Jacobi inversion on strata of the Jacobian of the C rs curve y r =f(x)

Matsutani, Shigeki; Превиато, Эмма

doi:10.2969/jmsj/06041009

Cited by 36 publications

(85 citation statements)

References 36 publications

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“…Further, the equation (5.8) is directly related to the determinant of the matrices constructed in [25], using the algebraic approach developed in [21].…”

Section: This Operator Occurs In What Is Now Known Asmentioning

confidence: 99%

Abelian Functions for Trigonal Curves of Genus Three

Eilbeck

Enolskii

Matsutani³

et al. 2010

International Mathematics Research Notices

104

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We develop the theory of generalized Weierstrass σ-and ℘-functions defined on a general trigonal curve of genus three. In particular, we give a list of the associated partial differential equations satisfied by the ℘-functions, a proof that the coefficients of the power series expansion of the σ-function are polynomials of coefficients of the defining equation of the curve, and the derivation of two addition formulae.

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“…Further, the equation (5.8) is directly related to the determinant of the matrices constructed in [25], using the algebraic approach developed in [21].…”

Section: This Operator Occurs In What Is Now Known Asmentioning

confidence: 99%

Abelian Functions for Trigonal Curves of Genus Three

Eilbeck

Enolskii

Matsutani³

et al. 2010

International Mathematics Research Notices

104

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“…Due to the properties of the Abelian structure, i.e., theorem of cube, the Gauss sum is connected with another physical problem, Chern-Simons-Witten theory of the three-manifold related to some Riemann surfaces [10,18,39]. Recently the Abelian variety (more precisely Jacobi variety), we have explicit representations [26]. Using the recent developments and our new result of the fractional Talbot phenomena, we could investigate the quantum structure over there.…”

Section: Discussionmentioning

confidence: 99%

Gauss Optics and Gauss Sum on an Optical Phenomena

Matsutani¹

2008

Found Phys

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“…Following [45,37], we introduce a multi-index n . For n with 1 n < g, we let n be the set of positive integers i such that n + 1 i g with i ≡ n + 1 mod 2.…”

Section: Sigma Function and Its Derivativesmentioning

confidence: 99%

“…Remark 6.12. -Given the connection between Theorem 6.3 and theory of Kac and van Moerbeke provided by Theorem 6.11, we note in addition: since it is known that for certain multi-indices γ = (γ 1 , ..., γ g ) and for [45,37], by differentiating the equation, the σ function satisfies (k = 1, . .…”

Section: Annales De L'institut Fouriermentioning

confidence: 99%

Quasi-periodic and periodic solutions of the Toda lattice via the hyperelliptic sigma function

Kodama¹,

Matsutani²,

Превиато³

2013

Ann. inst. Fourier

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M. Toda in 1967 (J. Phys. Soc. Japan, 22 and 23) considered a lattice model with exponential interaction and proved, as suggested by the Fermi-Pasta-Ulam experiments in the 1950s, that it has exact periodic and soliton solutions. The Toda lattice, as it came to be known, was then extensively studied as one of the completely integrable (differential-difference) non-linear equations which admit exact solutions in terms of theta functions of hyperelliptic curves. In this paper, we extend Toda's original approach to give hyperelliptic solutions of the Toda lattice in terms of hyperelliptic Kleinian (sigma) functions for arbitrary genus. The key identities are given by generalized addition formulae for the hyperelliptic sigma functions (J.C. Eilbeck et al., J. reine angew. Math. 619, 2008). We then show that periodic (in the discrete variable, a standard term in the Toda lattice theory) solutions of the Toda lattice correspond to the zeros of Kiepert-Brioschi's division polynomials, and note these are related to solutions of Poncelet's closure problem. One feature of our solution is that the hyperelliptic curve is related in a non-trivial way to the one previously used.

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Jacobi inversion on strata of the Jacobian of the C rs curve y r =f(x)

Cited by 36 publications

References 36 publications

Abelian Functions for Trigonal Curves of Genus Three

Abelian Functions for Trigonal Curves of Genus Three

Gauss Optics and Gauss Sum on an Optical Phenomena

Quasi-periodic and periodic solutions of the Toda lattice via the hyperelliptic sigma function

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