Generalized fractional maximal functions in Lorentz spaces
Abstract
In this paper we give the complete characterization of the boundedness of the generalized fractional maximal operator Mφ,α(b)f(x) : = Q x \|f Q\|α(b)φ (|Q|) (x ∈ Rn), between the classical Lorentz spaces p (v) and q(w) for appropriate functions φ, where 0 < p,\,q < ∞, 0 < α r < ∞, v,w,\,b are weight functions on (0,∞) such that 0 < B(x): = ∫0x b < ∞, x > 0, B ∈ 2 and B(t) / tα / r is quasi-increasing.
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