OUHABAZ, El Maati

doi:10.1007/s12220-011-9231-y

The system will be going down for regular maintenance. Please save your work and logout.

Metadata

Show full item record

License

OUHABAZ, El Maati
Institut de Mathématiques de Bordeaux [IMB]

Language

Article de revue

This item was published in

Journal of Geometric Analysis. 2012, vol. 22, p. 1108-1136

English Abstract

We consider Schrödinger operators A = − + V on Lp(M) where M is a complete Riemannian manifold of homogeneous type and V = V + − V − is a signed potential. We study boundedness of Riesz transform type operators ∇A −1 2 and |V |12 A −12 on Lp(M). When V − is strongly subcritical with constant α ∈ (0, 1) we prove that such operators are bounded on Lp(M) for p ∈ (p 0, 2] where p 0 = 1 if N ≤ 2, and p 0 = ( 2N (N−2)(1− √ 1−α) ) ∈ (1, 2) if N > 2. We also study the case p >2. With additional conditions on V and M we obtain boundedness of ∇A −1/2 and |V |1/2A −1/2 on Lp(M) for p ∈ (1, inf(q1,N)) where q1 is such that ∇(− ) −1 2 is bounded on Lr(M) for r ∈ [2, q1).Read less <

English Keywords

Riesz transform

Schrödinger opertors

Riemannian manifolds

Metadata

Share this item!

License

Riesz transforms of Schrödinger operators on manifolds

Language

This item was published in

English Abstract

English Keywords

URI

DOI

Origin

Collections