We consider the Cauchy problem in L 2 for first order system. A necessary condition is that the system must be uniformly diagonaliz-able, or equivalently that it admits a bounded symmetrizer. A sufficient condition is that it admits a smooth (Lipschtitz) symmetrizer, which is true when the system is hyperbolic, diagonalizable with eigen-values of constant multiplicities. Counterexamples show that uniform diagonalizability is not sufficient in general for systems with variable coefficients and indicate that the symplectic properties of the set Σ of the singular points of the characteristic variety are important. In this paper, give a new class of systems for which the Cauchy problem is well posed in L 2. The main assumption is that Σ is a sm...
In this work, we study constant-coefficient first order systems of partial differential equations an...
AbstractWe study symmetrization of hyperbolic first order systems. To be precise, generalizing non-d...
Regularity properties of generic hyperbolic systems with diagonalizable principal part will be estab...
To appear in Kyoto. Math. JournalWe consider the Cauchy problem in L 2 for first order system. A nec...
In this paper we prove a well-posedness result for the Cauchy problem. We study a class of first ord...
This paper is concerned with the well posedness of the Cauchy problem for first order symmetric hype...
We prove Gevrey well posedness of the Cauchy problem for general linear systems whose principal symb...
We consider the well-posedness of the Cauchy problem in Gevrey spaces for N×N first-order weakly hyp...
We study strong hyperbolicity of first order partial differential equationsfor systems with differen...
Abstract: The paper is devoted to studying uniformly strongly hyperbolic matrices P(z,ξ), ...
AbstractWe consider the Cauchy problem for first order hyperbolic systems that have characteristic p...
AbstractIn the present paper we give necessary conditions for the well-posedness of the Cauchy probl...
The propagation of analyticity for sufficiently smooth solutions to either strictly hyperbolic, or s...
A possible definition of strong/symmetric hyperbolicity for a second-order system of evolution equat...
A possible definition of strong/symmetric hyperbolicity for a second-order system of evolution equat...
In this work, we study constant-coefficient first order systems of partial differential equations an...
AbstractWe study symmetrization of hyperbolic first order systems. To be precise, generalizing non-d...
Regularity properties of generic hyperbolic systems with diagonalizable principal part will be estab...
To appear in Kyoto. Math. JournalWe consider the Cauchy problem in L 2 for first order system. A nec...
In this paper we prove a well-posedness result for the Cauchy problem. We study a class of first ord...
This paper is concerned with the well posedness of the Cauchy problem for first order symmetric hype...
We prove Gevrey well posedness of the Cauchy problem for general linear systems whose principal symb...
We consider the well-posedness of the Cauchy problem in Gevrey spaces for N×N first-order weakly hyp...
We study strong hyperbolicity of first order partial differential equationsfor systems with differen...
Abstract: The paper is devoted to studying uniformly strongly hyperbolic matrices P(z,ξ), ...
AbstractWe consider the Cauchy problem for first order hyperbolic systems that have characteristic p...
AbstractIn the present paper we give necessary conditions for the well-posedness of the Cauchy probl...
The propagation of analyticity for sufficiently smooth solutions to either strictly hyperbolic, or s...
A possible definition of strong/symmetric hyperbolicity for a second-order system of evolution equat...
A possible definition of strong/symmetric hyperbolicity for a second-order system of evolution equat...
In this work, we study constant-coefficient first order systems of partial differential equations an...
AbstractWe study symmetrization of hyperbolic first order systems. To be precise, generalizing non-d...
Regularity properties of generic hyperbolic systems with diagonalizable principal part will be estab...