A Nonlinear Problem Depending on the Unknown Dirichlet Values of the Solution

We prove that a semilinear elliptic boundary value problem has five solutions when the range of the derivative of the nonlinearity includes at least the first two eigenvalues. We also prove that if the region is a ball the semilinear elliptic problem has two solutions that change sign and are nonrad

We study the existence of solutions for the following problem: ## u"(t) + u(t) + g (u'(t)) = f(t), t E (0, 7r), u(O) = u(~) = O, (1) where f E C[0, ~], g E C(R) is bounded and has limits limu~±oo g(u). We also give information on the set of f for those that solution exists, relating it with the

## Abstract In the present paper, we consider the nonlinear Dirichlet problem ‐ Δ__u__(__x__) __u__^β^(__x__) = 0 equation image is the unit ball and q is a continuous radially symmetric function on __B__ which may be singular on ∂B. We state some mild conditions for the function __q__ so that th