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A necessary and sufficient condition for a continuous function
$g$
to be almost periodic on time scales is the existence of an almost periodic function
$f$
on
$\mathbb{R}$
such that
$f$
is an extension of
$g$
. Our aim is to study this question for pseudo almost periodic functions. We prove the necessity of the condition for pseudo almost periodic functions. An example is given to show that the sufficiency of the condition does not hold for pseudo almost periodic functions. Nevertheless, the sufficiency is valid for uniformly continuous pseudo almost periodic functions. As applications, we give some results on the connection between the pseudo almost periodic (or almost periodic) solutions of dynamic equations on time scales and of the corresponding differential equations.
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