Add to ORKGThis article concerns the existence and multiplicity of solutions for elliptic systems with weights, and nonlinearities having exponential critical growth. Our approach is based on the Trudinger-Moser inequality and on a minimax theorem
In this paper we prove a kind of weighted Trudinger-Moser inequality which is employed to establish ...
In this article, we study the limit case of some elliptic problems involving nonlinearities having ...
In this paper, using variational methods, we establish the existence and multiplicity of weak soluti...
The paper deals with the existence of nonnegative solutions for systems in involving critical expo...
AbstractOne class of critical growth elliptic systems of two equations is considered on a bounded do...
The multiplicity of positive solutions are established for a class of elliptic systems involving non...
In this article, we study elliptic problems of Kirchhoff type in dimension $ N \geq 2$, whose nonl...
The author considers the semilinear elliptic equation (−)mu = g(x, u), subject to Dirichlet boundary...
Abstract. The author considers the semilinear elliptic equation (−∆)mu = g(x, u), subject to Dirichl...
In the first part we study a class of semi-linear and quasi-linear systems which describe the intera...
In this work, we deal with elliptic systems under critical growth conditions on the nonlinearities. ...
AbstractUsing minimax methods we study the existence and multiplicity of solitary wave solutions for...
In this paper we establish the existence of solutions for elliptic equations of the form $-\text{div...
By combining techniques of nonsmooth critical point theory with a sharp estimate of Trudinger-Moser ...
In this paper, we investigate the existence of solutions to the planar non-autonomous Schrödinger–Po...
In this paper we prove a kind of weighted Trudinger-Moser inequality which is employed to establish ...
In this article, we study the limit case of some elliptic problems involving nonlinearities having ...
In this paper, using variational methods, we establish the existence and multiplicity of weak soluti...
The paper deals with the existence of nonnegative solutions for systems in involving critical expo...
AbstractOne class of critical growth elliptic systems of two equations is considered on a bounded do...
The multiplicity of positive solutions are established for a class of elliptic systems involving non...
In this article, we study elliptic problems of Kirchhoff type in dimension $ N \geq 2$, whose nonl...
The author considers the semilinear elliptic equation (−)mu = g(x, u), subject to Dirichlet boundary...
Abstract. The author considers the semilinear elliptic equation (−∆)mu = g(x, u), subject to Dirichl...
In the first part we study a class of semi-linear and quasi-linear systems which describe the intera...
In this work, we deal with elliptic systems under critical growth conditions on the nonlinearities. ...
AbstractUsing minimax methods we study the existence and multiplicity of solitary wave solutions for...
In this paper we establish the existence of solutions for elliptic equations of the form $-\text{div...
By combining techniques of nonsmooth critical point theory with a sharp estimate of Trudinger-Moser ...
In this paper, we investigate the existence of solutions to the planar non-autonomous Schrödinger–Po...
In this paper we prove a kind of weighted Trudinger-Moser inequality which is employed to establish ...
In this article, we study the limit case of some elliptic problems involving nonlinearities having ...
In this paper, using variational methods, we establish the existence and multiplicity of weak soluti...