Global Structure of Self-Similar Solutions in a Semilinear Parabolic Equation

In this paper we consider the question of the long time behavior of solutions of Ž . the initial value problem for evolution equations of the form durdt q Au t s Ž Ž .. F u t in a Banach space where A is the infinitesimal generator of an analytic semigroup and F is a nonlinear function such that the

A complete classification for the self-similar solutions to the generalized Burgers equation \[ u_{t}+u^{\beta} u_{x}=t^{N} u_{x x} \] of the form \(u(t, \eta)=A_{1} t^{-(1-N) / 2 \beta} F(\eta)\), where \(\eta=A_{2} x t^{-(1+N / 2}, A_{2}=1 / \sqrt{2 A}\), and \(A_{1}=\left(2 A_{2}\right)^{-1 / 6

## Abstract A demonstration method is presented, which will ensure the existence of positive global solutions in time to the reaction–diffusion equation −__u__~__t__~+Δ__u__+__u__^__p__^=0 in ℝ^__n__^×[0, ∞), for exponents __p__⩾3 and space dimensions __n__⩾3. This method does not require the initi

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