Add to ORKGThis work is devoted to the decay ofrandom solutions of the unforced Burgers equation in one dimension in the limit of vanishing viscosity. The initial velocity is homogeneous and Gaussian with a spectrum proportional to $k^n$ at small wavenumbers $k$ and falling off quickly at large wavenumbers. In physical space, at sufficiently large distances, there is an ``outer region'', where the velocity correlation function preserves exactly its initial form (a power law) when $n$ is not an even integer. When $11$. A systematic derivation is given in which both the leading term and estimates of higher order corrections can be obtained. High-resolution numerical simulations are presented which support our findings
We consider the generalised Burgers equation \frac{\partial u}{\partial t} + f'(u)\frac{\partial u}{...
We consider the generalised Burgers equation \frac{\partial u}{\partial t} + f'(u)\frac{\partial u}{...
AbstractThe rate of convergence (in the uniform Kolmogorov’s distance) for probability distributions...
International audienceWe consider the generalised Burgers equation$$∂u/∂t + f (u) ∂u/∂x − \nu ∂^2u/∂...
International audienceWe consider the generalised Burgers equation$$∂u/∂t + f (u) ∂u/∂x − \nu ∂^2u/∂...
We consider the generalised Burgers equation $$\frac{\partial u}{\partial t} + f'(u)\frac{\partial u...
International audienceWe consider the generalised Burgers equation$$∂u/∂t + f (u) ∂u/∂x − \nu ∂^2u/∂...
The decay of Burgers turbulence with compactly supported Gaussian "white noise" initial conditions i...
Traveling-wave solutions of the inviscid Burgers equation having smooth initial wave profiles of sui...
Traveling-wave solutions of the inviscid Burgers equation having smooth initial wave profiles of sui...
Freely decaying Burgers turbulence at low and moderate Reynolds number R is studied by mapping closu...
We compare freely decaying evolution of the Navier-Stokes equations with that of the 3D Burgers equa...
A closed form solution to Burgers\u27 equation on an infinite domain has been obtained for random s...
Extending work of E, Khanin, Mazel and Sinai (1997 PRL 78:1904-1907) on the one-dimensional Burgers ...
We reveal a phase transition with decreasing viscosity ν at ν=νc>0 in one-dimensional decaying Burge...
We consider the generalised Burgers equation \frac{\partial u}{\partial t} + f'(u)\frac{\partial u}{...
We consider the generalised Burgers equation \frac{\partial u}{\partial t} + f'(u)\frac{\partial u}{...
AbstractThe rate of convergence (in the uniform Kolmogorov’s distance) for probability distributions...
International audienceWe consider the generalised Burgers equation$$∂u/∂t + f (u) ∂u/∂x − \nu ∂^2u/∂...
International audienceWe consider the generalised Burgers equation$$∂u/∂t + f (u) ∂u/∂x − \nu ∂^2u/∂...
We consider the generalised Burgers equation $$\frac{\partial u}{\partial t} + f'(u)\frac{\partial u...
International audienceWe consider the generalised Burgers equation$$∂u/∂t + f (u) ∂u/∂x − \nu ∂^2u/∂...
The decay of Burgers turbulence with compactly supported Gaussian "white noise" initial conditions i...
Traveling-wave solutions of the inviscid Burgers equation having smooth initial wave profiles of sui...
Traveling-wave solutions of the inviscid Burgers equation having smooth initial wave profiles of sui...
Freely decaying Burgers turbulence at low and moderate Reynolds number R is studied by mapping closu...
We compare freely decaying evolution of the Navier-Stokes equations with that of the 3D Burgers equa...
A closed form solution to Burgers\u27 equation on an infinite domain has been obtained for random s...
Extending work of E, Khanin, Mazel and Sinai (1997 PRL 78:1904-1907) on the one-dimensional Burgers ...
We reveal a phase transition with decreasing viscosity ν at ν=νc>0 in one-dimensional decaying Burge...
We consider the generalised Burgers equation \frac{\partial u}{\partial t} + f'(u)\frac{\partial u}{...
We consider the generalised Burgers equation \frac{\partial u}{\partial t} + f'(u)\frac{\partial u}{...
AbstractThe rate of convergence (in the uniform Kolmogorov’s distance) for probability distributions...