Ultradifferentiable Functions on Compact Intervals

## Abstract Let __P__ be an elliptic differential operator of order __p__ with real analytic coefficients on in open set __Q__ ⊂ ℝ^n^. Given a compact set __K__ ⊂ Ω, we describe the closure in BMO(__K__) of the space of mentions of __Pf__ = 0 on neighborhoods of __K__.

Chebyshev Markov rational functions are the solutions of the following extremal problem min c 1 , ..., c n # R " with K being a compact subset of R and | n (x) being a fixed real polynomial of degree less than n, positive on K. A parametric representation of Chebyshev Markov rational functions is

The usual formula for Hermite polynomials on \(\mathbf{R}^{d}\) is extended to a compact Lie group \(G\), yielding an isometry of \(L^{2}\left(G, p_{1}\right)\), where \(p_{1}\) is the heat kernel measure at time one, with a natural completion of the universal enveloping algebra of \(G\). The existe