2006
DOI: 10.1088/1751-8113/40/1/005
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Holonomy of the Ising model form factors

Abstract: Abstract. We study the Ising model two-point diagonal correlation function C(N, N ) by presenting an exponential and form factor expansion in an integral representation which differs from the known expansion of Wu, McCoy, Tracy and Barouch. We extend this expansion, weighting, by powers of a variable λ, the j-particle contributions, f N,N is expressed polynomially in terms of the complete elliptic integrals E and K. The scaling limit of these differential operators breaks the direct sum structure but not the "… Show more

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Cited by 33 publications
(230 citation statements)
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“…This deep relation between elliptic curves and Painlevé VI explains the occurrence of Painlevé VI on the Ising model, and on other lattice Yang-Baxter integrable models which are canonically parametrized in term of elliptic functions (like the eight-vertex Baxter model, the RSOS models, see for instance [15]). One can see in Section 6 of [25], other examples of this deep connection between the transcendent solutions of Painlevé VI and the theory of elliptic functions, modular curves and quasi-modular functions. Along this line one should note that other linear differential operators, not straightforwardly linked to L E but more generally to the theory of elliptic functions and modular forms (quasimodular forms .…”
Section: The Elliptic Representation Of Painlevé VImentioning
confidence: 97%
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“…This deep relation between elliptic curves and Painlevé VI explains the occurrence of Painlevé VI on the Ising model, and on other lattice Yang-Baxter integrable models which are canonically parametrized in term of elliptic functions (like the eight-vertex Baxter model, the RSOS models, see for instance [15]). One can see in Section 6 of [25], other examples of this deep connection between the transcendent solutions of Painlevé VI and the theory of elliptic functions, modular curves and quasi-modular functions. Along this line one should note that other linear differential operators, not straightforwardly linked to L E but more generally to the theory of elliptic functions and modular forms (quasimodular forms .…”
Section: The Elliptic Representation Of Painlevé VImentioning
confidence: 97%
“…The expressions (or forms) of the linear differential operators L 5 (N ), L 7 (N ) and L 9 (N ) are given in [25].…”
Section: Fuchsian Linear Dif Ferential Equations Formentioning
confidence: 99%
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