Consider a collection $f$ of polynomials $f_i(x)$, $i=1, \ldots,s$, with integer coefficients such that polynomials $f_i(x)-f_i(0)$, $i=1, \ldots,s$, are linearly independent. Denote by $D_m$ the discrepancy for the set of points $\left(\frac{f_1(x) \bmod m}{m},\ldots,\frac{f_s(x) \bmod m}{p^n}\right)$ for all $x \in \{0,1,\ldots,m\}$, where $m=p^n$, $n \in N$, and $p$ is a prime number. We prove that $D_m\to 0$ as $n\to\infty$, and $D_m
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