posted on 2015-04-15, 10:55authored byClaudia Garetto, Michael Ruzhansky
In this paper we study weakly hyperbolic second order equations with time dependent irregular coefficients. This means assuming that the coefficients are less regular than Hölder. The characteristic roots are also allowed to have multiplicities. For such equations, we describe the notion of a ‘very weak solution’ adapted to the type of solutions that exist for regular coefficients. The construction is based on considering Friedrichs-type mollifiers of coefficients and corresponding classical solutions, and their quantitative behaviour in the regularising parameter. We show that even for distributional coefficients, the Cauchy problem does have a very weak solution, and that this notion leads to classical or to ultradistributional solutions under conditions when such solutions also exist. In concrete applications, the dependence on the regularising parameter can be traced explicitly.
Funding
M. Ruzhansky was supported by the EPSRC Leadership Fellowship EP/G007233/1 and by EPSRC Grant EP/K039407/1
History
School
Science
Department
Mathematical Sciences
Published in
Archive for Rational Mechanics and Analysis
Volume
217
Issue
1
Pages
113 - 154
Citation
GARETTO, C. and RUZHANSKY, M., 2015. Hyperbolic second order equations with non-regular time dependent coefficients. Archive for Rational Mechanics and Analysis, 217(1), pp. 113-154.
This work is made available according to the conditions of the Creative Commons Attribution 3.0 Unported (CC BY 3.0) licence. Full details of this licence are available at: http://creativecommons.org/licenses/by/3.0/
Acceptance date
2014-12-02
Publication date
2014-12-20
Notes
This article is distributed under the terms of the Creative Commons Attribution License which permits any use, distribution, and reproduction in any medium, provided
the original author(s) and the source are credited.