Non-archimedean Eberlein-mulian theory
It is shown that, for a large class of non-archimedean normed spaces E, a subset X is weakly compact as soon as f(X) is compact for all f∈E′ (Theorem 2.1), a fact that has no analogue in Functional Analysis over the real or complex numbers. As a Corollary we derive a non-archimedean version of the...
Main Authors: | T. Kiyosawa, W. H. Schikhof |
---|---|
Format: | Article |
Language: | English |
Published: |
Hindawi Limited
1996-01-01
|
Series: | International Journal of Mathematics and Mathematical Sciences |
Subjects: | |
Online Access: | http://dx.doi.org/10.1155/S0161171296000907 |
Similar Items
-
Complemented subspaces of p-adic second dual Banach spaces
by: Takemitsu Kiyosawa
Published: (1995-01-01) -
Tauberian operators in p-adic analysis
by: Takemitsu Kiyosawa
Published: (2000-01-01) -
Asymptotic Stability of the Pexider–Cauchy Functional Equation in Non-Archimedean Spaces
by: Hamid Gharib, et al.
Published: (2021-09-01) -
Common Fixed Points Results on Non-Archimedean Metric Modular Spaces
by: Wissam Kassab
Published: (2019-11-01) -
Superstability of $m$-additive maps on complete non--Archimedean spaces
by: Ismail Nikoufar
Published: (2015-06-01)