Some function spaces on symmetric spaces related to convolution operators

We deal with the degenerate differential operator Au x [ ␣ x uЉ x xG0 Here W denotes the Banach space of all w w Moreover, we assume that the function ␣ is continuous and positive on 0, qϱ , it Ž . Ž . is differentiable at 0, and satisfies the inequalities 0 for suitable constants ␣ and ␣ . We sh

The paper deals with function spaces F>,?(R", a ) and P;X(Rn, a ) defined on the EucLIDean n-space R". These spaces will be defined on the basis of function spaces of BESOV-HARDY-SOBOLEV type F;,(Rn) and B:,JRn) -see-[25], and by appropriate pseudo-differential operators A(x, 0,). We get scales of s

Let (Q, a, p) be a positive measure space and D ( p ) , 0 < p 5 00, the space of (equivalence classes of) functions which are p-integrable with respect to p. In a nice short paper [9] A. VILLANI stated necessary and sufficient conditions for the measure p such that inclusions of the form D ( p ) D (

## Abstract We prove sufficient conditions for the boundedness of the maximal operator on variable Lebesgue spaces with weights __φ~t,γ~__ (__τ__) = |(__τ__ – __t__)^__γ__^ |, where __γ__ is a complex number, over arbitrary Carleson curves. If the curve has different spirality indices at the point

It is proved that a C 0 -semigroup T=[T(t)] t 0 of linear operators on a Banach space X is uniformly exponentially stable if and only if it acts boundedly on one of the spaces L p (R + , X) or C 0 (R + , X) by convolution. As an application, it is shown that T is uniformly exponentially stable if an