Critical Exponents and Multiple Critical Dimensions for Polyharmonic Operators

Let S k ({ 2 u), 1 k<nÂ2, be the k th Hessian operator. We study the problem where #(k) is the critical exponent for S k and 0 is a ball. Results generalizing those obtained by Brezis Nirenberg for the special case k=1 are established. A discussion on the asymptotic behavior of solutions of the pro

## Abstract We study the Cauchy problem for the quasilinear parabolic equation magnified image where __p__ > 1 is a parameter and ψ is a smooth, bounded function on (1, ∞) with − ⩽ __s__ψ′(__s__)/ψ(__s__) ⩽ θ for some θ > 0. If 1 < __p__ < 1 + 2/__N__, there are no global positive solutions, wherea

We consider the large-time behavior of sign-changing solutions of inhomogeneous parabolic equations and systems. For example, for u t = u + u p + w x in R n × 0 T , we show the following: If n ≥ 3 and R n w x dx > 0 and 1 < p ≤ n/ n -2 , then all solutions blow up in finite time, while if p > n/ n -