AbstractThe uniform symmetrizability for square matrices depending on a parameter is naturally related to the wellposedness of the Cauchy Problem for hyperbolic systems. In particular, if A(t) is a matrix function analytic in t, it is known that the Problemut=A(t)ux+B(t,x)u,u(0,x)=u0(x),is well-posed as soon as {A(t)} is US. In view of this or similar results, it is natural to look for necessary and/or sufficient conditions for the uniform symmetrizability of a family of matrices. In this paper, we give an explicit characterization of the US matrices of order ⩽3
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AbstractLet H be a subgroup of the symmetric group of degree m and let χ be an irreducible character...
We study various conditions on matrices B and C under which they can be the off-diagonal blocks of a...
AbstractIt is known that for every real square matrix A there exists a nonsingular real symmetric ma...
AbstractThe purpose of this paper is to study the generalized matrix-valued hypergeometric equation ...
Abstracta is a complex matrix valued 4×4 strongly hyperbolic operator; we state the following result...
AbstractWe consider the Cauchy problem for first order hyperbolic systems that have characteristic p...