Defective Eigenvalues Of The Non-Backtracking Matrix

Authors

K. Heysse
K. Lorenzen
Carolyn Reinhart, Swarthmore CollegeFollow

Document Type

Article

Publication Date

9-29-2025

Published In

Electronic Journal Of Linear Algebra

Abstract

We consider graphs for which the non-backtracking matrix has defective eigenvalues or graphs for which the matrix does not have a full set of eigenvectors. The existence of these values results in Jordan blocks of size greater than one, which are called nontrivial. We develop a relationship between the eigenspaces of the non-backtracking matrix and the eigenspaces of a smaller matrix, completely classifying their differences among graphs with at most one cycle. Finally, we provide several constructions of infinite graph families that have nontrivial Jordan blocks for both this smaller matrix and the non-backtracking matrix.

Keywords

Non-backtracking matrix, Jordan form, Non-backtracking walks on graphs

Recommended Citation

K. Heysse, K. Lorenzen, and Carolyn Reinhart. (2025). "Defective Eigenvalues Of The Non-Backtracking Matrix". Electronic Journal Of Linear Algebra. Volume 41, 511-528. DOI: 10.13001/ela.2025.8835
https://works.swarthmore.edu/fac-math-stat/346