We prove a conjecture by De Giorgi, which states that global weak solutions of nonlinear wave equations such as can be obtained as limits of functions \that minimize suitable functionals of the calculus of variations. These functionals, which are integrals in space-time of a convex Lagrangian, contain an exponential weight with a parameter , and the initial data of the wave equation serve as boundary conditions. As tends to zero, the minimizers converge, up to subsequences, to a solution of the nonlinear wave equation. There is no restriction on the nonlinearity exponent, and the method is easily extended to more general equations
In this note, two blow-up results are proved for a weakly coupled system of semilinear wave equation...
After a discussion on two fundamental routes —weak discontinuity waves and high frequency asymptotic...
Practical algorithms for solving realistic inverse problems may often be viewed as problems in nonli...
Abstract We prove a conjecture by De Giorgi, which states that global weak solutions of nonlinear wa...
In the present dissertation we discuss an extension of some results obtained by E. Serra and P. Till...
We prove the existence of weak solutions to the homogeneous wave equation on a suitable class of tim...
AbstractWe prove convergence of global, bounded, and smooth solutions of the wave equation with line...
We consider control problems associated with nonlinear wave equations, in which the slope of the adm...
In this paper we discuss an extension of some results obtained by Serra and Tilli, in 2012 and 2016,...
summary:In this paper we present some results on the global existence of weak solutions to a nonline...
We consider control problems associated with nonlinear wave equa-tions, in which the slope of the ad...
Weak solutions to a nonlinear variational wave equation and some related problem
We establish Maximum Principles which apply to vectorial approximate minimizers of the general integ...
In this paper we study the existence of minimizer for certain constrained variational problems given...
In this paper we study the existence of minimizer for certain constrained variational problems given...
In this note, two blow-up results are proved for a weakly coupled system of semilinear wave equation...
After a discussion on two fundamental routes —weak discontinuity waves and high frequency asymptotic...
Practical algorithms for solving realistic inverse problems may often be viewed as problems in nonli...
Abstract We prove a conjecture by De Giorgi, which states that global weak solutions of nonlinear wa...
In the present dissertation we discuss an extension of some results obtained by E. Serra and P. Till...
We prove the existence of weak solutions to the homogeneous wave equation on a suitable class of tim...
AbstractWe prove convergence of global, bounded, and smooth solutions of the wave equation with line...
We consider control problems associated with nonlinear wave equations, in which the slope of the adm...
In this paper we discuss an extension of some results obtained by Serra and Tilli, in 2012 and 2016,...
summary:In this paper we present some results on the global existence of weak solutions to a nonline...
We consider control problems associated with nonlinear wave equa-tions, in which the slope of the ad...
Weak solutions to a nonlinear variational wave equation and some related problem
We establish Maximum Principles which apply to vectorial approximate minimizers of the general integ...
In this paper we study the existence of minimizer for certain constrained variational problems given...
In this paper we study the existence of minimizer for certain constrained variational problems given...
In this note, two blow-up results are proved for a weakly coupled system of semilinear wave equation...
After a discussion on two fundamental routes —weak discontinuity waves and high frequency asymptotic...
Practical algorithms for solving realistic inverse problems may often be viewed as problems in nonli...