A priori estimates for a semilinear elliptic system without variational structure and their applications

In this article we consider (component-wise) positive radial solutions of a weakly coupled semilinear elliptic system in a ball with homogeneous Dirichlet data. We deal with a nonvariational problem. We show that the existence results recently obtained by Zou, while very general, nevertheless do not

In this paper, we present a new bootstrap procedure for elliptic systems with two unknown functions. When combined with the L p -L q -estimates, it yields the optimal L ∞ -regularity conditions for the three well-known types of weak solutions: H 1 0 -solutions, L 1 -solutions and L 1 δ -solutions. T

We prove existence and uniform a priori estimates for tempered Gibbs states of certain classical lattice systems with unbounded spins, nonharmonic pair potentials, and infinite radius of interaction. We use an alternative characterization of Gibbs measures in terms of their Radon Nikodym derivatives

A variational inequality index for γ -condensing maps is established in Hilbert spaces. New results on existence of nonzero positive solutions of variational inequalities for such maps are proved by using the theory of variational inequality index. Applications of such a theory are given to existenc