Add to ORKGWe consider the Burgers equation and prove a property which seems to have been unobserved until now: there is no limitation on the growth of the nonnegative initial datum u0(x) at infinity when the problem is formulated on unbounded intervals, as, e.g. (0 + ∞), and the solution is unique without prescribing its behaviour at infinity. We also consider the associate stationary problem. Finally, some applications to the linear heat equation with boundary conditions of Robin type are also given
This is the publisher's version, also available electronically from http://projecteuclid.org/euclid....
AbstractWe consider the generalized Burgers equation: (GBE)ut=Δ(um)−∂∂x1(uq),with exponents m>1 and ...
This thesis deals with some nonlinear parabolic problems under the dynamical boundary conditions. We...
The behaviour of solutions of the Burgers system (1)—(3) is studied. In earlier papers [4], [5] the...
AbstractThe solution of the initial boundary-value problem uϵ′ − ϵD2uϵ + uϵDuϵ = f on (a, b) x(0, T)...
We study solutions of the equation ut−Δu+λu=f, for initial data that is ‘large at infinity’ as treat...
In this article, the Neumann problem on the semi-line for the Burgers equation is considered. The pr...
AbstractWe consider a multidimensional Burgers equation on the torus Td and the whole space Rd. We s...
We study solutions of the equation ut−Δu+λu=f, for initial data that is ‘large at infinity’ as treat...
We contribute an answer to a quantitative variant of the question raised in [Coron, Contemp. Math 20...
AbstractThe limiting behavior as the viscosity goes to zero of the solution of the first boundary va...
International audienceWe contribute an answer to a quantitative variant of the question raised in [C...
AbstractIn this paper we study the generalized Burgers equation ut+(u2/2)x=f(t)uxx, where f(t)>0 for...
We prove that there exist infinitely many distributional solutions with infinite kinetic energy to b...
AbstractWe characterize all domains Ω of RN such that the heat semigroup decays in L(L∞(Ω)) or L(L1(...
This is the publisher's version, also available electronically from http://projecteuclid.org/euclid....
AbstractWe consider the generalized Burgers equation: (GBE)ut=Δ(um)−∂∂x1(uq),with exponents m>1 and ...
This thesis deals with some nonlinear parabolic problems under the dynamical boundary conditions. We...
The behaviour of solutions of the Burgers system (1)—(3) is studied. In earlier papers [4], [5] the...
AbstractThe solution of the initial boundary-value problem uϵ′ − ϵD2uϵ + uϵDuϵ = f on (a, b) x(0, T)...
We study solutions of the equation ut−Δu+λu=f, for initial data that is ‘large at infinity’ as treat...
In this article, the Neumann problem on the semi-line for the Burgers equation is considered. The pr...
AbstractWe consider a multidimensional Burgers equation on the torus Td and the whole space Rd. We s...
We study solutions of the equation ut−Δu+λu=f, for initial data that is ‘large at infinity’ as treat...
We contribute an answer to a quantitative variant of the question raised in [Coron, Contemp. Math 20...
AbstractThe limiting behavior as the viscosity goes to zero of the solution of the first boundary va...
International audienceWe contribute an answer to a quantitative variant of the question raised in [C...
AbstractIn this paper we study the generalized Burgers equation ut+(u2/2)x=f(t)uxx, where f(t)>0 for...
We prove that there exist infinitely many distributional solutions with infinite kinetic energy to b...
AbstractWe characterize all domains Ω of RN such that the heat semigroup decays in L(L∞(Ω)) or L(L1(...
This is the publisher's version, also available electronically from http://projecteuclid.org/euclid....
AbstractWe consider the generalized Burgers equation: (GBE)ut=Δ(um)−∂∂x1(uq),with exponents m>1 and ...
This thesis deals with some nonlinear parabolic problems under the dynamical boundary conditions. We...