6533b86ffe1ef96bd12ce634

RESEARCH PRODUCT

Reflection and Refraction of Singularities for Wave Equations with Interface Conditions given by Fourier Integral Operators

Felix Ali Mehmeti

subject

Operator (computer programming)Mathematical analysisRefraction (sound)Reflection (physics)Microlocal analysisCauchy distributionGravitational singularityWave equationFourier integral operatorMathematics

description

Cauchy problems for hyperbolic operators often have the property, that the singularities of the initial data propagate along the bicharacteristic strips of the operator (cf. e.g. [13]). We consider, in the linear case, the situation where the bicharacteristics hit transversally a spacelike interface, which is ‘active’ in the sense that the interface condition is given via certain Fourier integral operators. Taking the identity, we obtain classical transmission conditions. A suitable functional analytic setting is furnished by the interaction concept [3], [6], [7], which covers very general mutual influences of evolution phenomena on different domains.

yearjournalcountryeditionlanguage
1992-01-01
https://doi.org/10.1007/978-3-663-11577-9_1