Existence and multiplicity of positive solutions for singular p-Laplacian equations

Positive solutions are obtained for the boundary value problem Delta(p)u = lambda(u(beta) + (1)/u(alpha)) in Omega u > 0 in Omega u = 0 on partial derivative Omega, where Delta(p)u = div(vertical bar del u vertical bar(p-2)del u), 1 < p < N, N >= 3, Omega subset of R-N is a bounded domain, 0 < alpha < 1 and p - 1 < beta < p* - 1 (p* =(Np)/(N-p)) are two constants, lambda > 0 is a real parameter. We obtain that Problem (*) has two positive weakly solutions if lambda is small enough.