C∫ ( |P u(x)|| TH(u(x))|)2h(u(x))\, d x +, where ⊂ Rn is a bounded Lipschitz domain, u∈ W2,1 loc() is non-negative, P is a uniformly elliptic operator in non-divergent form, TH(· ) is certain transformation of the monotone C1 function H(·), which is the primitive of the weight h(·), and is the boundary term which depends on boundary values of u and ∇ u, which hold under some additional assumptions. Our results are linked to some results from probability and potential theories, e.g.~to some variants of the Douglas formulae.