We prove that for any real polynomial $f(x) \in\mathbb{R} [x]$ the set $$ \{\alpha \in \mathbb{R}: \liminf_{n\to \infty} n\log n ||\alpha f(n)|| >0\} $$ has positive Hausdorff dimension. Here $||\xi ||$ means the distance from $\xi $ to the nearest integer. Our result is based on an original method due to Y. Peres and W. Schlag.
On small fractional parts of polynomial-like functions
Small fractional parts of polynomials
Sums of square roots that are close to an integer
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