About spaces of \(\omega_1\)-\(\omega_2\)-ultradifferentiable functions (Q2519129)

Nonisotropic spaces of ultradifferentiable functions are introduced on products \( \Omega_1 \times \Omega_2 \subset \mathbb R^r \times \mathbb R^s \) in such a way that the first \(r\) partial derivatives are governed by a weight function \( \omega_1 \) in the sense of \textit{R.\,W.\thinspace Braun, R.\,Meise} and \textit{B.\,A.\thinspace Taylor} [Result.\ Math.\ 17, No.\,3--4, 206--237 (1990; Zbl 0735.46022)] and the other partial derivatives are governed by a possibly different weight \( \omega_2 \). In this setting, a theory is evolved, leading to kernel theorems. Proofs are only carried out if they differ from the proofs of the analogous theory for the Denjoy-Carleman case, which the same authors developed in [Result.\ Math.\ 53, No.\,1--2, 173--195 (2009; Zbl 1182.46025)].