A Time Domain Characterization of 2-Microlocal Spaces

We characterize the Besov regularity of functions on Lipschitz domains by means of their error of approximation by certain sequences of operators. As an application, we consider wavelet decompositions and we characterize Besov quasi-norms in terms of weighted sequence norms. 273

## Abstract The aim of this paper is to study the equivalence between quasi‐norms of Besov spaces on domains. We suppose that the domain Ω ⊂ ℝ^__n__^ is a bounded Lipschitz open subset in ℝ^__n__^. First, we define Besov spaces on Ω as the restrictions of the corresponding Besov spaces on ℝ^__n__^.

## Abstract In this article, a wire dipole embedded within a double‐negative medium is numerically analyzed using the time‐domain integral equation method. The antenna is excited by a narrow Gaussian pulse to obtain responses within a wider frequency band. The transient current distribution on the