Quantitative unique continuation property for solutions to a bi-Laplacian equation with a potential

Abstract

In this paper, we focus on the quantitative unique continuation property of solutions to equation* 2u=Vu, equation* where V∈ W1,∞. We show that the maximal vanishing order of the solutions is not large than equation C(\|V\|14L∞+\|∇ V\|L∞+1). equation Our key argument is to lift the original equation to that with a positive potential, then decompose the resulted fourth-order equation into a special system of two second-order equations. Based on the special system, we define a variant frequency function with weights and derive its almost monotonicity to establishing some doubling inequalities with explicit dependence on the Sobolev norm of the potential function.