Cohen strongly p-summing holomorphic mappings on Banach spaces

Abstract

Let E and F be complex Banach spaces, U be an open subset of E and 1≤ p≤∞. We introduce and study the notion of a Cohen strongly p-summing holomorphic mapping from U to F, a holomorphic version of a strongly p-summing linear operator. For such mappings, we establish both Pietsch domination/factorization theorems and analyse their linearizations from G∞(U) (the canonical predual of H∞(U)) and their transpositions on H∞(U). Concerning the space DpH∞(U,F) formed by such mappings and endowed with a natural norm dpH∞, we show that it is a regular Banach ideal of bounded holomorphic mappings generated by composition with the ideal of strongly p-summing linear operators. Moreover, we identify the space (DpH∞(U,F*),dpH∞) with the dual of the completion of tensor product space G∞(U) F endowed with the Chevet--Saphar norm gp.