Local Calderón-type reproducing formulas and applications to some problems in function spaces (Q1978836)

The author presents a decomposition formula of the form \(f=\sum _{j=0}^{\infty }\psi _j * \varphi _j * f\) for \(f\in \mathcal D'(\mathbb R^n)\), where \(\varphi _j(x)=2^{jn}\varphi (2^jx)\), \(j\in \mathbb N\), \(\varphi (x)=\varphi _0(x)-2^n\varphi _0(x/2)\) with a given \(\varphi _0\in C^{\infty }_{0}(\mathbb R^n)\). The functions \(\psi _j\in C^{\infty }_{0}\), \(j\in \mathbb N\), are constructed, where for \(j=1,2,\dots \), one has \(\psi _j(x)=2^{jn}\psi (2^jx)\), where \(\psi \in C^{\infty }_{0}\), and the function \(\psi \) satisfies the usual moment conditions. Additionally, if the support of \(\varphi _0\) is contained in a fixed cone \(K\), then \(\psi \) and \(\psi _0\) are supported in \(K\), too, independently of the number of moment conditions. Applications to extension operators for function spaces on Lipschitz domains are briefly described.