Multiple nodal solutions are obtained for the elliptic problem -Delta u = f(x, u) + epsilon g(x, u) in Omega, u = 0 on partial derivative Omega, where epsilon is a parameter, Omega is a smooth bounded domain in R-N, f epsilon C((Omega) over bar x R), and g epsilon C((Omega) over bar x R). For a superlinear C-1 function f which is odd in u and for any C-1 function g, we prove that for any j epsilon N there exists epsilon(j) > 0 such that if vertical bar epsilon vertical bar <= epsilon(j) then the above problem possesses at least j distinct nodal solutions. Except C-1 continuity no further condition is needed for g. We also prove a similar result for a continuous sublinear function f and for any continuous function g. Results obtained here refine earlier results of S. J. Li and Z. L. Liu in which the nodal property of the solutions was not considered.

• 出版日期2008-9
• 单位首都师范大学; 湖南师范大学