@article{Kofanov_2016, title={Sharp Remez-type inequalities for differentiable periodic functions, polynomials and splines}, volume={68}, url={https://umj.imath.kiev.ua/index.php/umj/article/view/1836}, abstractNote={For any $\omega > 0,\; \beta \in (0, 2\omega)$, and any measurable set $B \in I_d := [0, d],\; \mu B = \beta$, we obtain the following sharp inequality of the Remez type: $$||x||_{\infty} \leq \frac{3||\varphi||_{\infty} - \varphi \biggl(\frac{\omega - \beta}2 \biggr)}{||\varphi||_{\infty} + \varphi \biggl(\frac{\omega - \beta}2 \biggr)} ||x||_{L_{\infty}(I_d\setminus B)}$$ on the set $S_{\varphi} (\omega )$ of functions $x$ with minimal period $d (d \geq 2\omega)$ and a given sine-shaped $2\omega$ -periodic comparison function $\varphi$. In particular, we prove the sharp Remez-type inequalities on the Sobolev spaces of differentiable periodic functions. We also obtain inequalities of the indicated type on the spaces of trigonometric polynomials and polynomial splines.}, number={2}, journal={Ukrains’kyi Matematychnyi Zhurnal}, author={Kofanov, V. A.}, year={2016}, month={Feb.}, pages={227-240} }