n-dual spaces associated to a normed space
Abstract
For a real normed space X, we study the n-dual space of (X, · ) and show that the space is a Banach space. Meanwhile, for a real normed space X of dimension d≥ n which satisfies property (G), we discuss the n-dual space of (X, ·,…,· G) , where % ·,…,· G is the G\"ahler n% -norm. We then investigate the relationship between the n-dual space of % (X, · ) and the n-dual space of % (X, ·,…,· G) . We use this relationship to determine the n-dual space of (X, ·,…,· G) ~and show that the space is also a Banach space.
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