We prove a comparison principle for positive supersolutions and subsolutions to the Lane–Emden equation for the p-Laplacian, with subhomogeneous power in the right-hand side. The proof uses variational tools and the result applies with no regularity assumptions, both on the set and the functions. We then show that such a comparison principle can be applied to prove: uniqueness of solutions; sharp pointwise estimates for positive solutions in convex sets; localization estimates for maximum points and sharp geometric estimates for generalized principal frequencies in convex sets
AbstractIn the present paper we establish a quantitative comparison theorem for positive solutions o...
We extend Bony’s propagation of support argument to C1 solutions of the nonhomogeneous subelliptic p...
We study the ‘‘generalized’ ’ Dirichlet problem (in the sense of viscosity solutions) for quasilinea...
We prove a comparison principle for positive supersolutions and subsolutions to the Lane-Emden equa...
A comparison principle for the subdiffusive p-Laplacian in a possibly non-smooth and unbounded open ...
Abstract: A comparison principle for the subdiffusive p-Laplacian in a possibly non-smooth and unbou...
We investigate some strong comparison principles for nonnegative solutions to several parabolic prob...
We prove comparison principles for quasilinear elliptic equations whose simplest model islambda u - ...
We propose analogues of Green's and Picone's identities for thep-sub-Laplacian on stratified Lie gro...
We consider weak solutions of the differential inequality of p-Laplacian type - Δpu - f(u) ≤-Δpv - f...
AbstractLet Ω be either a ball or an annulus centered about the origin in RN and Δp the usual p-Lapl...
We consider the Dirichlet problem for positive solutions of the equation -Delta(m)(u) = f (u) in a b...
We show, using symmetrization techniques, that it is possible to prove a comparison principle (we ar...
AbstractWe consider quasilinear elliptic variational–hemivariational inequalities involving convex, ...
We prove the existence of positive solutions to a semipositone p-Laplacian problem combining mountai...
AbstractIn the present paper we establish a quantitative comparison theorem for positive solutions o...
We extend Bony’s propagation of support argument to C1 solutions of the nonhomogeneous subelliptic p...
We study the ‘‘generalized’ ’ Dirichlet problem (in the sense of viscosity solutions) for quasilinea...
We prove a comparison principle for positive supersolutions and subsolutions to the Lane-Emden equa...
A comparison principle for the subdiffusive p-Laplacian in a possibly non-smooth and unbounded open ...
Abstract: A comparison principle for the subdiffusive p-Laplacian in a possibly non-smooth and unbou...
We investigate some strong comparison principles for nonnegative solutions to several parabolic prob...
We prove comparison principles for quasilinear elliptic equations whose simplest model islambda u - ...
We propose analogues of Green's and Picone's identities for thep-sub-Laplacian on stratified Lie gro...
We consider weak solutions of the differential inequality of p-Laplacian type - Δpu - f(u) ≤-Δpv - f...
AbstractLet Ω be either a ball or an annulus centered about the origin in RN and Δp the usual p-Lapl...
We consider the Dirichlet problem for positive solutions of the equation -Delta(m)(u) = f (u) in a b...
We show, using symmetrization techniques, that it is possible to prove a comparison principle (we ar...
AbstractWe consider quasilinear elliptic variational–hemivariational inequalities involving convex, ...
We prove the existence of positive solutions to a semipositone p-Laplacian problem combining mountai...
AbstractIn the present paper we establish a quantitative comparison theorem for positive solutions o...
We extend Bony’s propagation of support argument to C1 solutions of the nonhomogeneous subelliptic p...
We study the ‘‘generalized’ ’ Dirichlet problem (in the sense of viscosity solutions) for quasilinea...