AbstractHyperbolic nonconservative partial differential equations, such as the Von Foerster system, in which boundary conditions may depend upon the dependent variable (integral boundary conditions, for example) are solved by an approximation method based on similar work of the author for (nonlinear stochastic) ordinary differential equations
International audienceIn this paper we explicit the derivative of the flows of one-dimensional refle...
Using analytical methods, we consider the problem of constructing a nonhomogeneous multidimensional ...
AbstractThe operator-theoretic (or inverse) method for stochastic differential equations is generali...
AbstractHyperbolic nonconservative partial differential equations, such as the Von Foerster system, ...
AbstractSolution of a coupled system of nonlinear partial differential equations is demonstrated for...
AbstractA priori bounds are determined for certain energy expressions for a class of semi-linear par...
The main aim of this paper is to study stochastic PDE's with delay terms. In fact, we prove existenc...
We prove the existence of solutions to an integral equation modeling the infiltration of a fluid in ...
AbstractBy means of a new technique based on a class of functions Π(t,s,r), new oscillation criteria...
AbstractHere we propose a simple integral equation method for solution of nonlinear periodic boundar...
AbstractThe aim of this work is to study the behaviour of solutions of the initial boundary problem ...
We prove the existence of solutions to an integral equation modeling the infiltration of a fluid in ...
AbstractWe obtain estimates on the continuous dependence on the coefficient for second-order non-lin...
AbstractWe consider the solution of partial differential equations for initial/boundary conditions u...
AbstractBy a new approach, we prove in this paper that there exists λ0 ϵ (−12, 0) such that the foll...
International audienceIn this paper we explicit the derivative of the flows of one-dimensional refle...
Using analytical methods, we consider the problem of constructing a nonhomogeneous multidimensional ...
AbstractThe operator-theoretic (or inverse) method for stochastic differential equations is generali...
AbstractHyperbolic nonconservative partial differential equations, such as the Von Foerster system, ...
AbstractSolution of a coupled system of nonlinear partial differential equations is demonstrated for...
AbstractA priori bounds are determined for certain energy expressions for a class of semi-linear par...
The main aim of this paper is to study stochastic PDE's with delay terms. In fact, we prove existenc...
We prove the existence of solutions to an integral equation modeling the infiltration of a fluid in ...
AbstractBy means of a new technique based on a class of functions Π(t,s,r), new oscillation criteria...
AbstractHere we propose a simple integral equation method for solution of nonlinear periodic boundar...
AbstractThe aim of this work is to study the behaviour of solutions of the initial boundary problem ...
We prove the existence of solutions to an integral equation modeling the infiltration of a fluid in ...
AbstractWe obtain estimates on the continuous dependence on the coefficient for second-order non-lin...
AbstractWe consider the solution of partial differential equations for initial/boundary conditions u...
AbstractBy a new approach, we prove in this paper that there exists λ0 ϵ (−12, 0) such that the foll...
International audienceIn this paper we explicit the derivative of the flows of one-dimensional refle...
Using analytical methods, we consider the problem of constructing a nonhomogeneous multidimensional ...
AbstractThe operator-theoretic (or inverse) method for stochastic differential equations is generali...
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