Strong unique continuation property for fourth order Baouendi-Grushin type subelliptic operators with strongly singular potential

Abstract

In this paper, we prove the strong unique continuation property for the following fourth order degenerate elliptic equation equation* 2Xu=Vu, equation* where X=x+|x|2αy (0<α≤1), with x∈Rm, y∈Rn, denotes the Baouendi-Grushin type subelliptic operators, and the potential V satisfies the strongly singular growth assumption |V|≤ c04, where equation* =(|x|2(α+1)+(α+1)2|y|2)12(α+1) equation* is the gauge norm. The main argument is to introduce an Almgren's type frequency function for the solutions, and show its monotonicity to obtain a doubling estimate based on setting up some refined Hardy-Rellich type inequalities on the gauge balls with boundary terms.