Uniqueness and nonuniqueness of nodal radial solutions of sublinear elliptic equations in a ball

In this paper, we deal with the sublinear elliptic equation: -∆u+V (x)u+a(x)|u| p sgn(u) = f on R N , N > 2, 0 < p < 1. Under suitable assumptions on the terms V and a, we prove some existence, uniqueness and multiplicity results. Continuity of solutions in the perturbation parameter f at 0 is also

In this paper we prove theorems on propagation of smallness and the uniqueness of solutions to some elliptic equations in the plane. We start with analogues of these theorems for harmonic functions and use their quasiinvariance under quasiconformal mappings as well as the connection of considered eq

We prove the existence and uniqueness of a renormalized solution to nonlinear elliptic equations with variable exponents and L 1 -data. The functional setting involves Sobolev spaces with variable exponents W 1,p(•) (Ω).