Fourth-order Schr\"odinger type operator with singular potentials

Abstract

In this paper we study the biharmonic operator perturbed by an inverse fourth-order potential. In particular, we consider the operator A=2-V=2-c|x|-4 where c is any constant such that c<(N(N-4)4)2. The semigroup generated by -A in L2(RN), N≥5, extrapolates to a bounded holomorphic C0-semigroup on Lp(RN) for p∈ [p'0,p0] where p0=2NN-4 and p0' is its dual exponent. Furthermore, we study the boundedness of the Riesz transform A-1/2 on Lp(RN) for all p∈(p0',2].