BV spaces and the perimeters related to Schrodinger operators with inverse-square potentials and applications to the rank-one theorem

Abstract

For a - ( d2- 1)2 and 2σ= d - 2-( (d - 2)2 + 4a)1/2, let casesHa= - + a | x |2,\\ Hσ= 2( - + σ 2 | x |2)cases be two Schr\"odinger operators with inverse-square potentials. In this paper, on the domain ⊂ Rd \ 0\, d≥ 2, %apart from the origin, the H a-BV space B V H a( ) and the Hσ-BV space B V H σ( ) related to Ha and Hσ are introduced, respectively. We investigate a series of basic properties of B V H a( ) and B V H σ( ). Furthermore, we prove that Hσ-restricted BV functions can be characterized equivalently via their subgraphs. As applications, we derive the rank-one theorem for Hσ-restricted BV functions.