A convergence result for the master operator

Abstract

In this paper, we establish a convergence result for the fully fractional heat operator s, also known as the master operator, stated as follows: \[If\ ui u\ in\ C2,1x,t,loc(n×),\ then\ s ui su-b\ a.e. in\ n×,\] for some nonnegative constant b. This result addresses a fundamental question in the blow-up and rescaling analysis, which are essential for establishing a priori estimates for solutions of master equations. Additionally, we present examples demonstrating that in certain cases, the constant b can indeed be positive. This highlights a key distinction between nonlocal and local operators: for a local heat operator, such as ∂t - , it is well-known that b 0.

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