Best Approximation by the Inverse of a Monotone Polynomial and the Location Problem

## Abstract The aim of this article is to study the parabolic inverse problem of determination of the leading coefficient in the heat equation with an extra condition at the terminal. After introducing a new variable, we reformulate the problem as a nonclassical parabolic equation along with the in

The problem of deriving robust and classically acceptable Bayesian inference on location parameters is considered in this paper. The main result of the paper allows one to obtain uniform posterior approximation starting with likelihood functions with heavy tails, e.g., t-distributions with unknown l

The best polynomial approximation is closely related to the Ditzian᎐Totik modulus of smoothness. In 1988, Z. Ditzian and V. Totik gave some equivalences between them and the class of Besov-type spaces B p with 1 F p F ϱ and ␣, s 1 F s F ϱ. We extend these equivalences to the similar Besov-type space

The problem of Timan on finding a necessary and sufficient condition for \(A_{\sigma}(f)_{L_{q}} \sim \omega_{k}(f ; 1 / \sigma)_{L_{q}}, \sigma \rightarrow \infty\), is solved. The condition is \(\omega_{k}(f ; \delta)_{L_{q}} \sim \omega_{k+1}(f ; \delta)_{L_{q}}\), \(\delta \rightarrow 0\). Relat