Solutions of a (p, q)-Laplacian equation involving a super-linear and a singular terms

In this paper, we consider the (p, q)-Laplacian problem -Delta(p)u - mu Delta(q)u + theta(x)u(p-1) = beta(x)u(p-1) + lambda a(x)u(-gamma) + b(x)u(r-1), with homogeneous Dirichlet boundary condition and u > 0 in Omega, where Omega subset of R-N is an open bounded domain with smooth boundary. The existence of an interval for lambda in which the problem has at least two positive weak solutions is proved. The main tools are Nehari manifold and the fibering method.