Burgers’ Equation ut + cuux = νuxx is a nonlinear partial differential equation which arises in models of traffic and fluid flow. It is perhaps the simplest equation describing waves under the influence of diffusion. We consider the large time behavior of solutions with exponentially localized initial conditions, analyzing the rate of convergence to a known self similar single-hump solution. We use the Cole-Hopf Transformation to convert the problem into a heat equation problem with exponentially localized initial conditions. The solution to this problem converges to a Gaussian. We then find an optimal Gaussian approximation which is accurate to order t−2. Transforming back to Burgers’ Equation yields a solution accurate to order t−2
In this thesis we use the method of matched asymptotic coordinate expansions to examine in detail th...
AbstractWe describe the large time behavior of solutions of the convection-diffusion equation ut − Δ...
This work is devoted to the decay ofrandom solutions of the unforced Burgers equation in one dimensi...
Burgers’ Equation ut + cuux = νuxx is a nonlinear partial differential equation which arises in mode...
Burgers ’ Equation ut + cuux = νuxx is a nonlinear partial differential equation which arises in mod...
AbstractWe consider the generalized Burgers equation: (GBE)ut=Δ(um)−∂∂x1(uq),with exponents m>1 and ...
Recently, a solution theory for one-dimensional stochastic PDEs of Burgers type driven by space-time...
Self-similarity of Burgers’ equation with stochastic advection is studied. In self-similar variables...
AbstractWe study certain similarity solutions of the Benjamin-Ono-Burgers (BOB) equation and their r...
In this paper, the Lie group method is used to investigate some closed form solutions of famous Burg...
AbstractThe purpose of this paper is to investigate the relation between the moments and the asympto...
Burgers equation is one of the simplest nonlinear partial differential equations—it combines the bas...
AbstractThe rate of convergence (in the uniform Kolmogorov’s distance) for probability distributions...
We consider the large time behavior of the solutions to the Cauchy problem for the BBM-Burgers equat...
ABSTRACT. In this paper we control the first moment of the ini-tial approximations and obtain the or...
In this thesis we use the method of matched asymptotic coordinate expansions to examine in detail th...
AbstractWe describe the large time behavior of solutions of the convection-diffusion equation ut − Δ...
This work is devoted to the decay ofrandom solutions of the unforced Burgers equation in one dimensi...
Burgers’ Equation ut + cuux = νuxx is a nonlinear partial differential equation which arises in mode...
Burgers ’ Equation ut + cuux = νuxx is a nonlinear partial differential equation which arises in mod...
AbstractWe consider the generalized Burgers equation: (GBE)ut=Δ(um)−∂∂x1(uq),with exponents m>1 and ...
Recently, a solution theory for one-dimensional stochastic PDEs of Burgers type driven by space-time...
Self-similarity of Burgers’ equation with stochastic advection is studied. In self-similar variables...
AbstractWe study certain similarity solutions of the Benjamin-Ono-Burgers (BOB) equation and their r...
In this paper, the Lie group method is used to investigate some closed form solutions of famous Burg...
AbstractThe purpose of this paper is to investigate the relation between the moments and the asympto...
Burgers equation is one of the simplest nonlinear partial differential equations—it combines the bas...
AbstractThe rate of convergence (in the uniform Kolmogorov’s distance) for probability distributions...
We consider the large time behavior of the solutions to the Cauchy problem for the BBM-Burgers equat...
ABSTRACT. In this paper we control the first moment of the ini-tial approximations and obtain the or...
In this thesis we use the method of matched asymptotic coordinate expansions to examine in detail th...
AbstractWe describe the large time behavior of solutions of the convection-diffusion equation ut − Δ...
This work is devoted to the decay ofrandom solutions of the unforced Burgers equation in one dimensi...
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