A matricial view of the Karpelevič Theorem

A matricial view of the Karpelevič Theorem

The question of the exact region in the complex plane of the possible single eigenvalues of all n-by-n stochastic matrices was raised by Kolmogorov in 1937 and settled by Karpelevič in 1951 after a partial result by Dmitriev and Dynkin in 1946. The Karpelevič result is unwieldy, but a simplification...

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Veröffentlicht in:Linear algebra and its applications 2017-05, Vol.520, p.1-15
Hauptverfasser: Johnson, Charles R., Paparella, Pietro
Format: Artikel
Sprache:eng
Schlagworte:
Doubly stochastic matrix
Eigenvalues
Ito polynomial
Karpelevič arc
Karpelevič region
Linear algebra
Matrix
Parameter estimation
Polynomials
Realizing matrix
Stochastic matrix
Stochastic models
Theorems
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Zusammenfassung:The question of the exact region in the complex plane of the possible single eigenvalues of all n-by-n stochastic matrices was raised by Kolmogorov in 1937 and settled by Karpelevič in 1951 after a partial result by Dmitriev and Dynkin in 1946. The Karpelevič result is unwieldy, but a simplification was given by Đoković in 1990 and Ito in 1997. The Karpelevič region is determined by a set of boundary arcs each connecting consecutive roots of unity of order less than n. It is shown here that each of these arcs is realized by a single, somewhat simple, parameterized stochastic matrix. Other observations are made about the nature of the arcs and several further questions are raised. The doubly stochastic analog of the Karpelevič region remains open, but a conjecture about it is amplified.
ISSN:0024-3795
1873-1856
DOI:10.1016/j.laa.2017.01.009