Exact constants in Jackson-type inequalities for the best mean square approximation in L₂(ℝ) and exact values of mean ????-widths of the classes of functions

On the classes of functions \( {L}_2^r\left(\mathbb{R}\right) \), where r ∈ℤ₊, for the characteristics of smoothness \( {\Lambda}_k\left(f,t\right)={\left\{\left(1/t\right){\int}_0^t\left\Vert {\varDelta}_h^k(f)\left\Vert {}^2\right. dh\right.\right\}}^{\kern0em 1/2},t\in \left(0,\infty \right),k\in \mathbb{N} \), the exact constants in the Jackson-type inequalities have been obtained in the case of the best mean square approximation by entire functions of the exponential type in the space L₂(ℝ). The exact values of mean ????-widths of the classes of functions defined by Λ_k(f) and the majorants Ψ satisfying some conditions are calculated.