On subordinated semigroups and Hardy spaces associated to fractional powers of operators
Abstract
Let L be a positive self-adjoint operator on L2(X), where X is a σ-finite metric measure space. When α ∈ (0,1), the subordinated semigroup \(-tLα):t ∈ R+\ can be defined on L2(X) and extended to Lp(X). We prove various results about the semigroup \(-tLα):t ∈ R+\, under different assumptions on L. These include the weak type (1,1) boundedness of the maximal operator f t∈ R+(-tLα)f and characterisations of Hardy spaces associated to the operator L by the area integral and vertical square function.
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