Abstract
Abstract
Let
$(X,T)$
and
$(Y,S)$
be two topological dynamical systems, where
$(X,T)$
has the weak specification property. Let
$\xi $
be an invariant measure on the product system
$(X\times Y, T\times S)$
with marginals
$\mu $
on X and
$\nu $
on Y, with
$\mu $
ergodic. Let
$y\in Y$
be quasi-generic for
$\nu $
. Then there exists a point
$x\in X$
generic for
$\mu $
such that the pair
$(x,y)$
is quasi-generic for
$\xi $
. This is a generalization of a similar theorem by T. Kamae, in which
$(X,T)$
and
$(Y,S)$
are full shifts on finite alphabets.
Publisher
Cambridge University Press (CUP)