Necessary and sufficient conditions for hyperbolicity and weak hyperbolicity of systems with constant multiplicity, part I

Date

2019-12-09

Authors

Taglialatela, Giovanni
Vaillant, Jean

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Publisher

Texas State University, Department of Mathematics

Abstract

We consider a linear system of partial differential equations, whose principal symbol is hyperbolic with characteristics of constant multiplicities. We define necessary and sufficient invariant condition in order the Cauchy problem to be well-posed in C∞. These conditions generalize the Levi conditions for scalar operators. The proof is based on the construction of a new non commutative determinant adapted to this case (and to the holomorphic case).

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Keywords

Cauchy problem, Systems with constant multiplicity, Levi conditions

Citation

Taglialatela, G., & Vaillant, J. (2019). Necessary and sufficient conditions for hyperbolicity and weak hyperbolicity of systems with constant multiplicity, part I. <i>Electronic Journal of Differential Equations, 2019</i>(130), pp. 1-54.

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Attribution 4.0 International

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