Existence of T-solution for degenerated problem via Minty’s lemma

We investigate the existence, multiplicity and bifurcation of solutions of a model nonlinear degenerate elliptic differential equation: &x 2 u"=\*u+ |u| p&1 u in (0, 1); u(0)=u(1)=0. This model is related to a simplified version of the nonlinear Wheeler DeWitt equation as it appears in quantum cosmo

In this paper we investigate the existence of multiple nontrivial solutions of a nonlinear heat flow problem with nonlocal boundary conditions. Our approach relies on the properties of a vector field on the phase plane and utilizes Sperner's Lemma, combined with the continuum property of the solutio

In this work we are interested in the existence of solutions for Dirichlet problems associated with the degenerate semilinear elliptic equations in the setting of the weighted Sobolev spaces W 1,2 0 (Ω, ω).

where f E C ([0, 1] x R~,~+), R+ = [0, ~) associated to the Lidstone boundary conditions Existence of a solution of boundary value problems (BVP) (1),(2) such that x(2i)(t)>O, 0 0, 0<t<l, i=0,1 .... ,2n-1. We further prove analogous results for the case when -f E C([0, 1] x Rn\\_,R\\_), i.e., deriva