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دانلود کتاب Representation Theory, Mathematical Physics, and Integrable Systems: In Honor of Nicolai Reshetikhin
دانلود کتاب تئوری بازنمایی، فیزیک ریاضی و سیستم های یکپارچه: به افتخار نیکولای رشتیخین
مشخصات کتاب
Representation Theory, Mathematical Physics, and Integrable Systems: In Honor of Nicolai Reshetikhin
ویرایش: نویسندگان: Anton Alekseev, Edward Frenkel, Marc Rosso, Ben Webster, Milen Yakimov سری: Progress in Mathematics, 340 ISBN (شابک) : 303078147X, 9783030781477 ناشر: Birkhäuser سال نشر: 2022 تعداد صفحات: 661 [652] زبان: English فرمت فایل : PDF (درصورت درخواست کاربر به PDF، EPUB یا AZW3 تبدیل می شود) حجم فایل: 16 Mb
قیمت کتاب (تومان) : 32,000
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توجه داشته باشید کتاب تئوری بازنمایی، فیزیک ریاضی و سیستم های یکپارچه: به افتخار نیکولای رشتیخین نسخه زبان اصلی می باشد و کتاب ترجمه شده به فارسی نمی باشد. وبسایت اینترنشنال لایبرری ارائه دهنده کتاب های زبان اصلی می باشد و هیچ گونه کتاب ترجمه شده یا نوشته شده به فارسی را ارائه نمی دهد.
توضیحاتی در مورد کتاب تئوری بازنمایی، فیزیک ریاضی و سیستم های یکپارچه: به افتخار نیکولای رشتیخین
نیکولای رشتیخین در طول دوران حرفه ای برجسته خود، در
چندین زمینه از جمله تئوری بازنمایی، سیستم های ادغام پذیر، و
توپولوژی، مشارکت های پیشگامانه ای داشته است. فصول این جلد -
که به مناسبت شصتمین سالگرد تولد او گردآوری شده است - توسط
ریاضیدانان و فیزیکدانان برجسته نوشته شده است و به
دستاوردهای بسیار مهم و ماندگار او ادای احترام می
کند.
این جلد با پوشش آخرین پیشرفتها در رابط جبر
غیرجابهجایی، هندسه دیفرانسیل و جبری، و دیدگاههای برخاسته
از فیزیک، به بررسی موضوعاتی مانند توسعههای جدید و متغیرهای
قدرتمند گره، دیدگاههای جدید در مورد هندسه شمارشی و نظریه
ریسمان، و معرفی جبر خوشهای و تکنیکهای طبقهبندی در طیف
وسیعی از حوزهها. فصلها همچنین کاربردهای جدید نظریه
بازنمایی در نظریه ماتریس تصادفی، مدلهای دقیقاً قابل حل در
مکانیک آماری، و سلسلهمراتب قابل ادغام را پوشش خواهند داد.
پیشرفت اخیر در جنبه های ریاضی و فیزیکی مقوله های
کوانتیزاسیون تغییر شکل و تانسور نیز مورد توجه قرار گرفته
است. i> برای طیف وسیعی از ریاضیدانان علاقه مند به این
حوزه ها و ارتباطات بین آنها، از دانشجویان فارغ التحصیل
گرفته تا پژوهشگران جوان، میانسال، و ارشد، جالب خواهد
بود.
توضیحاتی درمورد کتاب به خارجی
Over the course of his distinguished career, Nicolai
Reshetikhin has made a number of groundbreaking
contributions in several fields, including representation
theory, integrable systems, and topology. The
chapters in this volume – compiled on the occasion of his
60th birthday – are written by distinguished mathematicians
and physicists and pay tribute to his many significant and
lasting achievements.
Covering the latest developments at the interface of
noncommutative algebra, differential and algebraic
geometry, and perspectives arising from physics, this
volume explores topics such as the development of new and
powerful knot invariants, new perspectives on enumerative
geometry and string theory, and the introduction of cluster
algebra and categorification techniques into a broad range
of areas. Chapters will also cover novel applications of
representation theory to random matrix theory, exactly
solvable models in statistical mechanics, and integrable
hierarchies. The recent progress in the mathematical and
physicals aspects of deformation quantization and tensor
categories is also addressed.
Representation Theory, Mathematical Physics, and
Integrable Systems will be of interest to a wide
audience of mathematicians interested in these areas and
the connections between them, ranging from graduate
students to junior, mid-career, and senior
researchers.
فهرست مطالب
Preface 1 Quantum Groups 2 Quantum Integrable Systems 3 Topology 4 Representation Theory and Combinatorics 5 Poisson Algebras, BV Theory, and Quantization 6 Other Works References Contents Examples of Finite-Dimensional Pointed Hopf Algebras in Positive Characteristic 1 Introduction 1.1 Overview 1.2 The Main Result 1.3 Contents of the Paper 2 Preliminaries 2.1 Conventions 2.2 Yetter-Drinfeld Modules 2.3 Nichols Algebras 3 Blocks 3.1 The Jordan Plane 3.2 The Super Jordan Plane 3.3 Realizations 3.4 Exhaustion in Rank 2 4 One Block and One Point 4.1 The Setting and the Statement 4.2 Weak Interaction 4.3 The Presentation by Generators and Relations 4.3.1 The Nichols Algebra B (L( 1, G )) 4.3.2 The Nichols Algebra B (L( -1, G )) 4.3.3 The Nichols Algebra B (L-( 1, G )) 4.3.4 The Nichols Algebra B (L-( -1, G )) 4.3.5 The Nichols Algebra B (L( ω, 1)) 4.4 Mild Interaction 4.5 Realizations 5 One Block and Several Points 5.1 The Setting and the Main Result 5.2 The Presentation of the Nichols Algebras 5.2.1 The Nichols Algebra B (L(A(1"026A30C 0)1; r)), rGN, N≥3 5.2.2 The Nichols Algebra B (L(A(1"026A30C 0)2; ω)) 5.2.3 The Nichols Algebra B (L(A(1"026A30C 0)3; ω)) 5.2.4 The Nichols Algebra B (L(A(2"026A30C 0)1; ω)) 5.2.5 The Nichols Algebra B (L(D(2"026A30C 1); ω)) 5.2.6 The Nichols Algebra B (L(A2, 2)) 5.2.7 The Nichols Algebra B (L(Aθ- 1)) 5.3 Realizations 6 Several Blocks, One Point 6.1 Realizations 7 A Pale Block and a Point 7.1 The Block Has ε= 1 7.2 The Block Has ε= -1 7.2.1 Case 1: q"0365q12 = 1 7.2.2 Case 2: q"0365q12=-1 7.3 Realizations References Poisson Vertex Algebra Cohomology and Differential Harrison Cohomology 1 Introduction 2 Differential Harrison Cohomology Complex 2.1 Hochschild Cohomology Complex 2.2 Monotone Permutations 2.3 Differential Harrison Cohomology Complex 3 The Classical Operad and PVA Cohomology 3.1 Symmetric Group Actions 3.2 Composition of Permutations and Shuffles 3.3 n-Graphs 3.4 Lie Conformal Algebras and Poisson Vertex Algebras 3.5 Operads 3.6 The Z-graded Lie Superalgebra Associated with an Operad 3.7 The Classical Operad Pcl BDSHK19 3.8 PVA Cohomology BDSHK19 4 Relation Between PVA and Differential Harrison Cohomology Complexes 4.1 Main Theorem 4.2 Lines 4.3 Connected Lines 4.4 Relation Between the Symmetry Property and Harrison's Conditions 4.5 Relation Between `3́9`42`"̇613A``45`47`"603AadX and the Hochschild Differential 4.6 Proof of Theorem 4.1 References Theta Invariants of Lens Spaces via the BV-BFV Formalism 1 Introduction 2 Perturbative Quantization of Chern-Simons Theory 2.1 Chern-Simons Theory 2.2 Perturbative Quantization of Gauge Theories 2.3 Perturbative Chern-Simons Theory and Invariants of 3-Manifolds and Links 3 Review of BV-BFV Quantization 3.1 BV Formalism 3.1.1 Effective Action and Residual Fields 3.2 BV-BFV Extension on Manifolds with Boundary 3.2.1 Classical Case 3.2.2 Quantization 4 Split Chern-Simons Theory on the Solid Torus 4.1 Split Chern-Simons Theory 4.2 Polarization 4.3 Residual Fields and Fluctuations 4.4 Axial Gauge Propagator 4.5 The State 4.5.1 Feynman Graphs and Rules 4.5.2 Regularization 5 Effective Action on the Solid Torus 5.1 Zero-Point Contribution 5.2 One-Point Contribution 5.2.1 Possible Diagrams 5.2.2 baa Term 5.2.3 baα Term 5.2.4 bαα Term 5.2.5 aαα Term 5.2.6 ααα Term 5.3 2-Point Tree Contribution 5.4 Loop Diagrams 5.4.1 Regularization 5.4.2 Evaluation 6 Gluing of Lens Spaces 6.1 Lens Spaces 6.2 Gluing Perturbative Expansions in BV-BFV 6.3 The Effective Action on M2 6.4 Reducing the Residual Fields 6.4.1 Case p≠0 6.4.2 The Case p=0 7 The Effective Action on Lens Spaces 7.1 Case of a Manin Triple 7.1.1 Pairing Against Order 0 Diagram 7.1.2 Pairing the 1-Point Functions 7.1.3 Reducing the Residual Fields 7.2 The General Case 7.3 Weights of Oriented Theta Graphs on Lens Spaces 7.3.1 Low-Order Diagrams on Rational Homology Spheres 7.3.2 Lens Spaces 8 Comparing to Existing Results 8.1 Kuperberg-Thurston-Lescop Theta Invariants 8.2 Comparison with Weights of Oriented Theta Graphs 9 Conclusions and Outlook References Generalized Demazure Modules and Prime Representations in Type Dn 1 Introduction 2 Generalized Demazure Modules 2.1 The Simple Lie Algebra of Type Dn 2.2 The Affine Lie Algebra Dn1 2.3 Highest Weight Modules and Demazure Modules 2.4 Generalized Demazure Modules 2.5 A Presentation of Stable Demazure Modules 2.6 Stable Generalized Demazure Modules 2.7 The Modules V(λ,μ) 2.8 Interlacing Weights 2.9 The Main Theorem 2.10 A First Reduction 2.11 The Root βλ 2.12 The Second Reduction 2.13 Proof of Theorem 2.2 2.14 Proof of Theorem 2.2, the Final Step 2.15 A Character Formula 3 Proof of Propositions 2.1 and 2.2 3.1 Elementary Properties of Interlacing Pairs 3.2 The Set R(λ1,λ2) 3.3 Proof of Proposition 2.1 3.4 The Kernel of ψ 3.5 Proof of Proposition 2.2 3.6 Proof of Proposition 2.2, the Second Step 3.7 Proof of Proposition 2.2, the Final Step 4 Connection with the Representation Theory of Quantum Affine Algebras 4.1 A Multiplicative Monoid of Weights 4.2 Prime Representations 4.3 Graded Limits 4.4 The Connection with the Category Cξ References Cylindric Rhombic Tableaux and the Two-Species ASEP on a Ring 1 Introduction 2 The ASEP on a Ring 3 Probabilities for the Two-Species ASEP Using Cylindric Rhombic Tableaux 4 Formulas for Macdonald Polynomials Using Cylindric Rhombic Tableaux 5 The Matrix Ansatz and the Results of Cantini-deGier-Wheeler 6 The Proofs of Theorems 3.17 and 4.9 6.1 Relations Among the Matrices from Definition 5.1 6.2 The Recurrence for Matrix Products 6.3 The Recurrence for Weight Generating Functions of Tableaux 6.4 Symmetries of the Tableaux 7 A Bijection from Cylindric Rhombic Tableaux to Two-Line Queues References Macdonald Operators and Quantum Q-Systems for Classical Types 1 Introduction 2 Q-Systems and Quantum Q-Systems 2.1 Weights and Roots 2.2 The Classical Q-Systems for Untwisted Affine ABCD 2.3 Quantum Q-Systems 3 The AN-1 Case Solution: Generalized Macdonald Difference Operators and Quantum Determinants 3.1 Renormalized Quantum Q-System 3.2 The Quantum Determinant 3.3 The Functional Representation of the Quantum Q-System 3.4 The Spherical Double Affine Hecke Algebra 3.5 Raising and Lowering Operators 3.6 Graded Characters in Terms of Difference Operators 4 The Quantum Q-System Conjectures for Types BCD 4.1 Macdonald and van Diejen Operators 4.2 The q-Whittaker Limit 4.3 Discrete Time Evolution by Adjoint Action of the Gaussian 4.4 Other Macdonald Operators via Quantum Determinants 4.5 The Quantum Q-System Conjectures 5 The Raising/Lowering Operator Conjectures for Types BCD 6 The Graded Character Conjectures for Types BCD 7 Conclusion 7.1 Summary: Macdonald Operators and Quantum Cluster Algebra 7.2 Towards Proving the Conjectures 7.3 sDAHA, EHA and the t-Deformation of Quantum Q-Systems Appendix A: Examples A.1 Weyl-Invariant Schur Functions A.2 The B2 Case A.2.1 M Operators A.2.2 Dual q-Whittaker Functions A.3 The C2 Case A.3.1 The B2C2 Symmetry A.3.2 M Operators A.3.3 Dual q-Whittaker Functions A.4 The sl4 and D3 Cases A.4.1 The sl4D3 Symmetry A.4.2 M Operators A.4.3 Dual q-Whittaker Functions A.5 The D4 Case A.5.1 Symmetries A.5.2 M Operators A.5.3 Dual q-Whittaker Functions References The Meromorphic R-Matrix of the Yangian 1 Introduction 1.1 1.2 1.3 1.4 1.5 1.6 1.7 1.8 1.9 1.10 1.11 1.12 Outline of the Paper 2 The Yangian Y.12em.1emdotteddotteddotted.76dotted.6h(g) 2.1 2.2 The Yangian Y.12em.1emdotteddotteddotted.76dotted.6h(g) drinfeld-yangian-qaffine 2.3 2.4 Alternative Generators of Y0.12em.1emdotteddotteddotted.76dotted.6h(g) 2.5 Shift Automorphism 2.6 PBW Theorem 2.7 The Embedding U(g)Y.12em.1emdotteddotteddotted.76dotted.6h(g) 2.8 Formal Series Filtration 2.9 Rationality 3 The Standard and Drinfeld Coproducts 3.1 Standard Coproduct 3.2 Deformed Drinfeld Tensor Product 3.3 Laurent Expansion of the Deformed Drinfeld Tensor Product 3.4 Deformed Drinfeld Coproduct 4 The Element R-(s) 4.1 4.2 Existence and Uniqueness of R-(s) 4.3 Translation Invariance 4.4 Semiclassical Limit 4.5 Rationality 4.6 Cocycle Equation 4.7 Rank 1 Reduction 4.8 Rank 1 Intertwining Relations 5 The Element R-(s) for sl2 5.1 5.2 5.3 Formula for ω(s,z) 5.4 Formula for ωV1,V2(s,z) 5.5 Formula for R-(s) 6 The Universal and the Meromorphic Abelian R-Matrices of Y.12em.1emdotteddotteddotted.76dotted.6h(g) 6.1 The Endomorphism AV1,V2(s) sachin-valerio-III 6.2 The Meromorphic Abelian R-Matrix of Y.12em.1emdotteddotteddotted.76dotted.6h(g) sachin-valerio-III 6.3 Existence of a Rational Intertwiner 6.4 Non-existence of Rational Commutativity Constraints 6.5 Taylor Expansion of AV1,V2(s) 6.6 Asymptotic Expansion of R0,"3222378 /"3223379 V1,V2(s) 6.7 Properties of R0(s) 6.8 Direct Proof of Theorem 6.7 7 The Universal and the Meromorphic R-Matrices of Y.12em.1emdotteddotteddotted.76dotted.6h(g) 7.1 The Meromorphic R-Matrix 7.2 Existence of a Rational Intertwiner 7.3 Non Existence of Rational Commutativity Constraints 7.4 The Universal R-Matrix 8 Meromorphic Tensor Structures 8.1 Drinfeld Tensor Product 8.2 Standard Tensor Product 8.3 Meromorphic Tensor Structures 9 Relation to the Quantum Loop Algebra Uq(Lg) 9.1 The Functor Γ sachin-valerio-2 9.2 Meromorphic Tensor Structure on Γ sachin-valerio-III 9.3 Tensor Structure with Respect to the Standard Coproducts 9.4 Non Regularity of J"3222378 /"3223379 V1,V2(s) 9.5 The Meromorphic Abelian R-Matrix of Uq(Lg) 9.6 Abelian qDrinfeld–Kohno Theorem 9.7 Meromorphic Braided Tensor Equivalence for Standard Coproducts A Separation of Points A.1 A.2 Reduction Step A.3 A.4 A.5 Proof That J Vanishes B Uniqueness of the Universal R-Matrix B.1 B.2 References On Spectral Cover Equations in Simpson Integrable Systems 1 Introduction 2 Hitchin Integrable Systems 3 Simpson Integrable Systems 4 Spectral Cover via Projective Duality References Peter-Weyl Bases, Preferred Deformations, and Schur-Weyl Duality 1 Introduction 2 Deformations 2.1 Formal Deformations 2.2 Equivalence and Preferred Presentations 2.3 Standard Deformation of U(g) 2.4 Standard Deformation of O(Mn) 3 Peter-Weyl Bases and Preferred Deformations 3.1 The Peter-Weyl Basis 3.2 Comultiplication 3.3 Multiplication (Abstract) 3.4 3j Symbols 3.5 Structure Constants for Multiplication 3.6 Preferred Presentation of O.12em.1emdotteddotteddotted.76dotted.6h(G) 3.7 Preferred Deformation of U(g) 3.8 Non-simply connected Groups and Matrix Algebras 4 Relation to Schur-Weyl Duality 4.1 General Categorical Discussion 4.2 Using Vn, Undeformed 4.3 Using Vn, Deformed 4.4 Preferred Presentation 4.5 Comparing with Previous Work 4.6 Deriving the R-Matrix Relations in Oq(M2) References Quantum Periodicity and Kirillov–Reshetikhin Modules 1 Introduction 2 Periodicity and Quantum Periodicity 2.1 Periodicity 2.2 Quantum Periodicity 3 Finite-Dimensional Representations of Quantum Affine Algebras 3.1 Quantum Affine Algebras 3.2 Finite-Dimensional Representations 3.3 Quantum Grothendieck Ring 4 Relations in the Grothendieck Ring 4.1 Original T-Systems 4.2 Horizontal T-Systems 5 Proof of Periodicity References A Note on the E-Polynomials of a Stratification of the Hilbert Scheme of Points 1 Introduction 2 The Refined Hilbert Schemes 2.1 Definition and Basic Properties 2.2 The Calculation of the E-Polynomial 3 Proof of Theorem 2 4 The E-Polynomial of the Refined Strata H[n]m 5 Euler Characteristics of the Refined Strata Appendix 1: Properties of the E-Polynomial Appendix 2: Tables of E-Polynomials of the Refined Strata References Galois Action on VOA Gauge Anomalies 1 Gauge Anomalies for Associative Algebras 1.1 Azumaya Algebras 1.2 Physical Interpretation 1.3 Construction of Gauge Anomalies 1.4 Gauging 1.5 Galois Action and the Cohomological Brauer Group 2 Gauge Anomalies for VOAs 2.1 Holomorphic VOAs 2.2 Physical Interpretation 2.3 Construction of Gauge Anomalies 2.4 Gauging 2.5 Linear Algebraic Description 3 Main Result 3.1 Recollection on the Cyclotomic Galois Group 3.2 Nonanomalous Actions 3.3 A Construction of Evans and Gannon 3.4 Completion of the Proof 4 Questions and Conjectures 4.1 Moonshine for Every Group 4.2 A Vertex Brauer Group 4.3 K-Theoretic Interpretation of Anomalies 4.4 Galois and Grothendieck–Teichmuller Groups and Modular Data 4.5 Cyclotomicity of MTCs References Heisenberg-Picture Quantum Field Theory 1 Introduction and Motivation 2 Modulation 3 The Point of Pointings 4 Non-affine Field Theory 5 Extended Affine Field Theory 6 Extended Non-Affine Field Theory 7 A (Non-)dualizability Result 8 From Factorization Algebra to Heisenberg-Picture Field Theory 9 From Skein Theory to Heisenberg-Picture Field Theory References Irreducibility of the Wysiwyg Representations of Thompson's Groups 1 Introduction 2 Definitions 3 The Wysiwyg Representations 4 The Main Theorem 5 Improvements References Invariants of Long Knots 1 Introduction 2 Long Knots 3 Invariants of Long Knots from Rigid R-Matrices 4 Rigid R-Matrices from Racks 4.1 Racks Associated with Pointed Groups 4.2 An Extended Heisenberg Group 5 Invariants from Hopf Algebras 5.1 A Hopf Algebra Associated with a Two-Dimensional Lie Group References Rigged Configurations and Unimodality 1 Introduction 1.1 A Bit of History 1.2 Introduction 2 Basic Notation and Definitions 2.1 Polynomials Associated with Configurations of Type (λ,R) 2.2 Formulas for Unimodality Index 3 Main Results 3.1 Generalized Catalan Polynomials 3.2 Some Remarks on Strict Unimodality 3.3 Generalized q-Narayana and Carlitz–Riordan Polynomials 4 Internal Product of Schur Functions 4.1 Liskova Polynomials 4.2 Two-Variable Liskova Polynomials Lαβμ(q,t ) 5 Generalized Exponents and Mixed Tensor Representations 6 Rigged Configurations: A Brief Review 6.1 Example References Turning Point Processes in Plane Partitions with Periodic Weights of Arbitrary Period 1 Introduction 2 Notation and Description of Main Results 3 The Correlation Kernel and Its Leading Asymptotics 3.1 The Asymptotically Leading Term in the Integral for the Correlation Kernel 4 The Point Processes in the Bulk Near the Edge and at the Turning Points 4.1 The Possible Locations of Double Real Critical Points 4.2 Computing the Double Real Critical Points 4.3 The Number of Real and Complex Critical Points 4.4 Deformation of Contours and the Limiting Correlation Kernel in the Bulk 4.5 Deformation of Contours and the Limiting Correlation Kernel Near Turning Points 4.6 The GUE-Corners Process 4.7 The Frozen Regions Separating the Turning Points 5 Point Processes at the First-Order Phase Transition 5.1 The Double Real Critical Points 5.2 The Number of Critical Points References The Skein Category of the Annulus 1 Introduction 2 The Category of Tangle Diagrams 3 The Skein Category of the Annulus 4 Equivalence with the Affine Temperley-Lieb Category 5 The Extended Affine Temperley-Lieb Algebra 6 The Arc Insertion Functor 7 Towers of Extended Affine Temperley-Lieb Algebra Modules 8 The Link Pattern Tower 9 The Link Pattern Tower and Fusion Appendix: Relation to Affine Hecke Algebras and Affine Braid Groups, and type B Presentations References Tensor Product of the Fock Representation with Its Dual and the Deligne Category 1 Introduction 2 The Category RepGL(m|n) and DS Functors 2.1 Translation Functors 2.2 DS-functor 3 The Category Vt, Translation Functors, and Categorification 3.1 The Deligne Category Dt 3.2 The Abelian Envelope of Dt 3.3 Objects of Vt 3.4 Translation Functors and Categorical Action of sl(∞) 4 Proof of the Main Theorem 5 Blocks in Vt and Dimensions of Tilting and Standard Objects References Exact Density Matrix for Quantum Group Invariant Sector of XXZ Model 1 Introduction 2 Matsubara Expectation Values 3 Quantum Group Invariant Operators 3.1 Generalities 3.2 Invariant Operators 4 Procedure of Computation 5 The Case of Unbroken Quantum Group Symmetry 5.1 Relation to SOS/RSOS 6 Numerical Results. Zero Temperature 7 Temperature References Loops in Surfaces and Star-Fillings 1 Introduction 2 Quasi-Surfaces 2.1 Basics 2.2 Loops in X 2.3 Local Moves 3 Homological Intersection Forms 3.1 The Intersection Form of (X, ω) 3.2 The Intersection Form of X 3.3 Proof of Theorem 3.2 3.4 Computation of •X 4 The Intersection Brackets 4.1 The Brackets 4.2 The Pairing μk 4.3 Proof of Theorem 4.2 4.4 Computation of [-,-]X 4.5 Remarks 5 The Cobrackets 5.1 The Cobracket νX,ω 5.2 The Cobracket νX 5.3 Computation of νX 5.4 Examples 6 Transformations of Quasi-Surfaces 6.1 The Transformation D 6.2 The Transformation C 7 Stars in Quasi-Surfaces 7.1 Stars in X 7.2 Star-Fillings of X 8 Proof of Theorems 1.1–1.4 and the Case of Closed Surfaces 8.1 Proof of Theorems 1.1–1.4 8.2 The Case of Closed Surfaces 8.3 Example References
