【 摘 要 】

We study abstract Cesaro spaces CX, which may be regarded as generalizations of Cesaro sequence spaces ces(p) and Cesaro function spaces Ces(p)(I) on I = [0,1] or I = [0, infinity), and also as the description of optimal domain from which Cesaro operator acts to X. We find the dual of such spaces in a very general situation. What is however even more important, we do it in the simplest possible way. Our proofs are more elementary than the known ones for ces(p) and Ces(p)(I). This is the point how our paper should be seen, i.e. not as a generalization of known results, but rather like grasping and exhibiting the general nature of the problem, which is not so easily visible in previous publications. Our results show also an interesting phenomenon that there is a big difference between duality in the cases of finite and infinite intervals. (C) 2014 Elsevier Inc. All rights reserved.

【 授权许可】

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10_1016_j_jmaa_2014_11_023.pdf	467KB	PDF	download