Inertia, positive definiteness and ℓp norm of GCD and LCM matrices and their unitary analogs

Inertia, positive definiteness and ℓp norm of GCD and LCM matrices and their unitary analogs

Let S={x1,x2,…,xn} be a set of distinct positive integers, and let f be an arithmetical function. The GCD matrix (S)f on S associated with f is defined as the n×n matrix having f evaluated at the greatest common divisor of xi and xj as its ij entry. The LCM matrix [S]f is defined similarly. We consi...

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Veröffentlicht in:Linear algebra and its applications 2018-12, Vol.558, p.1-24
Hauptverfasser: Haukkanen, Pentti, Tóth, László
Format: Artikel
Sprache:eng
Schlagworte:
Analogs
Arithmetical convolution
Asymptotic formula
Asymptotic methods
GCD type matrix
Inertia
Integers
Linear algebra
Matrix
Matrix norm
Numerical analysis
Positive definiteness
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Zusammenfassung:Let S={x1,x2,…,xn} be a set of distinct positive integers, and let f be an arithmetical function. The GCD matrix (S)f on S associated with f is defined as the n×n matrix having f evaluated at the greatest common divisor of xi and xj as its ij entry. The LCM matrix [S]f is defined similarly. We consider inertia, positive definiteness and ℓp norm of GCD and LCM matrices and their unitary analogs. Proofs are based on matrix factorizations and convolutions of arithmetical functions.
ISSN:0024-3795
1873-1856
DOI:10.1016/j.laa.2018.08.022