posted on 2015-04-17, 14:09authored byClaudia Garetto, Gunther Hormann
We characterize microlocal regularity, in the script G sign ∞-sense, of Colombeau generalized functions by an appropriate extension of the classical notion of micro-ellipticity to pseudodifferential operators with slow-scale generalized symbols. Thus we obtain an alternative, yet equivalent, way of determining generalized wavefront sets that is analogous to the original definition of the wavefront set of distributions via intersections over characteristic sets. The new methods are then applied to regularity theory of generalized solutions of (pseudo)differential equations, where we extend the general non-characteristic regularity result for distributional solutions and consider propagation of script G sign ∞-singularities for homogeneous first-order hyperbolic equations.
History
School
Science
Department
Mathematical Sciences
Published in
Proceedings of the Edinburgh Mathematical Society
Volume
48
Issue
3
Pages
603 - 629
Citation
GARETTO, C. and HORMANN, G., 2005. Microlocal analysis of generalized functions: pseudodifferential techniques and propagation of singularities. Proceedings of the Edinburgh Mathematical Society (Series 2), 48 (3), pp. 603 - 629.
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