中文

Linear Equations over cones and Collatz-Wielandt numbers

环与代数 2007-05-23 v1 谱理论

摘要

Let KK be a proper cone in \IRn\IR^n, let AA be an n×nn\times n real matrix that satisfies AKKAK\subseteq K, let bb be a given vector of KK, and let λ\lambda be a given positive real number. The following two linear equations are considered in this paper: (i)(λInA)x=b(\lambda I_n-A)x=b, xKx\in K, and (ii)(AλIn)x=b(A-\lambda I_n)x=b, xKx\in K. We obtain several equivalent conditions for the solvability of the first equation. For the second equation we give an equivalent condition for its solvability in case when λ>ρb(A)\lambda>\rho_b (A), and we also find a necessary condition when λ=ρb(A)\lambda=\rho_b (A) and also when λ<ρb(A)\lambda < \rho_b(A), sufficiently close to ρb(A)\rho_b(A), where ρb(A)\rho_b (A) denotes the local spectral radius of AA at bb. With λ\lambda fixed, we also consider the questions of when the set (AλIn)KK(A-\lambda I_n)K \bigcap K equals {0}\{0\} or KK, and what the face of KK generated by the set is. Then we derive some new results about local spectral radii and Collatz-Wielandt sets (or numbers) associated with a cone-preserving map, and extend a known characterization of MM-matrices among ZZ-matrices in terms of alternating sequences.

关键词

引用

@article{arxiv.math/0109074,
  title  = {Linear Equations over cones and Collatz-Wielandt numbers},
  author = {Bit-Shun Tam and Hans Schneider},
  journal= {arXiv preprint arXiv:math/0109074},
  year   = {2007}
}

备注

To appear in LAA