The classical Remez inequality bounds the maximum of the absolute value of a
polynomial $P(x)$ of degree $d$ on $[-1,1]$ through the maximum of its absolute
value on any subset $Z$ of positive measure in $[-1,1]$. Similarly, in several
variables the maximum of the absolute value of a polynomial $P(x)$ of degree
$d$ on the unit cube $Q^n_1 \subset {\mathbb R}^n$ can be bounded through the
maximum of its absolute value on any subset $Z\subset Q^n_1$ of positive
$n$-measure.