English

Eigenvector dynamics: general theory and some applications

Statistical Mechanics 2013-01-29 v2 Probability Risk Management Statistical Finance

Abstract

We propose a general framework to study the stability of the subspace spanned by PP consecutive eigenvectors of a generic symmetric matrix H0{\bf H}_0, when a small perturbation is added. This problem is relevant in various contexts, including quantum dissipation (H0{\bf H}_0 is then the Hamiltonian) and financial risk control (in which case H0{\bf H}_0 is the assets return covariance matrix). We argue that the problem can be formulated in terms of the singular values of an overlap matrix, that allows one to define a "fidelity" distance. We specialize our results for the case of a Gaussian Orthogonal H0{\bf H}_0, for which the full spectrum of singular values can be explicitly computed. We also consider the case when H0{\bf H}_0 is a covariance matrix and illustrate the usefulness of our results using financial data. The special case where the top eigenvalue is much larger than all the other ones can be investigated in full detail. In particular, the dynamics of the angle made by the top eigenvector and its true direction defines an interesting new class of random processes.

Keywords

Cite

@article{arxiv.1203.6228,
  title  = {Eigenvector dynamics: general theory and some applications},
  author = {Romain Allez and Jean-Philippe Bouchaud},
  journal= {arXiv preprint arXiv:1203.6228},
  year   = {2013}
}

Comments

40 pages; 12 figures

R2 v1 2026-06-21T20:41:09.889Z