## Cauchy's problem for hyperbolic equations |

### What people are saying - Write a review

We haven't found any reviews in the usual places.

### Other editions - View all

Cauchy's Problem for Hyperbolic Equations: Winter and Spring Quarters, 1957 ... Lars Garding,G. Bergendahl No preview available - 2013 |

Cauchy's Problem for Hyperbolic Equations: Winter and Spring Quarters, 1957 ... Lars Garding,G. Bergendahl No preview available - 2013 |

### Common terms and phrases

ak+1 assumptions Banach space belongs bounded coefficients bounded variation Cauchy»s problem characteristic polynomial Consider continuous functions converges defined denoted derivatives of order double differential operator double order dual dual space duality energy integral equivalence fact finishes the proof finite following lemma formula function f Hahn-Banach theorem Hence hermitian Hilbert space homogeneous hyperbolic equations hyperbolic operators implies inequalities for partial infinitely differentiable integrable functions left side Leray let f linear functional linear homeomorphism Lip0 Lip1 Lipp*q locally integrable locally integrable function LP*q norm normal notation operator of order Pa(x Pak+1 prove the lemma remains to prove Remark replaced respectively result right side satisfying scalar product second kind sense shows strongly dense suffices to prove tends to zero term theorem 7.1 theory total order unique solution vanishing in neighborhoods variable vector space weakly dense write