Topology and regularity for generalized ultradistribution algebras
Abstract
Compiling essential results for non-quasianalytic ultradistribution spaces and Colombeau versions of generalized ultradistribution algebras, we analyze strong B- and strong R-association of a generalized ultradistribution [(f)]. The strong association of [(f)] to a Komatsu-type ultradistribution T, with additional assumption on regularity of [(f)] of Beurling, respectively, Roumieu type, implies that T is an ultradifferentiable function of Beurling, Roumieu type, respectively. We demonstrate that, under suitable conditions on regularity, a weakly negligible net (g)∈(0,1) (meaning that the net of complex numbers (∫ gφ dx)∈(0,1) is Beurling, respectively, Roumieu negligible for every ultradifferentiable function φ in the corresponding test space), is a negligible net in the sense of generalized ultradistributions. Furthermore, we prove that a translation invariant generalized ultradistribution g is equal to a generalized constant in both types of generalized ultradistribution algebras.
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