论文信息 - CRITICAL BLOW-UP AND EXTINCTION EXPONENTS FOR NON-NEWTON POLYTROPIC FILTRATION EQUATION WITH SOURCE

CRITICAL BLOW-UP AND EXTINCTION EXPONENTS FOR NON-NEWTON POLYTROPIC FILTRATION EQUATION WITH SOURCE

This paper deals with the critical blow-up and extinction ex- ponents for the non-Newton polytropic filtration equation. We reveals a fact that the equation admits two critical exponents q1,q2 2 (0,+1) with q1 < q2. In other words, when q belongs to dierent intervals (0,q1),(q1,q2),(q2,+1), the solution possesses complete dierent prop- erties. More precisely speaking, as far as the blow-up exponent is con- cerned, the global existence case consists of the interval (0,q2). However, when q 2 (q2,+1), there exist both global solutions and blow-up so- lutions. As for the extinction exponent, the extinction case happens to the interval (q1,+1), while for q 2 (0,q1), there exists a non-extinction bounded solution for any nonnegative initial datum. Moreover, when the critical case q = q1 is concerned, the other parameter ‚ will play an im- portant role. In other words, when ‚ belongs to dierent interval (0 ,‚1) or (‚1,+1), where ‚1 is the first eigenvalue of p-Laplacian equation with zero boundary value condition, the solution has completely dierent properties.

Chunlai Mu | Jun Zhou | Chunlai Mu | Jun Zhou

[1] Hongjun Yuan. Extinction and Positivity for the Evolution P-Laplacian Equation , 1995 .

[2] H. Fujita. On the blowing up of solutions fo the Cauchy problem for u_t=Δu+u^ , 1966 .

[3] Critical exponents and non-extinction for a fast diffusive polytropic filtration equation with nonlinear boundary sources , 2007 .

[4] A. S. Kalashnikov. Some problems of the qualitative theory of non-linear degenerate second-order parabolic equations , 1987 .

[5] Extinction and positivity for the evolution p-Laplacian equation with L1 initial value , 2005 .

[6] J. McLeod. Nonlinear Diffusion Equations. , 1985 .

[7] Y. Kwong. Boundary behavior of the fast diffusion equation , 1990 .

[8] M. Winkler. A strongly degenerate diffusion equation with strong absorption , 2004 .

[9] Keng Deng,et al. The Role of Critical Exponents in Blow-Up Theorems: The Sequel , 2000 .

[10] J. Vázquez. The Porous Medium Equation , 2006 .

[11] Howard A. Levine,et al. The Role of Critical Exponents in Blowup Theorems , 1990, SIAM Rev..

[12] E. DiBenedetto. Degenerate Parabolic Equations , 1993 .

[13] Chunpeng Wang,et al. Critical exponents of the non-Newtonian polytropic filtration equation with nonlinear boundary condition , 2007, Appl. Math. Lett..