Options
Finite sections of the Fibonacci Hamiltonian
Publikationstyp
Book part
Date Issued
2018
Sprache
English
Author(s)
Institut
TORE-URI
First published in
Number in series
268
Start Page
381
End Page
396
Citation
in: The Diversity and Beauty of Applied Operator Theory. Operator Theory: Advances and Applications (268) : 381-396 (2018)
Publisher DOI
Scopus ID
Publisher
Birkhäuser
We study finite but growing principal square submatrices An of the one- or two-sided infinite Fibonacci Hamiltonian A. Our results show that such a sequence (An), no matter how the points of truncation are chosen, is always stable – implying that An is invertible for sufficiently large n and A–1n → A–1 pointwise.
Subjects
Fibonacci Hamiltonian
Finite section method
Jacobi operator
Limit operators