Add to ORKGWe study a class of piecewise linear solutions to the inviscid Burgers equation driven by a linear forcing term. Inspired by the analogy with peakons, we think of these solutions as being made up of solitons situated at the breakpoints. We derive and solve ODEs governing the soliton dynamics, first for continuous solutions, and then for more general shock wave solutions with discontinuities. We show that triple collisions of solitons cannot take place for continuous solutions, but give an example of a triple collision in the presence of a shock.
Solutions of the Degasperis–Procesi nonlinear wave equation may develop discontinuities in finite ti...
International audienceThe inviscid Burgers equation with random and spatially smooth forcing is cons...
AbstractBurgers equation for inviscid fluids is a simplified case of Navier–Stokes equation which co...
We study centred second-order in time and space discretizations of the inviscid Burgers equa-tion. A...
Abstract We investigate the coupling between the nonlinear Schrödinger equation and the inviscid Bur...
This article concerns the initial boundary value problem for the non linear dissipative Burgers equa...
In this paper, we consider a forced Burgers equation with time variable coefficients of the form Ut+...
AbstractThe propagation of travelling waves is a relevant physical phenomenon. As usual the understa...
This paper retrieves the topological soliton and cnoidal wave solutions to the Boussinesq-Burgers eq...
AbstractIn this paper, we propose a new algorithm to finding all forms of soliton solutions and peri...
In this paper, we present an new approach for the study of Burgers equations. Our purpose is to desc...
WOS: 000311657100003This paper retrieves the topological soliton and cnoidal wave solutions to the B...
We investigate a system coupling the nonlinear Schrödinger equation and the inviscid Burgers equati...
A direct rational exponential scheme is introduced and applied to construct exact multisoliton solut...
The well-known shock solutions of the Korteweg-de Vries-Burgers equation are revisited, together wit...
Solutions of the Degasperis–Procesi nonlinear wave equation may develop discontinuities in finite ti...
International audienceThe inviscid Burgers equation with random and spatially smooth forcing is cons...
AbstractBurgers equation for inviscid fluids is a simplified case of Navier–Stokes equation which co...
We study centred second-order in time and space discretizations of the inviscid Burgers equa-tion. A...
Abstract We investigate the coupling between the nonlinear Schrödinger equation and the inviscid Bur...
This article concerns the initial boundary value problem for the non linear dissipative Burgers equa...
In this paper, we consider a forced Burgers equation with time variable coefficients of the form Ut+...
AbstractThe propagation of travelling waves is a relevant physical phenomenon. As usual the understa...
This paper retrieves the topological soliton and cnoidal wave solutions to the Boussinesq-Burgers eq...
AbstractIn this paper, we propose a new algorithm to finding all forms of soliton solutions and peri...
In this paper, we present an new approach for the study of Burgers equations. Our purpose is to desc...
WOS: 000311657100003This paper retrieves the topological soliton and cnoidal wave solutions to the B...
We investigate a system coupling the nonlinear Schrödinger equation and the inviscid Burgers equati...
A direct rational exponential scheme is introduced and applied to construct exact multisoliton solut...
The well-known shock solutions of the Korteweg-de Vries-Burgers equation are revisited, together wit...
Solutions of the Degasperis–Procesi nonlinear wave equation may develop discontinuities in finite ti...
International audienceThe inviscid Burgers equation with random and spatially smooth forcing is cons...
AbstractBurgers equation for inviscid fluids is a simplified case of Navier–Stokes equation which co...