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2005年03月29日
王术, Ling Hsiao, a, , Peter A. Markowich, b, and Shu Wang a, *
J. Differential Equations 192(2003)111-133,-0001,():
-1年11月30日
In this paper we study the asymptotic behavior of globally smooth solutions of the Cauchy problem for the multidimensional isentropic hydrodynamic model for semiconductors in Rd We prove that smooth solutions (close to equilibrium) of the problem converge to a stationary solution exponentially fast as t-→+∞.
Multidimensional hydrodynamic model, Semiconductors, Asymptotic behavior, Globally smooth solution
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2005年03月29日
王术, LING HSIAO*and SHU WANG†, †shu.wang
Mathematical Models and Methods in Applied Sciences Vol. 12, No.6 (2002) 777-796,-0001,():
-1年11月30日
In this paper, we study the asymptotic behavior of smooth solutions to the initial boundary value problem for the full one-dimensional hydrodynamic model for semiconductors. We prove that the solution to the problem converges to the unique stationary solution time asymptotically exponentially fast.
Full hydrodynamic model, semiconductors, asymptotic behavior,, global smooth solutions.,
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2005年03月29日
【期刊论文】The blow-up rate for a system of heat equations completely coupled in the boundary conditions1
王术, Shu Wang a, a, *, Chunhong Xie a, Mingxin Wang b
Nonlinear Analysis 35(1999)389-398,-0001,():
-1年11月30日
Heat equations, Nonlinear boundary conditions, Blow-up rate, Uniqueness
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2005年03月29日
【期刊论文】Doubly Nonlinear Degenerate Parabolic Systemswith Coupled Nonlinear Boundary Conditions1
王术, Shu Wang
Journal of Differential Equations 182, 431-469 (2002),-0001,():
-1年11月30日
In this paper, we study the global existence and the global nonexistence of doubly nonlinear degenerate parabolic systems with nonlinear boundary conditions. We first prove a local existence result by the regularization method. Next, we construct a weak comparison principle. Then we discuss the large time behavior of solutions by using a modified upper and lower solution methods and constructing various upper and lower solutions. Necessary and sufficient conditions on the global existence of all positive (weak) solutions are obtained.
doubly nonlinear degenerate parabolic systems, nonlinear boundary conditions, non-Newtonian flow, global solution, blow up in finite time.,
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2005年03月29日
【期刊论文】Reaction diffusion systems with nonlinear boundary conditions*
王术, Shu Wang, Mingxin Wang and Chunhong Xie
Z. angew. Math. Phys. 48(1997)994-1001,-0001,():
-1年11月30日
This paper deals with the existence and nonexistence of global positive solutions of reaction di usion systems with nonlinear boundary conditions. Necessary and su cient conditions on the global existence of all positive solutions are obtained.
Reaction diffusion systems,, nonlinear boundary conditions,, global solutions,, nite time blow-up.,
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