Lack of coercivity in a concave–convex type equation

where Ω ⊂ R N is a bounded domain such that 0 ∈ Ω, 1 < q < p, λ > 0, µ < μ, f and g are nonnegative functions, μ = ( N-p p ) p is the best Hardy constant and p \* = Np N-p is the critical Sobolev exponent. By extracting the Palais-Smale sequence in the Nehari manifold, the existence of multiple posi

## Abstract Given a __C__^2^ function __u__, we consider its quasi–convex envelope __u__\* and we investigate the relationship between __D__^2^__u__ and __D__^2^__u__\* (the latter intended in viscosity sense); we obtain two inequalities between the tangential Laplacian of __u__ and __u__\* and the

The aim of this paper is to solve a division problem for the algebra of functions, which are holomorphic in a domain D ⊂ C n , n > 1, and grow near the boundary not faster than some power oflog dist(z, bD). The domain D is assumed to be smoothly bounded and convex of finite d'Angelo type.