Add to ORKGsummary:In this paper we examine a quasilinear periodic problem driven by the one- dimensional $p$-Laplacian and with discontinuous forcing term $f$. By filling in the gaps at the discontinuity points of $f$ we pass to a multivalued periodic problem. For this second order nonlinear periodic differential inclusion, using variational arguments, techniques from the theory of nonlinear operators of monotone type and the method of upper and lower solutions, we prove the existence of at least two non trivial solutions, one positive, the other negative
AbstractWe study a periodic boundary value problem for a first-order differential equation from a ne...
We examine nonlinear periodic problems for scalar and vector differential equations involving a maxi...
In this paper we study a quasilinear boundary value problem of Neumann type with discontinuous terms...
summary:In this paper we examine a quasilinear periodic problem driven by the one- dimensional $p$-L...
summary:In this paper we examine a quasilinear periodic problem driven by the one- dimensional $p$-L...
summary:In this paper we consider a periodic problem driven by the one dimensional $p$-Laplacian and...
AbstractIn this paper, we study periodic problems for second-order differential inclusions in RN wit...
summary:In this paper we consider a periodic problem driven by the one dimensional $p$-Laplacian and...
summary:In this paper we consider a periodic problem driven by the one dimensional $p$-Laplacian and...
In this paper we consider a second order differential inclusion driven by the ordinary p-Laplacian, ...
Using some recent extensions of upper and lower solutions techniques and continuation theorems to th...
summary:In this paper we study nonlinear parabolic equations using the method of upper and lower sol...
We study a periodic boundary value problem for a first-order differential equation from a new point ...
We study periodic problems driven by the scalar p-Laplacian with a multivalued right-hand side nonli...
AbstractWe study periodic problems driven by the scalar p-Laplacian with a multivalued right-hand si...
AbstractWe study a periodic boundary value problem for a first-order differential equation from a ne...
We examine nonlinear periodic problems for scalar and vector differential equations involving a maxi...
In this paper we study a quasilinear boundary value problem of Neumann type with discontinuous terms...
summary:In this paper we examine a quasilinear periodic problem driven by the one- dimensional $p$-L...
summary:In this paper we examine a quasilinear periodic problem driven by the one- dimensional $p$-L...
summary:In this paper we consider a periodic problem driven by the one dimensional $p$-Laplacian and...
AbstractIn this paper, we study periodic problems for second-order differential inclusions in RN wit...
summary:In this paper we consider a periodic problem driven by the one dimensional $p$-Laplacian and...
summary:In this paper we consider a periodic problem driven by the one dimensional $p$-Laplacian and...
In this paper we consider a second order differential inclusion driven by the ordinary p-Laplacian, ...
Using some recent extensions of upper and lower solutions techniques and continuation theorems to th...
summary:In this paper we study nonlinear parabolic equations using the method of upper and lower sol...
We study a periodic boundary value problem for a first-order differential equation from a new point ...
We study periodic problems driven by the scalar p-Laplacian with a multivalued right-hand side nonli...
AbstractWe study periodic problems driven by the scalar p-Laplacian with a multivalued right-hand si...
AbstractWe study a periodic boundary value problem for a first-order differential equation from a ne...
We examine nonlinear periodic problems for scalar and vector differential equations involving a maxi...
In this paper we study a quasilinear boundary value problem of Neumann type with discontinuous terms...