Attractivity properties of nonnegative solutions for a degenerate parabolic equation in the whole space

## Communicated by S. Chen We are interested in the asymptotic behavior of solutions towards a parabolic system of chemotaxis in R n , n 1. It was proved in the previous results that decaying solutions converge to the heat kernel in L p .R n /.1 Ä p Ä 1/ at the rate t n.1 1=p/=2 1=2 as t ! 1. Our

The blowup of solutions of the Cauchy problem { u t =u xx + |u| p&1 u u(x, 0)=u 0 (x) in R\\_(0, ), in R is studied. Let 4 k be the set of functions on R which change sign k times. It is shown that for p k =1+2Â(k+1), k=0, 1, 2, ... , any solution with u 0 # 4 k blows up in finite time if 1 p k . T

We propose a new two-level implicit difference method of O(k 2 + kh 2 + h 4 ) for the solution of singularly perturbed non-linear parabolic differential equation (u xx +u yy )=f (x, y, t, u, u x , u y , u t ), 0 < x, y < 1, t > 0 subject to appropriate initial and Dirichlet boundary conditions, wher