In this Note, we study the existence of low- or high-energy solutions for a class of elliptic problems containing a nonlinear term that oscillates either near the origin or at infinity. We point out the competition effect between the oscillatory nonlinearity, a polynomial growth term, and the values of a real parameter. The proofs combine related variational methods
AbstractWe prove the existence of two unbounded sequences of strictly positive solutions, obtained r...
Abstract. In this paper we investigate the behavior of a family of steady state solutions of a nonli...
In the first part we study a class of semi-linear and quasi-linear systems which describe the intera...
In this Note, we study the existence of low- or high-energy solutions for a class of elliptic proble...
In this Note, we study the existence of low- or high-energy solutions for a class of elliptic proble...
In this Note, we study the existence of low- or high-energy solutions for a class of elliptic proble...
In this Note, we study the existence of low- or high-energy solutions for a class of elliptic proble...
AbstractWe guarantee the existence of infinitely many different pairs of solutions to the system{−Δu...
In this paper, by using variational methods, we study an elliptic problem involving a general operat...
In this paper, by using variational methods, we study an elliptic problem involving a general operat...
In this paper, by using variational methods, we study an elliptic problem involving a general operat...
In this paper, by using variational methods, we study an elliptic problem involving a general operat...
In this paper, we investigate the behavior of a family of steady-state solutions of a nonlinear reac...
AbstractVia a suitable extension of a classical Theorem of Stampacchia in the Theory of linear ellip...
AbstractIn this paper, we study the existence of nontrivial solutions and infinitely many high energ...
AbstractWe prove the existence of two unbounded sequences of strictly positive solutions, obtained r...
Abstract. In this paper we investigate the behavior of a family of steady state solutions of a nonli...
In the first part we study a class of semi-linear and quasi-linear systems which describe the intera...
In this Note, we study the existence of low- or high-energy solutions for a class of elliptic proble...
In this Note, we study the existence of low- or high-energy solutions for a class of elliptic proble...
In this Note, we study the existence of low- or high-energy solutions for a class of elliptic proble...
In this Note, we study the existence of low- or high-energy solutions for a class of elliptic proble...
AbstractWe guarantee the existence of infinitely many different pairs of solutions to the system{−Δu...
In this paper, by using variational methods, we study an elliptic problem involving a general operat...
In this paper, by using variational methods, we study an elliptic problem involving a general operat...
In this paper, by using variational methods, we study an elliptic problem involving a general operat...
In this paper, by using variational methods, we study an elliptic problem involving a general operat...
In this paper, we investigate the behavior of a family of steady-state solutions of a nonlinear reac...
AbstractVia a suitable extension of a classical Theorem of Stampacchia in the Theory of linear ellip...
AbstractIn this paper, we study the existence of nontrivial solutions and infinitely many high energ...
AbstractWe prove the existence of two unbounded sequences of strictly positive solutions, obtained r...
Abstract. In this paper we investigate the behavior of a family of steady state solutions of a nonli...
In the first part we study a class of semi-linear and quasi-linear systems which describe the intera...
DOI
Add to ORKG