Bolis Basit, Hans Günzler
Published 2011-04-11Version 1
We construct Eberlein almost periodic functions $ f_j : J \to H$ so that $||f_1(\cdot)||$ is not ergodic and thus not Eberlein almost periodic and $||f_2(.)||$ is Eberlein almost periodic, but $f_1$ and $f_2$ are not pseudo almost periodic, the Parseval equation for them fails, where $J=\r_+$ or $\r$ and $H$ is a Hilbert space. This answers several questions posed by Zhang and Liu [18].
Comments: 6 pages
Journal: Monash University Analysis Paper 127, March 2011
Some inequalities for $(α, β)$-normal operators in Hilbert spaces
Avoiding σ-porous sets in Hilbert spaces
The splitting lemmas for nonsmooth functionals on Hilbert spaces I
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