English

Generalizing the Eigenvalue Interlacing Theorem to Pseudo-Similarity Transformations

Spectral Theory 2025-11-21 v1

Abstract

The current general form of the well-known Eigenvalue Interlacing Theorem states that, given an N×NN \times N Hermitian matrix PP, the eigenvalues of the matrix product QHPQQ^{H} P Q will interlace those of PP if the columns of the N×LN \times L matrix QQ (with LNL \le N) are unitary. This note further generalizes this theorem to include pseudo-similarity transformations, namely products of the form HPHH^{\dagger} P H, where HH is a general N×KN \times K matrix and "\dagger" denotes the Moore-Penrose pseudoinverse. This implies that, while the product QHPQQ^{H} P Q is Hermitian and is generally a deflated version of PP (both in dimensionality and in the number of non-zero eigenvalues), this is not the case for HPHH^{\dagger} P H, which, although generally a deflated version of PP in terms of the number of non-zero eigenvalues, will not necessarily be so in dimensionality, nor will it in general be Hermitian. Thus, this note not only generalizes the Eigenvalue Interlacing Theorem but also shows that eigenvalue interlacing may occur between Hermitian and non-Hermitian matrices and even in the presence of dimensionally inflated matrices.

Keywords

Cite

@article{arxiv.2511.15868,
  title  = {Generalizing the Eigenvalue Interlacing Theorem to Pseudo-Similarity Transformations},
  author = {Julio Guillen-Garcia and Manuel F. Fernández and Roberto Gallardo-Cava},
  journal= {arXiv preprint arXiv:2511.15868},
  year   = {2025}
}

Comments

6 pages

R2 v1 2026-07-01T07:46:11.624Z