Marco Bertola, “The Malgrange Form and Fredholm Determinants”, SIGMA, 13 (2017), 046, 12 pp.

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Symmetry, Integrability and Geometry: Methods and Applications, 2017, Volume 13, 046, 12 pp.
DOI: https://doi.org/10.3842/SIGMA.2017.046 (Mi sigma1246)

This article is cited in 4 scientific papers (total in 4 papers)

The Malgrange Form and Fredholm Determinants

Marco Bertola^ab

^a Department of Mathematics and Statistics, Concordia University, Montréal, Canada
^b Area of Mathematics SISSA/ISAS, Trieste, Italy

Full-text PDF (360 kB) Citations (4)

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DOI: https://doi.org/10.3842/SIGMA.2017.046

Abstract: We consider the factorization problem of matrix symbols relative to a closed contour, i.e., a Riemann–Hilbert problem, where the symbol depends analytically on parameters. We show how to define a function

τ

$\tau$ which is locally analytic on the space of deformations and that is expressed as a Fredholm determinant of an operator of “integrable” type in the sense of Its–Izergin–Korepin–Slavnov. The construction is not unique and the non-uniqueness highlights the fact that the tau function is really the section of a line bundle.

Keywords: Malgrange form; Fredholm determinants; tau function.

Received: March 12, 2017; in final form June 17, 2017; Published online June 22, 2017

Bibliographic databases:

Document Type: Article

MSC: 35Q15; 47A53; 47A68

Language: English

Citation: Marco Bertola, “The Malgrange Form and Fredholm Determinants”, SIGMA, 13 (2017), 046, 12 pp.

Citation in format AMSBIB

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\by Marco~Bertola

\paper The Malgrange Form and Fredholm Determinants

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\papernumber 046

\totalpages 12

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https://www.mathnet.ru/eng/sigma1246

https://www.mathnet.ru/eng/sigma/v13/p46

This publication is cited in the following 4 articles:

M Bertola, T Grava, G Orsatti, “Integrable operators,
∂ ―
-problems, KP and NLS hierarchy”, Nonlinearity, 37:8 (2024), 085008
Harini Desiraju, “Painlevé/CFT correspondence on a torus”, Journal of Mathematical Physics, 63:8 (2022)
H. Desiraju, “Fredholm determinant representation of the homogeneous Painleve II tau-function”, Nonlinearity, 34:9 (2021), 6507–6538
M. Cafasso, P. Gavrylenko, O. Lisovyy, “Tau functions as Widom constants”, Commun. Math. Phys., 365:2 (2019), 741–772

Citing articles in Google Scholar: Russian citations, English citations
Related articles in Google Scholar: Russian articles, English articles

Symmetry, Integrability and Geometry: Methods and Applications

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Abstract page:	166
Full-text PDF :	44
References:	31

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