Averaging Operators and a Generalized Robinson Differential Inequality

## Abstract Let __H__(U) be the space of all analytic functions in the unit disk U, and let co__E__ denote the convex hull of the set __E__ ⊂ ℂ. If __K__ ⊂ __H__(U) then the operator I : __K__ → __H__(U) is said to be an __averaging operator__ if For a function __h__ ∈ __A__ ⊂ __H__(U) we will det

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Let in and p be increasing cont~inuous functions on [O. 11. ~( 0 ) =0, p ( 0 ) = 0 , and hEB[O, 13 (the space of ali bounded measurable functions 011 [0, rp(.)+h(.) j-(4s) clnc(s)EC[O, 13: and define for such functions f : Evidently, if b is continuous, the definition of DmDp concides with the us