ON A GENERALIZATION OF THE RESOLVENT CONDITION IN THE ...
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mathematics of computation
volume 57,number 195
july
1991, pages 211-220
ON A GENERALIZATION OF THE RESOLVENT CONDITION IN THE KREISS MATRIXTHEOREM H. W. J. LENFERINKand m. n. SPIJKER Abstract. This paper deals with a condition on the resolvent of s x 5 matrices A . In one of the equivalent assertions of the Kreiss matrix theorem, the spectral norm of the resolvent of A at £ must satisfy an inequality for all f lying outside the unit disk in C. We consider a generalization in which domains different from the unit disk and more general norms are allowed. Under this generalized resolvent condition an upper bound is derived for the norms of the «th powers of sxs matrices B . Here, B depends on A via a relation B = is an arbitrary rational function. The upper bound grows linearly with s > 1 and is independent of n > 1 . This generalizes an upper bound occurring in the Kreiss theorem where B = A . Like the classical Kreiss theorem, the upper bound derived in this paper can be used in the stability analysis of numerical methods for solving differential equations.
1. Introduction
In the stability analysis of numerical methods for solving differential equations one is often faced with the question whether the norms of the powers of a given matrix are uniformly bounded. The Kreiss matrix theorem (see, e.g., [3, 6, 9]) provides an important tool for answering this question. One of the assertions of the theorem relates the inequality
(1.1)
\\A"\\ 0, k > 0, j + k 0.
Then (2.2)
\\ 0 such that
VQ= V u {C:Ce C and |C- C,| < a for some ;' with 1 < j < a} is contained in 5. For e > 0, the set
{í:Í€Candí/(í,K0)
= e}
License or copyright restrictions may apply to redistribution; see http://www.ams.org/journal-terms-of-use
216
H. W. J. LENFERINKAND M. N. SPIJKER
is the range of a piecewise smooth, positively oriented Jordan curve Ye, parametrized by C = ze(t), 0 < t < 1, with \z'e(t)\ independent of t. We may then proceed as in the case when int(K) /0 to arrive at (2.2) with y depending only on *}) have no common factor of degree > 1 (in the domain of polynomials in two variables over C),
