Multiple solutions of sublinear Lane-Emden elliptic equations

We study the sublinear elliptic equation, -Delta u = vertical bar u vertical bar(p) sgn u + f(x,u) in the bounded domain Omega under the zero Dirichlet boundary condition. We suppose that 0 < p < 1 and vertical bar f(x,u)vertical bar is small enough near u = 0 and do not suppose that f(x,u) is odd on u. Then we prove that this problem has infinitely many solutions.