Weighted estimates and Fujita exponent for a nonlocal equation

Abstract

We investigate a nonlocal equation ∂tu=∫RnJ(x-y)(u(y,t)-u(x,t))dy+a(x,t)up in Rn, where a is unbounded and J belongs to a weighted space. Crucial weighted Lp and interpolation estimates for the Green operator are established by a new method based on the sharp Young's inequality, the asymptotic behavior of a regular varying coefficients exponential series, and the properties of auxiliary functions =(1+|x|2/η)b/2 that -/η J-/η and η-b+/2/ xb η-b-/2. Blow-up behaviors are investigated by employing test functions φR= (η=R) instead of principal eigenfunctions. Global well-posedness in weighted Lp spaces for the Cauchy problem is proved. When a xσ the Fujita exponent is shown to be 1+(σ+2)/n. Our approach generalizes and unifies nonlocal diffusion equations and pseudoparabolic equations.