Search

Your search keyword '"*GROUPS"' showing total 472 results
Start Over Descriptor "*GROUPS" Category mathematics / group theory
472 results on '"*GROUPS"'

2. Understanding Mathematical Concepts in Physics : Insights From Geometrical and Numerical Approaches

Author

Sanjeev Dhurandhar and Sanjeev Dhurandhar

Subjects
Mathematical physics, Mathematical analysis, Fourier analysis, Topological groups, Lie groups, Differential equations
Abstract

Modern mathematics has become an essential part of today's physicist's arsenal and this book covers several relevant such topics. The primary aim of this book is to present key mathematical concepts in an intuitive way with the help of geometrical and numerical methods - understanding is the key. Not all differential equations can be solved with standard techniques. Examples illustrate how geometrical insights and numerical methods are useful in understanding differential equations in general but are indispensable when extracting relevant information from equations that do not yield to standard methods. Adopting a numerical approach to complex analysis it is shown that Cauchy's theorem, the Cauchy integral formula, the residue theorem, etc. can be verified by performing hands-on computations with Python codes. Figures elucidate the concept of poles and essential singularities. Further the book covers topology, Hilbert spaces, Fourier transforms (discussing how fast Fourier transform works), modern differential geometry, Lie groups and Lie algebras, probability and useful probability distributions, and statistical detection of signals. Novel features include: (i) Topology is introduced via the notion of continuity on the real line which then naturally leads to topological spaces. (ii) Data analysis in a differential geometric framework and a general description of χ2 discriminators in terms of vector bundles. This book is targeted at physics graduate students and at theoretical (and possibly experimental) physicists. Apart from research students, this book is also useful to active physicists in their research and teaching.

Published
2024

3. An Introduction to Automorphic Representations : With a View Toward Trace Formulae

Author

Jayce R. Getz, Heekyoung Hahn, Jayce R. Getz, and Heekyoung Hahn

Subjects
Number theory, Topological groups, Lie groups, Harmonic analysis, Algebraic geometry
Abstract

The goal of this textbook is to introduce and study automorphic representations, objects at the very core of the Langlands Program. It is designed for use as a primary text for either a semester or a year-long course, for the independent study of advanced topics, or as a reference for researchers. The reader is taken from the beginnings of the subject to the forefront of contemporary research. The journey provides an accessible gateway to one of the most fundamental areas of modern mathematics, with deep connections to arithmetic geometry, representation theory, harmonic analysis, and mathematical physics.The first part of the text is dedicated to developing the notion of automorphic representations. Next, it states a rough version of the Langlands functoriality conjecture, motivated by the description of unramified admissible representations of reductive groups over nonarchimedean local fields. The next chapters develop the theory necessary to make the Langlands functoriality conjecture precise. Thus supercuspidal representations are defined locally, cuspidal representations and Eisenstein series are defined globally, and Rankin-Selberg L-functions are defined to give a link between the global and local settings. This preparation complete, the global Langlands functoriality conjectures are stated and known cases are discussed.This is followed by a treatment of distinguished representations in global and local settings. The link between distinguished representations and geometry is explained in a chapter on the cohomology of locally symmetric spaces (in particular, Shimura varieties). The trace formula, an immensely powerful tool in the Langlands Program, is discussed in the final chapters of the book. Simple versions of the general relative trace formulae are treated for the first time in a textbook, and a wealth of related material on algebraic group actions is included. Outlines for several possible courses are provided in the Preface.

Published
2024

4. Positive Energy Representations of Gauge Groups I | Localization

Author

Bas Janssens, Karl-Hermann Neeb, Bas Janssens, and Karl-Hermann Neeb

Subjects
Lie groups, Representations of groups
Abstract

This is the first in a series of papers on projective positive energy representations of gauge groups. Let Ξâ†'M be a principal fiber bundle, and let Γc(M,Ad(Ξ)) be the group of compactly supported (local) gauge transformations. If P is a group of “space–time symmetries” acting on Ξâ†'M, then a projective unitary representation of Γc(M,Ad(Ξ))â‹ŠP is of \textit{positive energy} if every “timelike generator” p0 ∈p gives rise to a Hamiltonian H(p0) whose spectrum is bounded from below. Our main result shows that in the absence of fixed points for the cone of timelike generators, the projective positive energy representations of the connected component Γc(M,Ad(Ξ))0 come from 1-dimensional P-orbits. For compact M this yields a complete classification of the projective positive energy representations in terms of lowest weight representations of affine Kac–Moody algebras. For noncompact M, it yields a classification under further restrictions on the space of ground states. In the second part of this series we consider larger groups of gauge transformations, which contain also global transformations. The present results are used to localize the positive energy representations at (conformal) infinity.

Published
2024

5. Geometry and Topology of Low Dimensional Systems : Chern-Simons Theory with Applications

Author

T. R. Govindarajan, Pichai Ramadevi, T. R. Govindarajan, and Pichai Ramadevi

Subjects
Mathematical physics, Topology, Elementary particles (Physics), Quantum field theory, Topological groups, Lie groups, Associative rings, Associative algebras
Abstract

This book introduces the field of topology, a branch of mathematics that explores the properties of geometric space, with a focus on low-dimensional systems. The authors discuss applications in various areas of physics. The first chapters of the book cover the formal aspects of topology, including classes, homotopic groups, metric spaces, and Riemannian and pseudo-Riemannian geometry. These topics are essential for understanding the theoretical concepts and notations used in the next chapters of the book. The applications encompass defects in crystalline structures, space topology, spin statistics, Braid group, Chern-Simons field theory, and 3D gravity, among others. This self-contained book provides all the necessary additional material for both physics and mathematics students. The presentation is enriched with examples and exercises, making it accessible for readers to grasp the concepts with ease. The authors adopt a pedagogical approach, posing many unsolved questions in simple situations that can serve as challenging projects for students. Suitable for a one-semester postgraduate level course, this text is ideal for teaching purposes.

Published
2024

6. Simple Supercuspidal $L$-Packets of Quasi-Split Classical Groups

Author

Masao Oi and Masao Oi

Subjects
Representations of Lie groups, Local fields (Algebra), p-adic fields, Topological groups, Lie groups--Lie groups--Re, Number theory--Discontinuous groups and automorp, Number theory--Exponential sums and character su
Abstract

View the abstract.

Published
2024

7. Postmodern Fermi Liquids

Author

Umang Mehta and Umang Mehta

Subjects
Quantum statistics, Low temperatures, Mathematical physics, Topological groups, Lie groups, Quantum electrodynamics, Elementary particles (Physics), Quantum field theory
Abstract

This thesis develops a new approach to Fermi liquids based on the mathematical formalism of coadjoint orbits, allowing Landau's Fermi liquid theory to be recast in a simple and elegant way as a field theory. The theory of Fermi liquids is a cornerstone of condensed matter physics with many applications, but efforts to cast Landau's Fermi liquid theory in the modern language of effective field theory suffer from technical and conceptual difficulties: the Fermi surface seems to defy a simple effective field theory description. This thesis reviews the recently-developed formalism for Fermi liquids that exploits an underlying structure described by the group of canonical transformations of a single particle phase space. This infinite-dimensional group governs the space of states of zero temperature Fermi liquids and allows one to write down a nonlinear, bosonized action that reproduces Landau's kinetic theory in the classical limit. The thesis then describes how that Fermi liquid theory can essentially be thought of as a non-trivial representation of the Lie group of canonical transformations, bringing it within the fold of effective theories in many-body physics whose structure is determined by symmetries. After analyzing the benefits and limitations of this geometric formalism, pathways to extensions of the formalism to include superconducting and magnetic phases, as well as applications to the problem of non-Fermi liquids, are discussed. The thesis begins with a pedagogical review of Fermi liquid theory and concludes with a discussion on possible future directions for Fermi surface physics, and more broadly, the usefulness of diffeomorphism groups in condensed matter physics.

Published
2024

8. Differential Geometry and Homogeneous Spaces

Author

Kai Köhler and Kai Köhler

Subjects
Geometry, Differential, Topological groups, Lie groups, Mathematical physics
Abstract

This textbook offers a rigorous introduction to the foundations of Riemannian Geometry, with a detailed treatment of homogeneous and symmetric spaces, as well as the foundations of the General Theory of Relativity. Starting with the basics of manifolds, it presents key objects of differential geometry, such as Lie groups, vector bundles, and de Rham cohomology, with full mathematical details. Next, the fundamental concepts of Riemannian geometry are introduced, paving the way for the study of homogeneous and symmetric spaces. As an early application, a version of the Poincaré–Hopf and Chern–Gauss–Bonnet Theorems is derived. The final chapter provides an axiomatic deduction of the fundamental equations of the General Theory of Relativity as another important application. Throughout, the theory is illustrated with color figures to promote intuitive understanding, and over 200 exercises are provided (many with solutions) to help master the material. The book is designed to cover a two-semester graduate course for students in mathematics or theoretical physics and can also be used for advanced undergraduate courses. It assumes a solid understanding of multivariable calculus and linear algebra.

Published
2024

9. Handbook of Geometry and Topology of Singularities VI: Foliations

Author

Felipe Cano, José Luis Cisneros-Molina, Lê Dũng Tráng, José Seade, Felipe Cano, José Luis Cisneros-Molina, Lê Dũng Tráng, and José Seade

Subjects
Algebraic geometry, Geometry, Differential, Topological groups, Lie groups, Functions of complex variables
Abstract

This is the sixth volume of the Handbook of Geometry and Topology of Singularities, a series which aims to provide an accessible account of the state-of-the-art of the subject, its frontiers, and its interactions with other areas of research. Singularities are ubiquitous in mathematics and science in general, and singularity theory is a crucible where different types of mathematical problems converge, surprising connections are born and simple questions lead to ideas which resonate in other parts of the subject, and in other subjects.This Volume VI goes together with Volume V and focuses on singular holomorphic foliations, which is a multidisciplinary field and a whole area of mathematics in itself. Singular foliations arise, for instance, by considering:The fibers of a smooth map between differentiable manifolds, with singularities at the critical points.The integral lines of a vector field, or the action of a Lie group on a manifold. The singularities are the orbits with special isotropy.The kernel of appropriate 1-forms. The singularities are the zeroes of the form.Open books, which naturally appear in singularity theory, are foliations with singular set the binding.These important examples highlight the deep connections between foliations and singularity theory. This volume consists of nine chapters, authored by world experts, which provide in-depth and reader-friendly introductions to some of the foundational aspects of the theory. These introductions also give insights into important lines of further research. Volume VI ends with an Epilogue by one of the current world leaders in the theory of complex foliations, with plenty of open questions and ideas for further research.The book is addressed to graduate students and newcomers to the theory, as well as to specialists who can use it as a guidebook.

Published
2024

10. Handbook of Geometry and Topology of Singularities V: Foliations

Author

Felipe Cano, José Luis Cisneros-Molina, Lê Dũng Tráng, José Seade, Felipe Cano, José Luis Cisneros-Molina, Lê Dũng Tráng, and José Seade

Subjects
Algebraic geometry, Geometry, Differential, Topological groups, Lie groups, Functions of complex variables
Abstract

This is the fifth volume of the Handbook of Geometry and Topology of Singularities, a series which aims to provide an accessible account of the state-of-the-art of the subject, its frontiers, and its interactions with other areas of research. Singularities are ubiquitous in mathematics and science in general, and singularity theory is a crucible where different types of mathematical problems converge, surprising connections are born and simple questions lead to ideas which resonate in other parts of the subject, and in other subjects. This Volume V focuses on singular holomorphic foliations, which is a multidisciplinary field and a whole area of mathematics in itself. Singular foliations arise, for instance, by considering: The fibers of a smooth map between differentiable manifolds, with singularities at the critical points. The integral lines of a vector field, or the action of a Lie group on a manifold. The singularities are the orbits with special isotropy. The kernel of appropriate 1-forms. The singularities are the zeros of the form. Open books, which naturally appear in singularity theory as foliations with singular set the binding. These important examples highlight the deep connections between foliations and singularity theory. This volume, like its companion Volume VI, also focused on foliations, consists of nine chapters, authored by world experts, which provide in-depth and reader-friendly introductions to some of the foundational aspects of the theory. These introductions also give insights into important lines of further research. The volume starts with a foreword by one of the current world leaders in the theory of complex foliations. The book is addressed to graduate students and newcomers to the theory, as well as to specialists who can use it as a guidebook.

Published
2024

11. Towers and the First-Order Theories of Hyperbolic Groups

Author

Vincent Guirardel, Gilbert Levitt, Rizos Sklinos, Vincent Guirardel, Gilbert Levitt, and Rizos Sklinos

Subjects
Hyperbolic groups, Model theory, Group theory and generalizations--Special aspect, Mathematical logic and foundations--Model theory
Abstract

View the abstract.

Published
2024

12. Women in Numbers Europe IV : Research Directions in Number Theory

Author

Ramla Abdellatif, Valentijn Karemaker, Lejla Smajlovic, Ramla Abdellatif, Valentijn Karemaker, and Lejla Smajlovic

Subjects
Number theory, Algebraic geometry, Topological groups, Lie groups, Group theory, Computer science—Mathematics
Abstract

This volume contains research and expository content based on a wide variety of topics within modern number theory and arithmetic geometry. Research in this volume arises from or is connected with the Women in Numbers Europe (WiNE) IV conference held in summer 2022 in Utrecht, The Netherlands. The contents of this volume are of interest to professional mathematicians, graduate students, and researchers working in number theory, arithmetic geometry, and related areas.

Published
2024

13. Multiscale Multibody Dynamics : Motion Formalism Implementation

Author

Jielong Wang and Jielong Wang

Subjects
Multibody systems, Vibration, Mechanics, Applied, Solids, Topological groups, Lie groups
Abstract

This book presents a novel theory of multibody dynamics with distinct features, including unified continuum theory, multiscale modeling technology of multibody system, and motion formalism implementation. All these features together with the introductions of fundamental concepts of vector, dual vector, tensor, dual tensor, recursive descriptions of joints, and the higher-order implicit solvers formulate the scope of the book's content. In this book, a multibody system is defined as a set consisted of flexible and rigid bodies which are connected by any kinds of joints or constraints to achieve the desired motion. Generally, the motion of multibody system includes the translation and rotation; it is more efficient to describe the motion by using the dual vector or dual tensor directly instead of defining two types of variables, the translation and rotation separately. Furthermore, this book addresses the detail of motion formalism and its finite element implementation of the solid, shell-like, and beam-like structures. It also introduces the fundamental concepts of mechanics, such as the definition of vector, dual vector, tensor, and dual tensor, briefly. Without following the Einstein summation convention, the first- and second-order tensor operations in this book are depicted by linear algebraic operation symbols of row array, column array, and two-dimensional matrix, making these operations easier to understand. In addition, for the integral of governing equations of motion, a set of ordinary differential equations for the finite element-based discrete system, the book discussed the implementation of implicit solvers in detail and introduced the well-developed RADAU IIA algorithms based on post-error estimation to make the contents of the book complete. The intended readers of this book are senior engineers and graduate students in related engineering fields.

Published
2023

14. Generalized Lorenz-Mie Theories

Author

Gérard Gouesbet, Gérard Gréhan, Gérard Gouesbet, and Gérard Gréhan

Subjects
Topological groups, Lie groups, Fluid mechanics, Electrodynamics, Telecommunication
Abstract

This book explores generalized Lorenz–Mie theories when the illuminating beam is an electromagnetic arbitrary shaped beam relying on the method of separation of variables. Although it particularly focuses on the homogeneous sphere, the book also considers other regular particles. It discusses in detail the methods available for evaluating beam shape coefficients describing the illuminating beam. In addition it features applications used in many fields such as optical particle sizing and, more generally, optical particle characterization, morphology-dependent resonances and the mechanical effects of light for optical trapping, optical tweezers and optical stretchers. Furthermore, it provides various computer programs relevant to the content.In the last years many new developments took place so that a new edition became necessary. This new book now incorporates solutions for many more particle shapes and morphologies, various kinds of illuminating beams, and also to mechanical effects of light, whispering-gallery modes and resonances, and optical particle characterization techniques. In addition, the new book considers localized approximations, on the renewal of the finite series technique, on a new categorization of optical forces, and the study of Bessel beams, Mathieu beams, Laguerre-Gauss beams, frozen waves

Published
2023

15. 群と表現 = GROUPS AND REPRESENTATIONS 新装版 (理工系の基礎数学〈新装版〉)

Author

吉川 圭二 and 吉川 圭二

Subjects
Representations of groups, Group theory
Abstract

広く理工学への応用をめざす人のために,群論を初歩から解説する.予備知識は線形代数の初歩程度.前半では視覚的に理解しやすい形で有限群を扱い,後半では連続群,リー代数を扱う.演習問題も物理学で使われる実例から多く選び,有用性が実感できるよう配慮した.表現論とその応用を重視した記述で学ぶ,使える群論.

Published
2023

16. Groups, Invariants, Integrals, and Mathematical Physics : The Wisła 20-21 Winter School and Workshop

Author

Maria Ulan, Stanislav Hronek, Maria Ulan, and Stanislav Hronek

Subjects
Mathematical physics, Group theory, Topological groups, Lie groups, Differential equations, Algebra, Homological
Abstract

This volume presents lectures given at the Wisła 20-21 Winter School and Workshop: Groups, Invariants, Integrals, and Mathematical Physics, organized by the Baltic Institute of Mathematics. The lectures were dedicated to differential invariants – with a focus on Lie groups, pseudogroups, and their orbit spaces – and Poisson structures in algebra and geometry and are included here as lecture notes comprising the first two chapters. Following this, chapters combine theoretical and applied perspectives to explore topics at the intersection of differential geometry, differential equations, and category theory. Specific topics covered include:The multisymplectic and variational nature of Monge-Ampère equations in dimension fourIntegrability of fifth-order equations admitting a Lie symmetry algebraApplications of the van Kampen theorem for groupoids to computation of homotopy types of striped surfacesA geometric framework to compare classical systemsof PDEs in the category of smooth manifoldsGroups, Invariants, Integrals, and Mathematical Physics is ideal for graduate students and researchers working in these areas. A basic understanding of differential geometry and category theory is assumed.

Published
2023

17. Lie Theory and Its Applications in Physics : Sofia, Bulgaria, June 2021

Author

Vladimir Dobrev and Vladimir Dobrev

Subjects
Topological groups, Lie groups, Mathematical physics
Abstract

This volume presents modern trends in the area of symmetries and their applications based on contributions to the Workshop'Lie Theory and Its Applications in Physics'held in Sofia, Bulgaria (on-line) in June 2021.Traditionally, Lie theory is a tool to build mathematical models for physical systems. Recently, the trend is towards geometrization of the mathematical description of physical systems and objects. A geometric approach to a system yields in general some notion of symmetry which is very helpful in understanding its structure. Geometrization and symmetries are meant in their widest sense, i.e., representation theory, algebraic geometry, number theory, infinite-dimensional Lie algebras and groups, superalgebras and supergroups, groups and quantum groups, noncommutative geometry, symmetries of linear and nonlinear partial differential operators, special functions, and others. Furthermore, the necessary tools from functional analysis are included. This is a big interdisciplinary and interrelated field.The topics covered in this Volume are the most modern trends in the field of the Workshop: Representation Theory, Symmetries in String Theories, Symmetries in Gravity Theories, Supergravity, Conformal Field Theory, Integrable Systems, Quantum Computing and Deep Learning, Entanglement, Applications to Quantum Theory, Exceptional quantum algebra for the standard model of particle physics, Gauge Theories and Applications, Structures on Lie Groups and Lie Algebras.This book is suitable for a broad audience of mathematicians, mathematical physicists, and theoretical physicists, including researchers and graduate students interested in Lie Theory.

Published
2023

18. The Structure of Pro-Lie Groups

Author

Karl H. Hofmann, Sidney A. Morris, Karl H. Hofmann, and Sidney A. Morris

Subjects
Lie groups
Abstract

Lie groups were introduced in 1870 by the Norwegian mathematician Sophus Lie. A century later Jean Dieudonné quipped that Lie groups had moved to the center of mathematics and that one cannot undertake anything without them. A pro-Lie group is a complete topological group G in which every identity neighborhood U of G contains a normal subgroup N such that the quotient G/N is a Lie group. Every locally compact connected topological group and every compact group is a pro-Lie group. While the class of locally compact groups is not closed under the formation of arbitrary products, the class of pro-Lie groups is. For half a century, locally compact pro-Lie groups have drifted through the literature, yet this is the first book which systematically treats the Lie theory and the structure theory of pro-Lie groups irrespective of local compactness. So it fits very well into that current trend which addresses infinite dimensional Lie groups. The results of this text are based on a theory of pro-Lie algebras which parallels the structure theory of finite dimensional real Lie algebras to an astonishing degree even though it has to overcome technical obstacles. A topological group is said to be almost connected if the quotient group of its connected components is compact. This book exposes a Lie theory of almost connected pro-Lie groups (and hence of almost connected locally compact groups) and illuminates the variety of ways in which their structure theory reduces to that of compact groups on the one hand and of finite dimensional Lie groups on the other. It is therefore a continuation of the authors'monograph on the structure of compact groups (1998, 2006, 2014, 2020, 2023) and is an invaluable tool for researchers in topological groups, Lie theory, harmonic analysis and representation theory. It is written to be accessible to advanced graduate students wishing to study this fascinating and important area of research, which has so many fruitful interactions with other fields of mathematics.

Published
2023

19. Algebra Without Borders – Classical and Constructive Nonassociative Algebraic Structures : Foundations and Applications

Author

Mahouton Norbert Hounkonnou, Melanija Mitrović, Mujahid Abbas, Madad Khan, Mahouton Norbert Hounkonnou, Melanija Mitrović, Mujahid Abbas, and Madad Khan

Subjects
Proof theory, Nonassociative rings, Algebra, Homological, Topological groups, Lie groups, Differential equations
Abstract

This book gathers invited, peer-reviewed works presented at the 2021 edition of the Classical and Constructive Nonassociative Algebraic Structures: Foundations and Applications—CaCNAS: FA 2021, virtually held from June 30 to July 2, 2021, in dedication to the memory of Professor Nebojša Stevanović (1962-2009). The papers cover new trends in the field, focusing on the growing development of applications in other disciplines. These aspects interplay in the same cadence, promoting interactions between theory and applications, and between nonassociative algebraic structures and various fields in pure and applied mathematics.In this volume, the reader will find novel studies on topics such as left almost algebras, logical algebras, groupoids and their generalizations, algebraic geometry and its relations with quiver algebras, enumerative combinatorics, representation theory, fuzzy logic and foundation theory, fuzzy algebraic structures, group amalgams, computer-aided development and transformation of the theory of nonassociative algebraic structures, and applications within natural sciences and engineering.Researchers and graduate students in algebraic structures and their applications can hugely benefit from this book, which can also interest any researcher exploring multi-disciplinarity and complexity in the scientific realm.

Published
2023

21. Infinite Groups : A Roadmap to Selected Classical Areas

Author

Martyn R. Dixon, Leonid A. Kurdachenko, Igor Ya. Subbotin, Martyn R. Dixon, Leonid A. Kurdachenko, and Igor Ya. Subbotin

Subjects
Infinite groups
Abstract

In recent times, group theory has found wider applications in various fields of algebra and mathematics in general. But in order to apply this or that result, you need to know about it, and such results are often diffuse and difficult to locate, necessitating that readers construct an extended search through multiple monographs, articles, and papers. Such readers must wade through the morass of concepts and auxiliary statements that are needed to understand the desired results, while it is initially unclear which of them are really needed and which ones can be dispensed with. A further difficulty that one may encounter might be concerned with the form or language in which a given result is presented. For example, if someone knows the basics of group theory, but does not know the theory of representations, and a group theoretical result is formulated in the language of representation theory, then that person is faced with the problem of translating this result into the language with which they are familiar, etc. Infinite Groups: A Roadmap to Selected Classical Areas seeks to overcome this challenge. The book covers a broad swath of the theory of infinite groups, without giving proofs, but with all the concepts and auxiliary results necessary for understanding such results. In other words, this book is an extended directory, or a guide, to some of the more established areas of infinite groups.Features An excellent resource for a subject formerly lacking an accessible and in-depth reference Suitable for graduate students, PhD students, and researchers working in group theory Introduces the reader to the most important methods, ideas, approaches, and constructions in infinite group theory.

Published
2023

22. The Classification of the Finite Simple Groups, Number 10

Author

Inna Capdeboscq, Daniel Gorenstein, Richard Lyons, Ronald Solomon, Inna Capdeboscq, Daniel Gorenstein, Richard Lyons, and Ronald Solomon

Subjects
k-groups, Finite simple groups
Abstract

This book is the tenth in a series of volumes whose aim is to provide a complete proof of the classification theorem for the finite simple groups based on a fairly short and clearly enumerated set of background results. Specifically, this book completes our identification of the simple groups of bicharacteristic type begun in the ninth volume of the series (see SURV/40.9). This is a fascinating set of simple groups which have properties in common with matrix groups (or, more generally, groups of Lie type) defined both over fields of characteristic 2 and over fields of characteristic 3. This set includes 11 of the celebrated 26 sporadic simple groups along with several of their large simple subgroups. Together with SURV/40.9, this volume provides the first unified treatment of this class of simple groups.

Published
2023

23. An Introduction to Smooth Manifolds

Author

Manjusha Majumdar, Arindam Bhattacharyya, Manjusha Majumdar, and Arindam Bhattacharyya

Subjects
Geometry, Differential, Global analysis (Mathematics), Manifolds (Mathematics), Topological groups, Lie groups
Abstract

Targeted to graduate students of mathematics, this book discusses major topics like the Lie group in the study of smooth manifolds. It is said that mathematics can be learned by solving problems and not only by just reading it. To serve this purpose, this book contains a sufficient number of examples and exercises after each section in every chapter. Some of the exercises are routine ones for the general understanding of topics. The book also contains hints to difficult exercises. Answers to all exercises are given at the end of each section. It also provides proofs of all theorems in a lucid manner. The only pre-requisites are good working knowledge of point-set topology and linear algebra.

Published
2023

24. A Course on Hopf Algebras

Author

Rinat Kashaev and Rinat Kashaev

Subjects
Associative rings, Associative algebras, Manifolds (Mathematics), Algebras, Linear, Topological groups, Lie groups, Mathematical physics, Algebra, Homological
Abstract

This textbook provides a concise, visual introduction to Hopf algebras and their application to knot theory, most notably the construction of solutions of the Yang–Baxter equations. Starting with a reformulation of the definition of a group in terms of structural maps as motivation for the definition of a Hopf algebra, the book introduces the related algebraic notions: algebras, coalgebras, bialgebras, convolution algebras, modules, comodules. Next, Drinfel'd's quantum double construction is achieved through the important notion of the restricted (or finite) dual of a Hopf algebra, which allows one to work purely algebraically, without completions. As a result, in applications to knot theory, to any Hopf algebra with invertible antipode one can associate a universal invariant of long knots. These constructions are elucidated in detailed analyses of a few examples of Hopf algebras. The presentation of the material is mostly based on multilinear algebra, with all definitions carefully formulated and proofs self-contained. The general theory is illustrated with concrete examples, and many technicalities are handled with the help of visual aids, namely string diagrams. As a result, most of this text is accessible with minimal prerequisites and can serve as the basis of introductory courses to beginning graduate students.

Published
2023

25. Shuffle Approach Towards Quantum Affine and Toroidal Algebras

Author

Alexander Tsymbaliuk and Alexander Tsymbaliuk

Subjects
Mathematical physics, Universal algebra, Topological groups, Lie groups
Abstract

This book is based on the author's mini course delivered at Tokyo University of Marine Science and Technology in March 2019. The shuffle approach to Drinfeld–Jimbo quantum groups of finite type (embedding their'positive'subalgebras into q-deformed shuffle algebras) was first developed independently in the 1990s by J. Green, M. Rosso, and P. Schauenburg. Motivated by similar ideas, B. Feigin and A. Odesskii proposed a shuffle approach to elliptic quantum groups around the same time. The shuffle algebras in the present book can be viewed as trigonometric degenerations of the Feigin–Odesskii elliptic shuffle algebras. They provide combinatorial models for the'positive'subalgebras of quantum affine algebras in their loop realizations. These algebras appeared first in that context in the work of B. Enriquez.Over the last decade, the shuffle approach has been applied to various problems in combinatorics (combinatorics of Macdonald polynomials and Dyck paths, generalization to wreath Macdonald polynomials and operators), geometric representation theory (especially the study of quantum algebras'actions on the equivariant K-theories of various moduli spaces such as affine Laumon spaces, Nakajima quiver varieties, nested Hilbert schemes), and mathematical physics (the Bethe ansatz, quantum Q-systems, and quantized Coulomb branches of quiver gauge theories, to name just a few).While this area is still under active investigation, the present book focuses on quantum affine/toroidal algebras of type A and their shuffle realization, which have already illustrated a broad spectrum of techniques. The basic results and structures discussed in the book are of crucial importance for studying intrinsic properties of quantum affinized algebras and are instrumental to the aforementioned applications.

Published
2023

27. String-Net Construction of RCFT Correlators

Author

Jürgen Fuchs, Christoph Schweigert, Yang Yang, Jürgen Fuchs, Christoph Schweigert, and Yang Yang

Subjects
Mathematical physics, Topological groups, Lie groups, Elementary particles (Physics), Quantum field theory
Abstract

This book studies using string-net models to accomplish a direct, purely two-dimensional, approach to correlators of two-dimensional rational conformal field theories. The authors obtain concise geometric expressions for the objects describing bulk and boundary fields in terms of idempotents in the cylinder category of the underlying modular fusion category, comprising more general classes of fields than is standard in the literature. Combining these idempotents with Frobenius graphs on the world sheet yields string nets that form a consistent system of correlators, i.e. a system of invariants under appropriate mapping class groups that are compatible with factorization. The authors extract operator products of field objects from specific correlators; the resulting operator products are natural algebraic expressions that make sense beyond semisimplicity. They also derive an Eckmann-Hilton relation internal to a braided category, thereby demonstrating the utility of string nets for understanding algebra in braided tensor categories. Finally, they introduce the notion of a universal correlator. This systematizes the treatment of situations in which different world sheets have the same correlator and allows for the definition of a more comprehensive mapping class group.

Published
2023

28. Invertible Fuzzy Topological Spaces

Author

Anjaly Jose, Sunil C. Mathew, Anjaly Jose, and Sunil C. Mathew

Subjects
Topology, Topological groups, Lie groups
Abstract

This book discusses the invertibility of fuzzy topological spaces and related topics. Certain types of fuzzy topological spaces are introduced, and interrelations between them are brought forth. Various properties of invertible fuzzy topological spaces are presented, and characterizations for completely invertible fuzzy topological spaces are discussed. The relationship between homogeneity and invertibility is examined, and, subsequently, the orbits in an invertible fuzzy topological space are studied. The structure of invertible fuzzy topological spaces is investigated, and a clear picture of the inverting pairs in an invertible fuzzy topological space is introduced. Further, the related spaces such as sums, subspaces, simple extensions, quotient spaces, and product spaces of invertible fuzzy topological spaces are examined. In addition, the effect of invertibility on fuzzy topological properties like separation axioms, axioms of countability, compactness, and fuzzy connectedness in invertible fuzzy topological spaces is established. The book sketches ideas extended to the bigger canvas of L-topology in a very interesting manner.

Published
2022

29. Maximal $\textrm

Author

David A. Craven and David A. Craven

Subjects
Exceptional Lie algebras, Maximal subgroups, Lie groups
Abstract

View the abstract.

Published
2022

30. Topological Dynamics of Enveloping Semigroups

Author

Anima Nagar, Manpreet Singh, Anima Nagar, and Manpreet Singh

Subjects
Semigroups, Topological dynamics
Abstract

This book introduces the theory of enveloping semigroups—an important tool in the field of topological dynamics—introduced by Robert Ellis. The book deals with the basic theory of topological dynamics and touches on the advanced concepts of the dynamics of induced systems and their enveloping semigroups. All the chapters in the book are well organized and systematically dealing with introductory topics through advanced research topics. The basic concepts give the motivation to begin with, then the theory, and finally the new research-oriented topics. The results are presented with detailed proof, plenty of examples and several open questions are put forward to motivate for future research. Some of the results, related to the enveloping semigroup, are new to the existing literature. The enveloping semigroups of the induced systems is considered for the first time in the literature, and some new results are obtained. The book has a research-oriented flavour in the field of topological dynamics.

Published
2022

31. Hypergroup Theory

Author

Bijan Davvaz, Violeta Leoreanu-fotea, Bijan Davvaz, and Violeta Leoreanu-fotea

Subjects
Group theory, Hypergroups
Abstract

The book presents an updated study of hypergroups, being structured on 12 chapters in starting with the presentation of the basic notions in the domain: semihypergroups, hypergroups, classes of subhypergroups, types of homomorphisms, but also key notions: canonical hypergroups, join spaces and complete hypergroups. A detailed study is dedicated to the connections between hypergroups and binary relations, starting from connections established by Rosenberg and Corsini. Various types of binary relations are highlighted, in particular equivalence relations and the corresponding quotient structures, which enjoy certain properties: commutativity, cyclicity, solvability.A special attention is paid to the fundamental beta relationship, which leads to a group quotient structure. In the finite case, the number of non-isomorphic Rosenberg hypergroups of small orders is mentioned. Also, the study of hypergroups associated with relations is extended to the case of hypergroups associated to n-ary relations. Then follows an applied excursion of hypergroups in important chapters in mathematics: lattices, Pawlak approximation, hypergraphs, topology, with various properties, characterizations, varied and interesting examples. The bibliography presented is an updated one in the field, followed by an index of the notions presented in the book, useful in its study.

Published
2022

32. New Trends on Analysis and Geometry in Metric Spaces : Levico Terme, Italy 2017

Author

Fabrice Baudoin, Séverine Rigot, Giuseppe Savaré, Nageswari Shanmugalingam, Luigi Ambrosio, Bruno Franchi, Irina Markina, Francesco Serra Cassano, Fabrice Baudoin, Séverine Rigot, Giuseppe Savaré, Nageswari Shanmugalingam, Luigi Ambrosio, Bruno Franchi, Irina Markina, and Francesco Serra Cassano

Subjects
Mathematical optimization, Calculus of variations, Measure theory, Functional analysis, Geometry, Differential, Topological groups, Lie groups
Abstract

This book includes four courses on geometric measure theory, the calculus of variations, partial differential equations, and differential geometry. Authored by leading experts in their fields, the lectures present different approaches to research topics with the common background of a relevant underlying, usually non-Riemannian, geometric structure. In particular, the topics covered concern differentiation and functions of bounded variation in metric spaces, Sobolev spaces, and differential geometry in the so-called Carnot–Carathéodory spaces. The text is based on lectures presented at the 10th School on'Analysis and Geometry in Metric Spaces'held in Levico Terme (TN), Italy, in collaboration with the University of Trento, Fondazione Bruno Kessler and CIME, Italy. The book is addressed to both graduate students and researchers.

Published
2022

33. Groups and Topological Dynamics

Author

Volodymyr Nekrashevych and Volodymyr Nekrashevych

Subjects
Finite groups, Infinite groups, Topological dynamics, Group theory, Groupoids
Abstract

This book is devoted to group-theoretic aspects of topological dynamics such as studying groups using their actions on topological spaces, using group theory to study symbolic dynamics, and other connections between group theory and dynamical systems. One of the main applications of this approach to group theory is the study of asymptotic properties of groups such as growth and amenability. The book presents recently developed techniques of studying groups of dynamical origin using the structure of their orbits and associated groupoids of germs, applications of the iterated monodromy groups to hyperbolic dynamical systems, topological full groups and their properties, amenable groups, groups of intermediate growth, and other topics. The book is suitable for graduate students and researchers interested in group theory, transformations defined by automata, topological and holomorphic dynamics, and theory of topological groupoids. Each chapter is supplemented by exercises of various levels of complexity.

Published
2022

35. Representation Theory and Algebraic Geometry : A Conference Celebrating the Birthdays of Sasha Beilinson and Victor Ginzburg

Author

Vladimir Baranovsky, Nicolas Guay, Travis Schedler, Vladimir Baranovsky, Nicolas Guay, and Travis Schedler

Subjects
Algebraic geometry, Topological groups, Lie groups
Abstract

The chapters in this volume explore the influence of the Russian school on the development of algebraic geometry and representation theory, particularly the pioneering work of two of its illustrious members, Alexander Beilinson and Victor Ginzburg, in celebration of their 60th birthdays. Based on the work of speakers and invited participants at the conference “Interactions Between Representation Theory and Algebraic Geometry”, held at the University of Chicago, August 21-25, 2017, this volume illustrates the impact of their research and how it has shaped the development of various branches of mathematics through the use of D-modules, the affine Grassmannian, symplectic algebraic geometry, and other topics. All authors have been deeply influenced by their ideas and present here cutting-edge developments on modern topics. Chapters are organized around three distinct themes:Groups, algebras, categories, and representation theoryD-modules and perverse sheavesAnalogous varieties defined by quivers Representation Theory and Algebraic Geometry will be an ideal resource for researchers who work in the area, particularly those interested in exploring the impact of the Russian school.

Published
2022

36. Subset currents on surfaces

Author

Dounnu Sasaki and Dounnu Sasaki

Subjects
Hyperbolic groups, Ergodic theory, Fuchsian groups, Riemann surfaces
Abstract

View the abstract.

Published
2022

37. Geometry, Lie Theory and Applications : The Abel Symposium 2019

Author

Sigbjørn Hervik, Boris Kruglikov, Irina Markina, Dennis The, Sigbjørn Hervik, Boris Kruglikov, Irina Markina, and Dennis The

Subjects
Geometry, Topological groups, Lie groups, Geometry, Differential, Global analysis (Mathematics), Manifolds (Mathematics), Gravitation
Abstract

This book consists of contributions from the participants of the Abel Symposium 2019 held in Ålesund, Norway. It was centered about applications of the ideas of symmetry and invariance, including equivalence and deformation theory of geometric structures, classification of differential invariants and invariant differential operators, integrability analysis of equations of mathematical physics, progress in parabolic geometry and mathematical aspects of general relativity.The chapters are written by leading international researchers, and consist of both survey and research articles. The book gives the reader an insight into the current research in differential geometry and Lie theory, as well as applications of these topics, in particular to general relativity and string theory.

Published
2022

38. Topological Groups and the Pontryagin-van Kampen Duality : An Introduction

Author

Lydia Außenhofer, Dikran Dikranjan, Anna Giordano Bruno, Lydia Außenhofer, Dikran Dikranjan, and Anna Giordano Bruno

Subjects
Topological groups
Abstract

This book provides an introduction to topological groups and the structure theory of locally compact abelian groups, with a special emphasis on Pontryagin-van Kampen duality, including a completely self-contained elementary proof of the duality theorem. Further related topics and applications are treated in separate chapters and in the appendix.

Published
2022

39. Analysis and Quantum Groups

Author

Lars Tuset and Lars Tuset

Subjects
Operator theory, Functional analysis, Group theory, Harmonic analysis, Topological groups, Lie groups
Abstract

This volume presents a completely self-contained introduction to the elaborate theory of locally compact quantum groups, bringing the reader to the frontiers of present-day research. The exposition includes a substantial amount of material on functional analysis and operator algebras, subjects which in themselves have become increasingly important with the advent of quantum information theory. In particular, the rather unfamiliar modular theory of weights plays a crucial role in the theory, due to the presence of ‘Haar integrals'on locally compact quantum groups, and is thus treated quite extensively The topics covered are developed independently, and each can serve either as a separate course in its own right or as part of a broader course on locally compact quantum groups. The second part of the book covers crossed products of coactions, their relation to subfactors and other types of natural products such as cocycle bicrossed products, quantum doubles and doublecrossed products. Induced corepresentations, Galois objects and deformations of coactions by cocycles are also treated. Each section is followed by a generous supply of exercises. To complete the book, an appendix is provided on topology, measure theory and complex function theory.

Published
2022

40. New Perspectives in Algebra, Topology and Categories : Summer School, Louvain-la-Neuve, Belgium, September 12-15, 2018 and September 11-14, 2019

Author

Maria Manuel Clementino, Alberto Facchini, Marino Gran, Maria Manuel Clementino, Alberto Facchini, and Marino Gran

Subjects
Nonassociative rings, Algebra, Homological, Topological groups, Lie groups, Algebra, Topology
Abstract

This book provides an introduction to some key subjects in algebra and topology. It consists of comprehensive texts of some hours courses on the preliminaries for several advanced theories in (categorical) algebra and topology. Often, this kind of presentations is not so easy to find in the literature, where one begins articles by assuming a lot of knowledge in the field. This volume can both help young researchers to quickly get into the subject by offering a kind of « roadmap » and also help master students to be aware of the basics of other research directions in these fields before deciding to specialize in one of them. Furthermore, it can be used by established researchers who need a particular result for their own research and do not want to go through several research papers in order to understand a single proof. Although the chapters can be read as « self-contained » chapters, the authors have tried to coordinate the texts in order to make them complementary. The seven chapters of this volume correspond to the seven courses taught in two Summer Schools that took place in Louvain-la-Neuve in the frame of the project Fonds d'Appui à l'Internationalisation of the Université catholique de Louvain to strengthen the collaborations with the universities of Coimbra, Padova and Poitiers, within the Coimbra Group.

Published
2021

41. Locally Mixed Symmetric Spaces

Author

Bruce Hunt and Bruce Hunt

Subjects
Topological groups, Lie groups, Geometry, Differential, Geometry, Hyperbolic
Abstract

What do the classification of algebraic surfaces, Weyl's dimension formula and maximal orders in central simple algebras have in common? All are related to a type of manifold called locally mixed symmetric spaces in this book. The presentation emphasizes geometric concepts and relations and gives each reader the'roter Faden', starting from the basics and proceeding towards quite advanced topics which lie at the intersection of differential and algebraic geometry, algebra and topology.Avoiding technicalities and assuming only a working knowledge of real Lie groups, the text provides a wealth of examples of symmetric spaces. The last two chapters deal with one particular case (Kuga fiber spaces) and a generalization (elliptic surfaces), both of which require some knowledge of algebraic geometry.Of interest to topologists, differential or algebraic geometers working in areas related to arithmetic groups, the book also offers an introduction to the ideas for non-experts.

Published
2021

42. Structure and Regularity of Group Actions on One-Manifolds

Author

Sang-hyun Kim, Thomas Koberda, Sang-hyun Kim, and Thomas Koberda

Subjects
Group theory, Topological groups, Lie groups, Manifolds (Mathematics), Topology, Algebra
Abstract

This book presents the theory of optimal and critical regularities of groups of diffeomorphisms, from the classical work of Denjoy and Herman, up through recent advances. Beginning with an investigation of regularity phenomena for single diffeomorphisms, the book goes on to describes a circle of ideas surrounding Filipkiewicz's Theorem, which recovers the smooth structure of a manifold from its full diffeomorphism group. Topics covered include the simplicity of homeomorphism groups, differentiability of continuous Lie group actions, smooth conjugation of diffeomorphism groups, and the reconstruction of spaces from group actions. Various classical and modern tools are developed for controlling the dynamics of general finitely generated group actions on one-dimensional manifolds, subject to regularity bounds, including material on Thompson's group F, nilpotent groups, right-angled Artin groups, chain groups, finitely generated groups with prescribed critical regularities, and applications to foliation theory and the study of mapping class groups. The book will be of interest to researchers in geometric group theory.

Published
2021

43. The Structure of Groups with a Quasiconvex Hierarchy

Author

Daniel T. Wise and Daniel T. Wise

Subjects
Hyperbolic groups, Group theory
Abstract

This monograph on the applications of cube complexes constitutes a breakthrough in the fields of geometric group theory and 3-manifold topology. Many fundamental new ideas and methodologies are presented here for the first time, including a cubical small-cancellation theory that generalizes ideas from the 1960s, a version of Dehn Filling that functions in the category of special cube complexes, and a variety of results about right-angled Artin groups. The book culminates by establishing a remarkable theorem about the nature of hyperbolic groups that are constructible as amalgams.The applications described here include the virtual fibering of cusped hyperbolic 3-manifolds and the resolution of Baumslag's conjecture on the residual finiteness of one-relator groups with torsion. Most importantly, this work establishes a cubical program for resolving Thurston's conjectures on hyperbolic 3-manifolds, and validates this program in significant cases. Illustrated with more than 150 color figures, this book will interest graduate students and researchers working in geometry, algebra, and topology.

Published
2021

44. Lie Groups

Author

Luiz A. B. San Martin and Luiz A. B. San Martin

Subjects
Lie groups
Abstract

This textbook provides an essential introduction to Lie groups, presenting the theory from its fundamental principles. Lie groups are a special class of groups that are studied using differential and integral calculus methods. As a mathematical structure, a Lie group combines the algebraic group structure and the differentiable variety structure. Studies of such groups began around 1870 as groups of symmetries of differential equations and the various geometries that had emerged. Since that time, there have been major advances in Lie theory, with ramifications for diverse areas of mathematics and its applications.Each chapter of the book begins with a general, straightforward introduction to the concepts covered; then the formal definitions are presented; and end-of-chapter exercises help to check and reinforce comprehension. Graduate and advanced undergraduate students alike will find in this book a solid yet approachable guide that will help them continue their studies with confidence.

Published
2021

45. Symmetries and Applications of Differential Equations : In Memory of Nail H. Ibragimov (1939–2018)

Author

Albert C. J. Luo, Rafail K. Gazizov, Albert C. J. Luo, and Rafail K. Gazizov

Subjects
Symmetry (Mathematics), Lie groups, Differential equations
Abstract

This book is about Lie group analysis of differential equations for physical and engineering problems. The topics include: -- Approximate symmetry in nonlinear physical problems -- Complex methods for Lie symmetry analysis -- Lie group classification, Symmetry analysis, and conservation laws -- Conservative difference schemes -- Hamiltonian structure and conservation laws of three-dimensional linear elasticity -- Involutive systems of partial differential equations This collection of works is written in memory of Professor Nail H. Ibragimov (1939–2018). It could be used as a reference book in differential equations in mathematics, mechanical, and electrical engineering.

Published
2021

46. Topological Dynamics and Topological Data Analysis : IWCTA 2018, Kochi, India, December 9–11

Author

Robert L. Devaney, Kit C. Chan, P.B. Vinod Kumar, Robert L. Devaney, Kit C. Chan, and P.B. Vinod Kumar

Subjects
Dynamical systems, Topological groups, Lie groups, Topology
Abstract

This book collects select papers presented at the International Workshop and Conference on Topology & Applications, held in Kochi, India, from 9–11 December 2018. The book discusses topics on topological dynamical systems and topological data analysis. Topics are ranging from general topology, algebraic topology, differential topology, fuzzy topology, topological dynamical systems, topological groups, linear dynamics, dynamics of operator network topology, iterated function systems and applications of topology. All contributing authors are eminent academicians, scientists, researchers and scholars in their respective fields, hailing from around the world. The book is a valuable resource for researchers, scientists and engineers from both academia and industry.

Published
2021

47. Algebraic Topology

Author

Clark Bray, Adrian Butscher, Simon Rubinstein-Salzedo, Clark Bray, Adrian Butscher, and Simon Rubinstein-Salzedo

Subjects
Algebraic topology, Group theory, Topological groups, Lie groups
Abstract

Algebraic Topology is an introductory textbook based on a class for advanced high-school students at the Stanford University Mathematics Camp (SUMaC) that the authors have taught for many years. Each chapter, or lecture, corresponds to one day of class at SUMaC. The book begins with the preliminaries needed for the formal definition of a surface. Other topics covered in the book include the classification of surfaces, group theory, the fundamental group, and homology. This book assumes no background in abstract algebra or real analysis, and the material from those subjects is presented as needed in the text. This makes the book readable to undergraduates or high-school students who do not have the background typically assumed in an algebraic topology book or class. The book contains many examples and exercises, allowing it to be used for both self-study and for an introductory undergraduate topology course.

Published
2021

48. Relative Trace Formulas

Author

Werner Müller, Sug Woo Shin, Nicolas Templier, Werner Müller, Sug Woo Shin, and Nicolas Templier

Subjects
Number theory, Topological groups, Lie groups, Algebraic geometry
Abstract

A series of three symposia took place on the topic of trace formulas, each with an accompanying proceedings volume. The present volume is the third and final in this series and focuses on relative trace formulas in relation to special values of L-functions, integral representations, arithmetic cycles, theta correspondence and branching laws. The first volume focused on Arthur's trace formula, and the second volume focused on methods from algebraic geometry and representation theory. The three proceedings volumes have provided a snapshot of some of the current research, in the hope of stimulating further research on these topics. The collegial format of the symposia allowed a homogeneous set of experts to isolate key difficulties going forward and to collectively assess the feasibility of diverse approaches.

Published
2021

49. Handbook of Geometry and Topology of Singularities I

Author

José Luis Cisneros Molina, Dũng Tráng Lê, José Seade, José Luis Cisneros Molina, Dũng Tráng Lê, and José Seade

Subjects
Functions of complex variables, Geometry, Projective, Topology, Lie groups, Singularities (Mathematics)--Handbooks, manuals, etc, Geometry, Algebraic, Topological groups
Abstract

This volume consists of ten articles which provide an in-depth and reader-friendly survey of some of the foundational aspects of singularity theory. Authored by world experts, the various contributions deal with both classical material and modern developments, covering a wide range of topics which are linked to each other in fundamental ways. Singularities are ubiquitous in mathematics and science in general. Singularity theory interacts energetically with the rest of mathematics, acting as a crucible where different types of mathematical problems interact, surprising connections are born and simple questions lead to ideas which resonate in other parts of the subject. This is the first volume in a series which aims to provide an accessible account of the state-of-the-art of the subject, its frontiers, and its interactions with other areas of research. The book is addressed to graduate students and newcomers to the theory, as well as to specialists who can use it as a guidebook.

Published
2020

50. Differential Geometry and Lie Groups : A Second Course

Author

Jean Gallier, Jocelyn Quaintance, Jean Gallier, and Jocelyn Quaintance

Subjects
Geometry, Differential, Topological groups, Lie groups, Mathematics—Data processing
Abstract

This textbook explores advanced topics in differential geometry, chosen for their particular relevance to modern geometry processing. Analytic and algebraic perspectives augment core topics, with the authors taking care to motivate each new concept. Whether working toward theoretical or applied questions, readers will appreciate this accessible exploration of the mathematical concepts behind many modern applications.Beginning with an in-depth study of tensors and differential forms, the authors go on to explore a selection of topics that showcase these tools. An analytic theme unites the early chapters, which cover distributions, integration on manifolds and Lie groups, spherical harmonics, and operators on Riemannian manifolds. An exploration of bundles follows, from definitions to connections and curvature in vector bundles, culminating in a glimpse of Pontrjagin and Chern classes. The final chapter on Clifford algebras and Clifford groups draws the book to an algebraic conclusion, which can be seen as a generalized viewpoint of the quaternions.Differential Geometry and Lie Groups: A Second Course captures the mathematical theory needed for advanced study in differential geometry with a view to furthering geometry processing capabilities. Suited to classroom use or independent study, the text will appeal to students and professionals alike. A first course in differential geometry is assumed; the authors'companion volume Differential Geometry and Lie Groups: A Computational Perspective provides the ideal preparation.

Published
2020

Catalog

Books, media, physical & digital resources
See catalog results