Вещественно-нормированные дифференциалы: пределы на стабильных кривых

И. М. Кричевер; Грушевский С.; Нортон Х.

doi:10.4213/rm9877

Publications

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Вещественно-нормированные дифференциалы: пределы на стабильных кривых

Успехи математических наук. 2019. Т. 74. № 2(446). С. 81–148.

Krichever I., Грушевский С., Нортон Х.

We study the behaviour of real-normalized (RN) meromorphic differentials on Riemann surfaces under degeneration. We describe all possible limits of RN differentials on any stable curve. In particular we prove that the residues at the nodes are solutions of a suitable Kirchhoff problem on the dual graph of the curve. We further show that the limits of zeros of RN differentials are the divisor of zeros of a twisted differential — an explicitly constructed collection of RN differentials on the irreducible components of the stable curve, with higher order poles at some nodes. Our main tool is a new method for constructing differentials (in this paper, RN differentials, but the method is more general) on smooth Riemann surfaces, in a plumbing neighbourhood of a given stable curve. To accomplish this, we think of a smooth Riemann surface as the complement of a neighbourhood of the nodes in a stable curve, with boundary circles identified pairwise. Constructing a differential on a smooth surface with prescribed singularities is then reduced to a construction of a suitable normalized holomorphic differential with prescribed 'jumps' (mismatches) along the identified circles (seams). We solve this additive analogue of the multiplicative Riemann–Hilbert problem in a new way, by using iteratively the Cauchy integration kernels on the irreducible components of the stable curve, instead of using the Cauchy kernel on the plumbed smooth surface. As the stable curve is fixed, this provides explicit estimates for the differential constructed, and allows a precise degeneration analysis.

Language: Russian

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Keywords: boundary value problems degenerations вырождения краевая задача Riemann surfaces Римановы поверхности Abelian differentials абелевы дифференциалы

Deformations of the Riemann Hierarchy and the Geometry of ℳg,n

Buryak A., Rossi P., International Mathematics Research Notices 2025 Vol. 2025 No. 20 P. 1–21

The Riemann hierarchy is the simplest example of rank one, (⁠+⁠)-dimensional integrable system of nonlinear evolutionary PDEs. It corresponds to the dispersionless limit of the Korteweg–de Vries hierarchy. In the language of formal variational calculus, we address the classification problem for deformations of the Riemann hierarchy satisfiying different extra requirements (general deformations, deformations as systems ...

Added: November 27, 2025

Метод построения полной бифуркационной картины краевой задачи для нелинейных уравнений в частных производных: применение теоремы Колмогорова-Арнольда

Gromov V., Tomashchuk K., Beschastnov Y. et al., Известия высших учебных заведений. Прикладная нелинейная динамика 2025 Т. 33 № 4 С. 435–465

The purpose of this study is to develop a numerical method for bifurcation analysis of nonlinear partial differential equations, based on the reduction of partial differential equations to ordinary ones, using the Kolmogorov-Arnold theorem. Methods. This paper describes a method for reducing partial differential equations to ordinary ones using the Kolmogorov-Arnold theorem, as well as methods for the ...

Added: February 6, 2025

Quasi-Periodic Solutions of the Universal Hierarchy

Krichever I., Zabrodin A., Annales Henri Poincare. A Journal of Theoretical and Mathematical Physics 2024

We construct quasi-periodic solutions of the universal hierarchy which includes the multi-component KP and Toda hierarchies and show how they fit into the bilinear formalism. The tau-function is expressed in terms of the Riemann theta-function multiplied by exponential function of a quadratic form in the hierarchical times. ...

Added: November 28, 2024

Современные методы теории краевых задач. Понтрягинские чтения — XXXV : материалы Международной Воронежской весенней математической школы (26 – 30 апреля 2024 г.)

Издательский дом ВГУ, 2024.

В сборнике представлены материалы докладов и лекций, включенных в программу Воронежской весенней математической школы, проводимой Воронежским госуниверситетом совместно с Московским государственным университетом им. М. В. Ломоносова, Математическим институтом им. В. А. Стеклова РАН, НОМЦ СОГУ им. К. Л. Хетагурова и АО «Концерн «Созвездие». Тематика охватывает широкий спектр проблем качественной и спектральной теории краевых задач для ...

Added: June 14, 2024

Теорема типа Л. Альфорса для мер Хаусдорфа

Флоринский А. А., Фофанов К. А., Shirokov N. A., Записки научных семинаров ПОМИ РАН 2023 Т. 527 С. 221–241

Suppose that ∆ ⊂ C is a domain, a function f is analytic in ∆, D = f(∆) is viewed as a Riemann surface. We put lR = {z ∈ ∆ : |f(z)| = R}. Let E ⊂ ∆ be a closed set. Put hα,β(r) = r α| ln r| β , 0 < α ...

Added: February 10, 2024

Современные методы теории краевых задач. Понтрягинские чтения - XXXIV

Воронеж: Издательский дом ВГУ, 2023.

В сборнике представлены материалы докладов и лекций, включенных в программу Воронежской весенней математической школы Понтрягинские чтения - XXXIV. Тематика охватывает широкий спектр проблем качественной и спектральной теории дифференциальных уравнений, геометрии и анализа, моделирования, оптимального управления, теории игр и других смежных направлений, преподавания математики. ...

Added: December 15, 2023

Super J -holomorphic curves: construction of the moduli space

Sheshmani A., Kessler E., Yau S., Mathematische Annalen 2022 Vol. 383 No. 3-4 P. 1391–1449

Let M be a super Riemann surface with holomorphic distribution D and N a symplectic manifold with compatible almost complex structure J. We call a map Φ : M→ N a super J-holomorphic curve if its differential maps the almost complex structure on D to J. Such a super J-holomorphic curve is a critical point for the ...

Added: November 2, 2022

Complex Analysis, Riemann Surfaces and Integrable Systems

Natanzon Sergey M., Cham: Springer, 2019.

This book is devoted to classical and modern achievements in complex analysis. In order to benefit most from it, a first-year university background is sufficient; all other statements and proofs are provided. We begin with a brief but fairly complete course on the theory of holomorphic, meromorphic, and harmonic functions. We then present a uniformization theory, ...

Added: January 8, 2020

Возможности и перспективы применения методов искусственного интеллекта для решения краевых задач математической физики в инженерной практике

Yasnitsky L., Гладкий С. Л., Нейрокомпьютеры: разработка, применение 2019 Т. 21 № 2 С. 16–31

The history of evolution of methods for solving boundary value problems of solid mechanics is traced, the comparative analysis of methods from the point of view of reliability of the obtained solutions is carried out. An attempt is made to develop the method of fictitious canonical domains by applying the technology of genetic algorithms. On ...

Added: November 15, 2019

Применение одношаговых методов интегрирования высокого порядка точности для анализа установившихся периодических режимов в интегральных схемах

Гурарий М. М., Жаров М. М., Русаков С. Г. et al., Проблемы разработки перспективных микро- и наноэлектронных систем (МЭС) 2018 № 1 С. 103–108

The application of conventional transient analysis to find the periodic steady-state solution often results in a long simulation time and hence special purpose means are needed. Unlike the transient analysis the periodic steady-state analysis solves a periodic boundary-value problem. The shooting-Newton method transforms the solution of the periodic boundary-value problem to the solution of sequence ...

Added: February 12, 2019

Degenerations, transitions and quantum cohomology

Galkin S., / Series math "arxiv.org". 2018. No. 1809.02737.

Given a singular variety I discuss the relations between quantum cohomology of its resolution and smoothing. In particular, I explain how toric degenerations helps with computing Gromov--Witten invariants, and the role of this story in Fanosearch programme. The challenge is to formulate enumerative symplectic geometry of complex 3-folds in a way suitable for extracting invariants ...

Added: September 25, 2018

Spectral Sequences for Cyclic Homology

Kaledin D., , in: Algebra, Geometry, and Physics in the 21st Century.: Birkhäuser, 2017. P. 99–129.

We prove the non-commutative Hodge-to-de Rham Degeneration Conjecture of Kontsevich and Soibelman. ...

Added: September 13, 2018

Twist-field representations of W-algebras, exact conformal blocks and character identities

Bershtein M., Gavrylenko P., Marshakov A., Journal of High Energy Physics 2018 Vol. 08 No. 108 P. 1–54

We study the twist-field representations of W-algebras and generalize construction of the corresponding vertex operators to D- and B-series. It is shown, how the computation of characters of these representations leads to nontrivial identities involving lattice theta-functions. We also propose a way to calculate their exact conformal blocks, expressing them for D-series in terms of ...

Added: September 11, 2018

FFLV-type monomial bases for type B

Makhlin I., Algebraic Combinatorics 2019 P. 305–322

We present a combinatorial monomial basis (or, more precisely, a family of monomial bases) in every finite-dimensional irreducible so2n+1-module. These bases are in many ways similar to the FFLV bases for types A and C. They are also defined combinatorially via sums over Dyck paths in certain triangular grids. Our sums, however, involve weights depending on the length of ...

Added: August 30, 2018

Комплексный анализ, римановы поверхности и интегрируемые системы

Natanzon S., М.: МЦНМО, 2018.

Книга содержит взаимосвязанные курсы теории функций комплексного переменного, теории гармонических функций, вещественно-аналитической теории пространств модулей римановых поверхностей, классической теории компактных римановых поверхностей, теории иерархий уравнений Кадомцева-Петвиашвили, высших уравнений Кортевега-де-Фриза и их тэта-функциональных решений, а также разработанную в XXI веке теорию, позволяющую явно построить конформное отображение, переводящее произвольную односвязную область с аналитической границей в стандартный единичный ...

Added: May 18, 2018

Moduli Spaces of Higher Spin Klein Surfaces

Natanzon S., Pratoussevitch A., Moscow Mathematical Journal 2017 Vol. 17 No. 2 P. 327–349

We study connected components of the space of higher spin bundles on hyperbolic Klein surfaces. A Klein surface is a generalisation of a Riemann surface to the case of non-orientable surfaces or surfaces with boundary. The category of Klein surfaces is isomorphic to the category of real algebraic curves. An m-spin bundle on a Klein surface is a complex line ...

Added: July 7, 2017

A Fast Direct Algorithm for Implementing a High-Order Finite Element Method on Rectangles as Applied to Boundary Value Problems for the Poisson Equation

Zlotnik A.A., Zlotnik I.A., Doklady Mathematics 2017 Vol. 95 No. 2 P. 129–135

A new fast direct algorithm for implementing a finite element method (FEM) of order on rectangles as applied to boundary value problems for Poisson-type equations is described that extends a well-known algorithm for the case of difference schemes or bilinear finite elements (n = 1). Its core consists of fast direct and inverse algorithms for ...

Added: February 28, 2017

Boundary value problems of fractional Fokker–Planck equations

Aleroev T., Aleroeva H., Huang J. et al., Computers & Mathematics with Applications 2017 Vol. 73 No. 6 P. 959–969

This paper is devoted to solving boundary value problems for important fractional differential equations of the Fokker–Planck family, in particular, to studying fractional differential equation for advection–dispersion. The consideration is carried out by the separation of variables (the Fourier method). Most part of this paper is devoted to justification of this method, to proof of ...

Added: February 9, 2017