Existence and homogenization for semilinear elliptic equations with noncompact nonlinearity

Existence theorems for the nonlinear parabolic differential equation yѨ urѨ t q < < p Ž . n w . ⌬uq u qf x, t s 0 in ‫ޒ‬ = 0, ϱ with zero initial value are established given Ž . explicit conditions on the nonhomogeneous term f x, t . An existence theorem is also demonstrated for the corresponding e

The elliptic equation \(\Delta u+f(u)=0\) in \(R^{n}\) is discussed in the case where \(f(u)=\) \(|u|^{n} \quad u(|u| \geqslant 1),=|u|^{4} \quad{ }^{1} u(|u|<1), 10\). It is further proved that for any \(k \geqslant 0\) there exist at least three radially symmetric solutions which have exactly \(k\

In this paper, we study the symmetry properties of the solutions of the semilinear elliptic problem ( where O is a bounded symmetric domain in R N , N 52, and f : O Â R ! R is a continuous function of class C 1 in the second variable, g is continuous and f and g are somehow symmetric in x. Our main

The existence and multiplicity results are obtained for solutions of a class of the Dirichlet problem for semilinear elliptic equations by the least action principle and the minimax methods, respectively.