Exact Solutions for Some Nuclear Many-Body Problems

## Abstract By means of a perturbation argument devised by P. Bolle, we prove the existence of infinitely many solutions for perturbed symmetric polyharmonic problems with non–homogeneous Dirichlet boundary conditions. An extension to the higher order case of the estimate from below for the critica

In this problem, we are given N uniformly distributed random intervals of 0 1 . For each random interval I, we are given a weight X I . These weights are independent, independent of the intervals, and satisfy P X I ≤ t = t α , where α > 0. A packing of the family is a disjoint subfamily of intervals

In this paper we extend some Chebyshev and Remez-type inequalities for multivariate polynomials. ## 1997 Academic Press Consider the set P n of complex valued polynomials of m real variables and of total degree at most n: | the uniform norm of p on K, and let ' m (K) be the m-dimensional Lebesque

In this paper, we study the multiple solutions for the semilinear elliptic equation where N 2, 11 for N = 2. We will prove that the problem possesses infinitely many solutions under some assumptions on Q(x).