Comparing gaussian and Rademacher cotype for operators on the space of continous functions
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چکیده
X iv :m at h/ 93 02 20 6v 1 [ m at h. FA ] 4 F eb 1 99 3 Comparing gaussian and Rademacher cotype for operators on the space of continous functions Marius Junge Abstract We will prove an abstract comparision principle which translates gaussian cotype in Rademacher cotype conditions and vice versa. More precisely, let 2<q<∞ and T : C(K) → F a linear, continous operator. 1. T is of gaussian cotype q if and only if
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