Abstract
The paper provides an explicit solution to the well-known problem of differentiation of hyperelliptic functions with respect to parameters of the corresponding hyperelliptic curve.
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References
F. G. Frobenius and L. Stickelberger, “Über die Differentiation der elliptischen Functionen nach den Perioden und Invarianten,” J. Reine Angew. Math. 92, 311–337 (1882).
B. A. Dubrovin, V. B. Matveev, and S. P. Novikov, “Nonlinear equations of Korteweg–de Vries type, finite-zone linear operators, and Abelian varieties,” Russian Math. Surveys 31 (1), 59–146 (1976).
I. M. Krichever, “Methods of algebraic geometry in the theory of nonlinear equations,” Russian Math. Surveys 32 (6), 185–213 (1977).
B. A. Dubrovin, “Theta functions and nonlinear equations,” Russian Math. Surveys 36 (2), 11–92 (1981).
V. M. Buchstaber and D. V. Leykin, “Solution of the problem of differentiation of Abelian functions over parameters for families of \((n,s)\)-curves,” Functional Anal. Appl. 42 (4), 268–278 (2008).
V. M. Buchstaber, V. Z. Enolski, and D. V. Leykin, “\(\sigma\)-Functions: old and new results,” in Integrable Systems and Algebraic Geometry, Vol. 2, London Math. Soc. Lecture Note Ser. (Cambridge Univ. Press, Cambridge, 2020), Vol. 459, pp. 175–214.
F. Klein, “Ueber hyperelliptische Sigmafunctionen,” Math. Ann. 27 (3), 431–464 (1886).
F. Klein, “Ueber hyperelliptische Sigmafunctionen,” Math. Ann. 32 (3), 351–380 (1888).
H. F. Baker, “On the hyperelliptic sigma functions,” Amer. J. Math. 20 (4), 301–384 (1898).
V. M. Buchstaber, V. Z. Enolskii, and D. V. Leikin, “Hyperelliptic Kleinian functions and applications,” in Solitons, Geometry, and Topology: On the Crossroad, Amer. Math. Soc. Transl. Ser. 2 (Amer. Math. Soc., Providence, RI, 1997), Vol. 179, pp. 1–34.
V. M. Buchstaber, V. Z. Enolskii, and D. V. Leykin, “Kleinian functions, hyperelliptic Jacobians and applications,” in Reviews in Mathematics and Math. Physics (Gordon and Breach, London, 1997), Vol. 10, pp. 3–120.
V. M. Buchstaber, V. Z. Enolski, and D. V. Leykin, Multi-Dimensional Sigma Functions, arXiv: http://arxiv.org/abs/1208.0990.
B. A. Dubrovin, “Geometry of 2D topological field theories,” in Integrable Systems and Quantum Groups, Montecatini Terme, 1993, Lecture Notes in Math. (Springer- Verlag, Berlin, 1994), Vol. 1620, pp. 120–348.
V. M. Buchstaber, “Polynomial dynamical systems and the Korteweg–de Vries equation,” Proc. Steklov Inst. Math. 294, 176–200 (2016).
E. Yu. Bunkova, “Differentiation of genus 3 hyperelliptic functions,” European Journal of Mathematics 4 (1), 93–112 (2018).
V. M. Buchstaber and E. Yu. Bunkova, “Sigma Functions and Lie Algebras of Schrödinger Operators,” Functional Anal. Appl. 54 (4), 229–240 (2020).
V. M. Buchstaber and D. V. Leykin, “Polynomial Lie algebras,” Functional Anal. Appl. 36 (4), 267–280 (2002).
V. I. Arnold, Singularities of Caustics and Wave Fronts, in Math. Appl. (Soviet Ser.) (Kluwer Acad., Dordrecht, 1990), Vol. 62.
V. M. Buchstaber and D. V. Leykin, “Heat equations in a nonholonomic frame,” Functional Anal. Appl. 38 (2), 88–101 (2004).
V. M. Buchstaber and E. Yu. Bunkova, “Lie algebras of heat operators in a nonholonomic frame,” Math. Notes 108 (1), 15–28 (2020).
V. M. Buchstaber and E. Yu. Bunkova, “Hyperelliptic sigma functions and Adler–Moser polynomials,” Functional Anal. Appl. 55 (3), 179–197 (2021).
V. M. Buchstaber and E. Yu. Bunkova, “Parametric Korteweg–de Vries hierarchy and hyperelliptic sigma functions,” Functional Anal. Appl. 56 (3), 169–187 (2022).
V. M. Buchstaber and S. Yu. Shorina, “The \(w\)-function of the KdV hierarchy,” in Geometry, Topology, and Mathematical Physics, Amer. Math. Soc. Transl. Ser. 2 (Amer. Math. Soc., Providence, RI, 2004), Vol. 212, pp. 41–66.
N. A. Kudryashov, Analytic Theory of Nonlinear Differential Equations (RKhD, Moscow–Izhevsk, 2004) [in Russian].
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Translated from Matematicheskie Zametki, 2023, Vol. 114, pp. 808–821 https://doi.org/10.4213/mzm14114.
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Bunkova, E.Y., Buchstaber, V.M. Explicit Formulas for Differentiation of Hyperelliptic Functions. Math Notes 114, 1151–1162 (2023). https://doi.org/10.1134/S0001434623110470
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DOI: https://doi.org/10.1134/S0001434623110470