Your search keyword '"Exponential map (Lie theory)"' showing total 141 results

1. Loop Groups and QNEC

Author

Lorenzo Panebianco

Subjects

Physics, Semidirect product, Pure mathematics, Bekenstein bound, relative entropy, 010102 general mathematics, Null (mathematics), FOS: Physical sciences, Lie group, Statistical and Nonlinear Physics, Mathematical Physics (math-ph), 01 natural sciences, Exponential map (Lie theory), Loop groups, Loop (topology), Loop group, 0103 physical sciences, Simply connected space, positive energy representations, 010307 mathematical physics, 0101 mathematics, Mathematical Physics

Abstract

We construct and study solitonic representations of the conformal net associated to some vacuum Positive Energy Representation (PER) of a loop group LG. For the corresponding solitonic states, we prove the Quantum Null Energy Condition (QNEC) and the Bekenstein Bound. As an intermediate result, we show that a Positive Energy Representation of a loop group LG can be extended to a PER of $$H^{s}(S^1,G)$$ H s ( S 1 , G ) for $$s>3/2$$ s > 3 / 2 , where G is any compact, simple and simply connected Lie group. We also show the existence of the exponential map of the semidirect product $$LG \rtimes R$$ L G ⋊ R , with R a one-parameter subgroup of $$\mathrm{Diff}_+(S^1)$$ Diff + ( S 1 ) , and we compute the adjoint action of $$H^{s+1}(S^1,G)$$ H s + 1 ( S 1 , G ) on the stress energy tensor.

Published

2021

2. New Parameterizations of \(\mathrm{SL}(2,\mathbb{R})\) and Some Explicit Formulas for Its Logarithm

Author

Clementina D. Mladenova, Ivaïlo M. Mladenov, and Tihomir Valchev

Subjects

Physics, Combinatorics, Logarithm, Lie group, Field (mathematics), Geometry and Topology, Ellipse, Exponential map (Lie theory), Mathematical Physics

Abstract

Here we demonstrate some of the benefits of a novel parameterization of the Lie groups $\mathrm{Sp}(2,\mathbb{R}) ≅ \mathrm{SL}(2,\mathbb{R})$. Relying on the properties of the exponential map $\mathfrak{sl}(2,\mathbb{R}) \rightarrow \mathrm{SL}(2,\mathbb{R})$, we have found a few explicit formulas for the logarithm of the matrices in these groups. Additionally, the explicit analytic description of the ellipse representing their field of values is derived and this allows a direct graphical identification of various types.

Published

2021

3. An Introduction to Lie Groups

Author

Amor Hasić

Subjects

Algebra, Symplectic group, First language, Lie algebra, Special linear group, General Engineering, Energy Engineering and Power Technology, Lie group, General linear group, Exponential map (Lie theory), Unitary state, Mathematics

Abstract

This paper is made out of necessity as a doctoral student taking the exam from Lie groups. Using the literature suggested to me by the professor, I felt the need to, in addition to that literature, and since there was more superficial in that book with some remarks about the examples given in relation to the left group. I decided to try a little harder and collect as much literature as possible, both for the needs of me and the others who will take after me. Searching for literature in my mother tongue I could not find anything, in English as someone who comes from a small country like Montenegro, all I could find was through the internet. I decided to gather what I could find from the literature in my own way and to my observation and make this kind of work. The main content of this paper is to present the Lie group in the simplest way. Before and before I started writing or collecting about Lie groups, it was necessary to say something about groups and subgroups that are taught in basic studies in algebra. In them I cited several deficits and an example. The following content of the paper is related to Lie groups primarily concerning the definition of examples such as The General Linear Group GL(n, R), The Complex General Linear Group GL(n, C), The Special Linear Group SL(n, R)=SL(V), The Complex Special Linear Group SL(n, C), Unitary and Orthogonal Groups, Symplectic Group, The groups R*, C*, S1 and Rn and others. In addition, invariant vector fields and the exponential map and the lie algebra of a lie group. For me, this work has the significance of being useful to all who need it.

Published

2020

4. Quasi‐shuffle algebras and renormalisation of rough differential equations

Author

Yvain Bruned, Kurusch Ebrahimi-Fard, and Charles Curry

Subjects

Pure mathematics, Rough path, Formal power series, General Mathematics, Probability (math.PR), 010102 general mathematics, Substitution (algebra), Automorphism, Hopf algebra, 01 natural sciences, Exponential map (Lie theory), Bialgebra, Mathematics - Classical Analysis and ODEs, Mathematics::Quantum Algebra, Classical Analysis and ODEs (math.CA), FOS: Mathematics, Isomorphism, 0101 mathematics, Mathematics - Probability, Mathematics

Abstract

The objective of this work is to compare several approaches to the process of renormalisation in the context of rough differential equations using the substitution bialgebra on rooted trees known from backward error analysis of $B$-series. For this purpose, we present a so-called arborification of the Hoffman--Ihara theory of quasi-shuffle algebra automorphisms. The latter are induced by formal power series, which can be seen to be special cases of the cointeraction of two Hopf algebra structures on rooted forests. In particular, the arborification of Hoffman's exponential map, which defines a Hopf algebra isomorphism between the shuffle and quasi-shuffle Hopf algebra, leads to a canonical renormalisation that coincides with Marcus' canonical extension for semimartingale driving signals. This is contrasted with the canonical geometric rough path of Hairer and Kelly by means of a recursive formula defined in terms of the coaction of the substitution bialgebra.

Published

2019

5. Polynomial Cohomology and Polynomial Maps on Nilpotent Groups

Author

Henrik Densing Petersen and David Kyed

Subjects

Pure mathematics, Polynomial, Group (mathematics), General Mathematics, Group cohomology, 010102 general mathematics, Lie group, Group Theory (math.GR), 01 natural sciences, Exponential map (Lie theory), Cohomology, Nilpotent, 0103 physical sciences, Simply connected space, FOS: Mathematics, 010307 mathematical physics, 0101 mathematics, Mathematics - Group Theory, Mathematics

Abstract

We introduce a refined version of group cohomology and relate it to the space of polynomials on the group in question. We show that the polynomial cohomology with trivial coefficients admits a description in terms of ordinary cohomology with polynomial coefficients, and that the degree one polynomial cohomology with trivial coefficients admits a description directly in terms of polynomials. Lastly, we give a complete description of the polynomials on a connected, simply connected nilpotent Lie group by showing that these are exactly the maps that pull back to classical polynomials via the exponential map., v3: minor changes; to appear in Glasgow Mathematical Journal. v2: significant changes compared to v1; the result on quasi-isometry classification of csc nilpotent Lie groups removed due to a flaw in the proof

Published

2019

6. Exponential-Wrapped Distributions on $$\text {SL}(2,\mathbb {C})$$ and the Möbius Group

Author

Emmanuel Chevallier

Subjects

010302 applied physics, Pure mathematics, Group (mathematics), Isotropy, Killing form, 01 natural sciences, Exponential map (Lie theory), Exponential function, symbols.namesake, 0103 physical sciences, Jacobian matrix and determinant, symbols, Probability distribution, 010306 general physics, Mathematics, Möbius transformation

Abstract

In this paper we discuss the construction of probability distributions on the group \(\text {SL}(2,\mathbb {C})\) and the Mobius group using the exponential map. In particular, we describe the injectivity and surjectivity domains of the exponential map and provide its Jacobian determinant. We also show that on \(\text {SL}(2,\mathbb {C})\) and the Mobius group, there are no isotropic distributions in the group sense.

Published

2021

7. Local convexity for second order differential equations on a Lie algebroid

Author

David Martín de Diego, Juan Carlos Marrero, Eduardo Martínez, Ministerio de Ciencia e Innovación (España), and Instituto Universitario de Matemáticas y Aplicaciones (España)

Subjects

Mathematics - Differential Geometry, Lie algebroid, Pure mathematics, Control and Optimization, Differential equation, Applied Mathematics, Order (ring theory), FOS: Physical sciences, Mathematical Physics (math-ph), Exponential map (Lie theory), Convexity, Lie groupoid, Second order differential equations, Quadratic equation, Differential Geometry (math.DG), Mathematics - Classical Analysis and ODEs, Mechanics of Materials, Classical Analysis and ODEs (math.CA), FOS: Mathematics, Geometry and Topology, 34A26, 17B66, 22A22, 34B15, Mathematical Physics, Mathematics

Abstract

A theory of local convexity for a second order differential equation (sode) on a Lie algebroid is developed. The particular case when the sode is homogeneous quadratic is extensively discussed., JCM acknowledges financial support from the IUMA (University of Zaragoza, Spain) and the Spanish Ministry of Science and Innovation under grant PGC2018-098265-B-C32. D. Martín de Diego acknowledges financial support from the Spanish Ministry of Science and Innovation, under grant PID2019-106715GB-C21 and from the Spanish Ministry of Science and Innovation, through the \"Severo Ochoa Programme for Centres of Excellence in R&D\" (CEX2019-000904-S). EMF acknowledges nancial support from the Spanish Ministry of Science and Innovation under grant PGC2018-098265-B-C31.

Published

2021

8. Lie Groups and Lie Algebras

Author

A B Luiz and San Martin

Subjects

Pure mathematics, Lie bracket of vector fields, Lie algebra, Lie group, Vector field, Invariant (mathematics), Space (mathematics), Link (knot theory), Exponential map (Lie theory), Mathematics

Abstract

The objective of this chapter is to introduce the concepts of Lie groups and their Lie algebras. The Lie algebra \(\mathfrak {g}\) of a Lie group G is defined as the space of invariant vector fields (left or right, depending on choice), with bracket given by the Lie bracket of vector fields. The flows of invariant vector fields establish the exponential map \(\exp :\mathfrak {g}\rightarrow G\), which is the main link between \(\mathfrak {g}\) and G. These constructions make exhaustive use of results about vector fields on manifolds and their Lie brackets. A short collection of such results can be found in Appendix A. Adjoint representations are another tool for linking Lie groups and their Lie algebras. The formulas involving such representations are developed in this chapter. They are used along the whole theory.

Published

2021

9. Towards functor exponentiation

Author

Yin Tian and Mikhail Khovanov

Subjects

Pure mathematics, Exponentiation, Categorification, 01 natural sciences, law.invention, symbols.namesake, law, Mathematics::Quantum Algebra, Mathematics::Category Theory, Tensor (intrinsic definition), Mathematics - Quantum Algebra, 0103 physical sciences, FOS: Mathematics, Taylor series, Quantum Algebra (math.QA), Representation Theory (math.RT), 0101 mathematics, Mathematics::Representation Theory, Mathematics, Algebra and Number Theory, Functor, Generator (category theory), 010102 general mathematics, Exponential map (Lie theory), Invertible matrix, symbols, 010307 mathematical physics, Mathematics - Representation Theory

Abstract

We consider a possible framework to categorify the exponential map exp(-f) given the categorification of a generator f of $\frak{sl}_2$ by Lauda. In this setup the Taylor expansions of exp(-f) and exp(f) turn into complexes built out of categorified divided powers of f. Hom spaces between tensor powers of categorified f are given by diagrammatics combining nilHecke algebra relations with those for a additional "short strand" generator. The proposed framework is only an approximation to categorification of exponentiation, because the functors categorifying exp(f) and exp(-f) are not invertible., 27 pages

Published

2018

10. UNIVERSAL COVERS OF COMMUTATIVE FINITE MORLEY RANK GROUPS

Author

Anand Pillay, Bradd Hart, and Martin Bays

Subjects

Abelian variety, Pure mathematics, Kummer theory, Covering space, General Mathematics, 010102 general mathematics, Structure (category theory), Morley rank, 01 natural sciences, Exponential map (Lie theory), 0103 physical sciences, 010307 mathematical physics, Isomorphism, 0101 mathematics, Commutative property, Mathematics

Abstract

We give an algebraic description of the structure of the analytic universal cover of a complex abelian variety which suffices to determine the structure up to isomorphism. More generally, we classify the models of theories of ‘universal covers’ of rigid divisible commutative finite Morley rank groups.

Published

2018

11. On exponential of split quaternionic matrices

Author

Melek Erdoğdu and Mustafa Özdemir

Subjects

Hamiltonian matrix, Quaternion algebra, Applied Mathematics, 010103 numerical & computational mathematics, 01 natural sciences, Exponential map (Lie theory), Algebra, Computational Mathematics, Matrix (mathematics), Logarithm of a matrix, 0103 physical sciences, Skew-symmetric matrix, 010307 mathematical physics, Matrix exponential, 0101 mathematics, Pascal matrix, Mathematics

Abstract

The exponential of a matrix plays an important role in the theory of Lie groups. The main purpose of this paper is to examine matrix groups over the split quaternions and the exponential map from their Lie algebras into the groups. Since the set of split quaternions is a noncommutative algebra, the way of computing the exponential of a matrix over the split quaternions is more difficult than calculating the exponential of a matrix over the real or complex numbers. Therefore, we give a method of finding exponential of a split quaternion matrix by its complex adjoint matrix.

Published

2017

12. Finite and infinite dimensional Lie group structures on Riordan groups

Author

Manuel A. Morón, Gi-Sang Cheon, Ana Luzón, L. Felipe Prieto-Martinez, and Minho Song

Subjects

Pure mathematics, Mathematics::Combinatorics, General Mathematics, Simple Lie group, 010102 general mathematics, Adjoint representation, Lie group, 010103 numerical & computational mathematics, 01 natural sciences, Exponential map (Lie theory), Representation theory, Graded Lie algebra, Combinatorics, Representation of a Lie group, Lie algebra, 0101 mathematics, Mathematics

Abstract

We introduce a Frechet Lie group structure on the Riordan group. We give a description of the corresponding Lie algebra as a vector space of infinite lower triangular matrices. We describe a natural linear action induced on the Frechet space K N by any element in the Lie algebra. We relate this to a certain family of bivariate linear partial differential equations. We obtain the solutions of such equations using one-parameter groups in the Riordan group. We show how a particular semidirect product decomposition in the Riordan group is reflected in the Lie algebra. We study the stabilizer of a formal power series under the action induced by Riordan matrices. We get stabilizers in the fraction field K ( ( x ) ) using bi-infinite representations. We provide some examples. The main tool to get our results is the paper [18] where the Riordan group was described using inverse sequences of groups of finite matrices.

Published

2017

13. Deep Compositing Using Lie Algebras

Author

DuffTom

Subjects

Theoretical computer science, Computer science, 020207 software engineering, 010103 numerical & computational mathematics, 02 engineering and technology, 01 natural sciences, Computer Graphics and Computer-Aided Design, Exponential map (Lie theory), Alpha (programming language), Simple (abstract algebra), Compositing, Lie algebra, 0202 electrical engineering, electronic engineering, information engineering, 0101 mathematics

Abstract

Deep compositing is an important practical tool in creating digital imagery, but there has been little theoretical analysis of the underlying mathematical operators. Motivated by finding a simple formulation of the merging operation on OpenEXR -style deep images, we show that the Porter-Duff over function is the operator of a Lie group. In its corresponding Lie algebra, the splitting and mixing functions that OpenEXR deep merging requires have a particularly simple form. Working in the Lie algebra, we present a novel, simple proof of the uniqueness of the mixing function. The Lie group structure has many more applications, including new, correct resampling algorithms for volumetric images with alpha channels, and a deep image compression technique that outperforms that of OpenEXR .

Published

2017

14. Class group of the ring of invariants of an exponential map on an affine normal domain

Author

S M Bhatwadekar and J T Majithia

Subjects

Combinatorics, Physics, Ring (mathematics), Group (mathematics), General Mathematics, Domain (ring theory), Field of fractions, Field (mathematics), Group homomorphism, Exponential map (Lie theory), Injective function

Abstract

Let k be a field and let B be an affine normal domain over k. Let $$\phi $$ be a non-trivial exponential map on B and let $$A = B^{\phi }$$ be the ring of $$\phi $$ -invariants. Since A is factorially closed in B, $$A = K \cap B$$ where K denotes the field of fractions of A. Hence A is a Krull domain. We investigate here a relation between the class group $$\mathrm{Cl}(A)$$ of A and the class group $$\mathrm{Cl}(B)$$ of B. In this direction, we give a sufficient condition for an injective group homomorphism from $$\mathrm{Cl}(A)$$ to $$\mathrm{Cl}(B)$$ . We also give an example to show that $$\mathrm{Cl}(A)$$ may not be realized as a subgroup of $$\mathrm{Cl}(B)$$ .

Published

2020

15. Lie Groups, Lie Algebras, and the Exponential Map

Author

Jean Gallier and Jocelyn Quaintance

Subjects

Combinatorics, Matrix group, Lie algebra, Lie group, Exponential map (Lie theory), Mathematics

Abstract

In Chapter 4 we defined the notion of a Lie group as a certain type of manifold embedded in \({\mathbb {R}}^N\), for some N ≥ 1. Now that we have the general concept of a manifold, we can define Lie groups in more generality. If every Lie group was a linear group (a group of matrices), then there would be no need for a more general definition. However, there are Lie groups that are not matrix groups, although it is not a trivial task to exhibit such groups and to prove that they are not matrix groups.

Published

2020

16. BDF integrators for constrained mechanical systems on Lie groups

Author

Victoria Wieloch and Martin Arnold

Subjects

Applied Mathematics, Lie group, 010103 numerical & computational mathematics, Multibody system, 01 natural sciences, Exponential map (Lie theory), 010101 applied mathematics, Computational Mathematics, Nonlinear system, Flow (mathematics), Integrator, Applied mathematics, Configuration space, 0101 mathematics, Representation (mathematics), Mathematics

Abstract

Multistep methods of BDF type are the method-of-choice in several industrial multibody system simulation packages. In the present paper, BDF is applied to constrained systems in nonlinear configuration spaces with Lie group structure that allows, e.g., a representation of multibody systems with large rotations without singularities. The k -step Lie group integrator BLieDF avoids order reduction by a slightly perturbed argument of the exponential map for representing the nonlinearity of the numerical flow in the configuration space without any time-consuming re-parametrization. This integrator is compared with multistep methods on Lie groups suggested by Faltinsen, Marthinsen and Munthe-Kaas (2001) and the advantages of the novel BLieDF integrator are shown.

Published

2021

17. The Spin group in superspace

Author

Hennie De Schepper, Frank Sommen, and Alí Guzmán Adán

Subjects

Pure mathematics, Spin group, FOS: Physical sciences, General Physics and Astronomy, Group Theory (math.GR), 01 natural sciences, 30G35, 22E60, 0103 physical sciences, Lie algebra, Symplectic groups, FOS: Mathematics, 0101 mathematics, Exterior algebra, Clifford analysis, Mathematical Physics, Mathematics, Group (mathematics), 010102 general mathematics, Superspace, Mathematical Physics (math-ph), Rotation matrix, Exponential map (Lie theory), Mathematics and Statistics, Bivectors, 010307 mathematical physics, Geometry and Topology, Spin groups, Mathematics - Group Theory, INTEGRATION, Supergroup, Rotation group SO

Abstract

There are two well-known ways of describing elements of the rotation group SO$(m)$. First, according to the Cartan-Dieudonn\'e theorem, every rotation matrix can be written as an even number of reflections. And second, they can also be expressed as the exponential of some anti-symmetric matrix. In this paper, we study similar descriptions of a group of rotations SO${}_0$ in the superspace setting. This group can be seen as the action of the functor of points of the orthosymplectic supergroup OSp$(m|2n)$ on a Grassmann algebra. While still being connected, the group SO${}_0$ is thus no longer compact. As a consequence, it cannot be fully described by just one action of the exponential map on its Lie algebra. Instead, we obtain an Iwasawa-type decomposition for this group in terms of three exponentials acting on three direct summands of the corresponding Lie algebra of supermatrices. At the same time, SO${}_0$ strictly contains the group generated by super-vector reflections. Therefore, its Lie algebra is isomorphic to a certain extension of the algebra of superbivectors. This means that the Spin group in this setting has to be seen as the group generated by the exponentials of the so-called extended superbivectors in order to cover SO${}_0$. We also study the actions of this Spin group on supervectors and provide a proper subset of it that is a double cover of SO${}_0$. Finally, we show that every fractional Fourier transform in n bosonic dimensions can be seen as an element of this spin group., Comment: 28 pages

Published

2021

18. A Lie Group-Based Iterative Algorithm Framework for Numerically Solving Forward Kinematics of Gough–Stewart Platform

Author

Feng Liu, Shuling Dai, and Binhai Xie

Subjects

lie group, 0209 industrial biotechnology, Computer science, Iterative method, General Mathematics, 02 engineering and technology, 020901 industrial engineering & automation, Lie algebra, 0202 electrical engineering, electronic engineering, information engineering, Computer Science (miscellaneous), Quaternion, Engineering (miscellaneous), Gauss–Newton, Euclidean space, lcsh:Mathematics, forward kinematics, Lie group, lcsh:QA1-939, Gough–Stewart platform, Exponential map (Lie theory), exponential map, Manifold, Algebra, Norm (mathematics), Levenberg–Marquardt, 020201 artificial intelligence & image processing, lie algebra

Abstract

In this work, we began to take forward kinematics of the Gough–Stewart (G-S) platform as an unconstrained optimization problem on the Lie group-structured manifold SE(3) instead of simply relaxing its intrinsic orthogonal constraint when algorithms are updated on six-dimensional local flat Euclidean space or adding extra unit norm constraint when orientation parts are parametrized by a unit quaternion. With this thought in mind, we construct two kinds of iterative problem-solving algorithms (Gauss–Newton (G-N) and Levenberg–Marquardt (L-M)) with mathematical tools from the Lie group and Lie algebra. Finally, a case study for a general G-S platform was carried out to compare these two kinds of algorithms on SE(3) with corresponding algorithms that updated on six-dimensional flat Euclidean space or seven-dimensional quaternion-based parametrization Euclidean space. Experiment results demonstrate that those algorithms on SE(3) behave better than others in convergence performance especially when the initial guess selection is near to branch solutions.

Published

2021

19. Syntomic cohomology and p-adic regulators for varieties over p-adic fields

Author

Jan Nekovář, Wiesława Nizioł, Institut de Mathématiques de Jussieu - Paris Rive Gauche (IMJ-PRG), Université Pierre et Marie Curie - Paris 6 (UPMC)-Université Paris Diderot - Paris 7 (UPD7)-Centre National de la Recherche Scientifique (CNRS), École normale supérieure - Lyon (ENS Lyon), École normale supérieure de Lyon (ENS de Lyon), Berger, Laurent, and Déglise, Frédéric

Subjects

regulators, Pure mathematics, Mathematics::Number Theory, Étale cohomology, Field (mathematics), Mathematics::Algebraic Topology, 01 natural sciences, Algebraic closure, 14F30, Mathematics::Algebraic Geometry, Mathematics::K-Theory and Homology, 0103 physical sciences, FOS: Mathematics, Number Theory (math.NT), 0101 mathematics, Descent (mathematics), Mathematics, syntomic cohomology, Algebra and Number Theory, Mathematics - Number Theory, 010102 general mathematics, Zero (complex analysis), Exponential map (Lie theory), [MATH.MATH-NT]Mathematics [math]/Number Theory [math.NT], Cohomology, Spectral sequence, 11G25, [MATH.MATH-AG]Mathematics [math]/Algebraic Geometry [math.AG], 010307 mathematical physics

Abstract

We show that the logarithmic version of the syntomic cohomology of Fontaine and Messing for semistable varieties over $p$-adic rings extends uniquely to a cohomology theory for varieties over $p$-adic fields that satisfies $h$-descent. This new cohomology - syntomic cohomology - is a Bloch-Ogus cohomology theory, admits period map to \'etale cohomology, and has a syntomic descent spectral sequence (from an algebraic closure of the given field to the field itself) that is compatible with the Hochschild-Serre spectral sequence on the \'etale side. In relative dimension zero we recover the potentially semistable Selmer groups and, as an application, we prove that Soul\'e's \'etale regulators land in the potentially semistable Selmer groups. Our construction of syntomic cohomology is based on new ideas and techniques developed by Beilinson and Bhatt in their recent work on $p$-adic comparison, Comment: Final version; to appear in Algebra and Number Theory

Published

2016

20. Exponential factorizations of holomorphic maps

Author

Luca Studer and Frank Kutzschebauch

Subjects

Pure mathematics, Ring (mathematics), Group (mathematics), Mathematics - Complex Variables, General Mathematics, Riemann surface, 010102 general mathematics, Special linear group, Holomorphic function, 01 natural sciences, Exponential map (Lie theory), Exponential function, Surjective function, symbols.namesake, 510 Mathematics, Mathematics::Quantum Algebra, symbols, FOS: Mathematics, 15A54, 15A16, 30H50, 32A38, 32E10, 48E25, 0101 mathematics, Complex Variables (math.CV), Mathematics::Representation Theory, Mathematics

Abstract

We show that any element of the special linear group $SL_2(R)$ is a product of two exponentials if the ring $R$ is either the ring of holomorphic functions on an open Riemann surface or the disc algebra. This is sharp: one exponential factor is not enough since the exponential map corresponding to $SL_2(\mathbb{C})$ is not surjective. Our result extends to the linear group $GL_2(R)$., Comment: 9 pages

Published

2019

21. Souriau Exponential Map Algorithm for Machine Learning on Matrix Lie Groups

Author

Frédéric Barbaresco

Subjects

ComputingMilieux_THECOMPUTINGPROFESSION, business.industry, Lie group, Machine learning, computer.software_genre, Exponential map (Lie theory), Matrix lie groups, Matrix (mathematics), Mathematics::Quantum Algebra, Scheme (mathematics), Scalability, Mathematics::Differential Geometry, Artificial intelligence, business, Mathematics::Symplectic Geometry, Algorithm, computer, Characteristic polynomial, Mathematics

Abstract

Jean-Marie Souriau extended Urbain Jean Joseph Leverrier algorithm to compute characteristic polynomial of a matrix in 1948. This Souriau algorithm could be used to compute exponential map of a matrix that is a challenge in Lie Group Machine Learning. Main property of Souriau Exponential Map numerical scheme is its scalability with highly parallelization.

Published

2019

22. Kinematic Comparison of Exponential and Cayley Maps in the Planar Motion Group

Author

Soner Erkuş and İlhan Karakiliç

Subjects

Kinematics,Lie Group,planar motion group,exponential map,Cayley map,Rodrigues vector, Pure mathematics, Matematik, Group (mathematics), Applied Mathematics, Motion (geometry), Lie group, Kinematics, Exponential map (Lie theory), Exponential function, Planar, Lie algebra, Geometry and Topology, Mathematical Physics, Mathematics

Abstract

In this work, the exponential and the Cayley maps, from the Lie algebra $\mathfrak{se(2)}$ of the planar motion group $SE(2)$, to the group itself are studied. The comparison between these maps on $SE(2)$ is given by using the Rodrigues vector. A three joint mechanism is discussed as an application.

Published

2018

23. Symmetries in left-invariant optimal control problems

Author

A. V. Podobryaev

Subjects

49J15, 53C17, Pure mathematics, Algebra and Number Theory, 010102 general mathematics, Dimension (graph theory), Lie group, Riemannian geometry, Invariant (physics), Optimal control, 01 natural sciences, Exponential map (Lie theory), Action (physics), symbols.namesake, Optimization and Control (math.OC), 0103 physical sciences, Homogeneous space, FOS: Mathematics, symbols, Key (cryptography), 010307 mathematical physics, 0101 mathematics, Symmetry (geometry), Mathematics - Optimization and Control, Mathematics

Abstract

We consider left-invariant optimal control problems on connected Lie groups such that generic stabilizer of the coadjoint action is connected and has dimension not more than 1. We introduce a construction for symmetries of the exponential map. These symmetries play a key role in investigation of optimality of extremal trajectories., 16 pages, 1 figures

Published

2018

24. A generalized exponential formula for forward and differential kinematics of open-chain multi-body systems

Author

Robin Chhabra and M. Reza Emami

Subjects

Nonholonomic system, Holonomic, Mechanical Engineering, Mathematical analysis, Lie group, Bioengineering, Exponential map (Lie theory), Displacement (vector), Computer Science Applications, Computer Science::Robotics, symbols.namesake, Exponential formula, Mechanics of Materials, Jacobian matrix and determinant, symbols, Kinematic pair, Mathematics

Abstract

This paper presents a generalized exponential formula for Forward and Differential Kinematics of open-chain multi-body systems with multi-degree-of-freedom, holonomic and nonholonomic joints. The notion of lower kinematic pair is revisited, and it is shown that the relative configuration manifolds of such joints are indeed Lie groups. Displacement subgroups, which correspond to different types of joints, are categorized accordingly, and it is proven that except for one class of displacement subgroups the exponential map is surjective. Screw joint parameters are defined to parameterize the relative configuration manifolds of displacement subgroups using the exponential map of Lie groups. For nonholonomic constraints the admissible screw joint speeds are introduced, and the Jacobian of the open-chain multi-body system is modified accordingly. Computational aspects of the developed formulation for Forward and Differential Kinematics of open-chain multi-body systems are explored by assigning coordinate frames to the initial configuration of the multi-body system, employing the matrix representation of SE(3) and choosing a basis for se(3). Finally, an example of a mobile manipulator mounted on a spacecraft, i.e., a six-degree-of-freedom moving base, elaborates the computational aspects.

Published

2014

25. Winter Map Inverses

Author

Thomas B. Gregory

Subjects

Discrete mathematics, Pure mathematics, Adjoint representation of a Lie algebra, Representation of a Lie group, Lie algebra, Non-associative algebra, Lie group, General Medicine, Exponential map (Lie theory), Affine Lie algebra, Physics::Atmospheric and Oceanic Physics, Mathematics, Lie conformal algebra

Abstract

We demonstrate the functional inverse of a Winter map, which is an analog of the exponential map, for Lie algebras over fields of prime characteristic.

Published

2014

26. Local integrability results in harmonic analysis on reductive groups in large positive characteristic

Author

Raf Cluckers, Julia Gordon, Immanuel Halupczok, Laboratoire Paul Painlevé - UMR 8524 (LPP), Centre National de la Recherche Scientifique (CNRS)-Université de Lille, Département de Mathématiques et Applications - ENS Paris (DMA), École normale supérieure - Paris (ENS Paris), Université Paris sciences et lettres (PSL)-Université Paris sciences et lettres (PSL)-Centre National de la Recherche Scientifique (CNRS), Laboratoire Paul Painlevé (LPP), Université de Lille-Centre National de la Recherche Scientifique (CNRS), École normale supérieure - Paris (ENS-PSL), Centre National de la Recherche Scientifique (CNRS)-École normale supérieure - Paris (ENS Paris), and Université Paris sciences et lettres (PSL)-Université Paris sciences et lettres (PSL)

Subjects

Pure mathematics, General Mathematics, Root datum, Zero (complex analysis), Field (mathematics), Mathematics - Logic, Exponential map (Lie theory), 22E50 (Primary), 14E18 (Secondary), Algebraic group, Lie algebra, FOS: Mathematics, Constant function, Representation Theory (math.RT), [MATH]Mathematics [math], Logic (math.LO), Mathematics::Representation Theory, Motivic integration, Mathematics - Representation Theory, ComputingMilieux_MISCELLANEOUS, Mathematics

Abstract

Let $G$ be a connected reductive algebraic group over a non-Archimedean local field $K$, and let $g$ be its Lie algebra. By a theorem of Harish-Chandra, if $K$ has characteristic zero, the Fourier transforms of orbital integrals are represented on the set of regular elements in $g(K)$ by locally constant functions, which, extended by zero to all of $g(K)$, are locally integrable. In this paper, we prove that these functions are in fact specializations of constructible motivic exponential functions. Combining this with the Transfer Principle for integrability [R. Cluckers, J. Gordon, I. Halupczok, "Transfer principles for integrability and boundedness conditions for motivic exponential functions", preprint arXiv:1111.4405], we obtain that Harish-Chandra's theorem holds also when $K$ is a non-Archimedean local field of sufficiently large positive characteristic. Under the hypothesis on the existence of the mock exponential map, this also implies local integrability of Harish-Chandra characters of admissible representations of $G(K)$, where $K$ is an equicharacteristic field of sufficiently large (depending on the root datum of $G$) characteristic., Comment: Compared to v2/v3: some proofs simplified, the main statement generalized; slightly reorganized. Regarding the automatically generated text overlap note: it overlaps with the Appendix B (which is part of arXiv:1208.1945) written by us; the appendix and this article cross-reference each other, and since the set-up is very similar, some overlap is unavoidable

Published

2014

27. On a conjecture by Pierre Cartier about a group of associators

Author

Vincel Hoang Ngoc Minh

Subjects

Algebra homomorphism, Formal power series, Group (mathematics), General Mathematics, Associator, Regularization (mathematics), Exponential map (Lie theory), Combinatorics, Kernel (algebra), FOS: Mathematics, Mathematics - Combinatorics, Combinatorics (math.CO), Free Lie algebra, Mathematics

Abstract

In Cartier (Fonctions polylogarithmes, nombres polyzetas et groupes pro-unipotents. Sem. BOURBAKI, 53eme 2000–2001, no. 885), Pierre Cartier conjectured that for any non-commutative formal power series Φ on X={x 0,x 1} with coefficients in a $\mathbb{Q}$ -extension, A, subjected to some suitable conditions, there exists a unique algebra homomorphism φ from the $\mathbb{Q}$ -algebra generated by the convergent polyzetas to A such that Φ is computed from the Φ KZ Drinfel’d associator by applying φ to each coefficient. We prove that φ exists and that it is a free Lie exponential map over X. Moreover, we give a complete description of the kernel of ζ and draw some consequences about the arithmetical nature of the Euler constant and about an algebraic structure of the polyzetas.

Published

2013

28. Algebraic special functions and

Author

Enrico Celeghini and M. A. del Olmo

Subjects

Physics, Associated Legendre polynomials, Pure mathematics, Special functions, Lie algebra representation, Lie algebra, General Physics and Astronomy, Spherical harmonics, Universal enveloping algebra, Exponential map (Lie theory), Rotation group SO

Abstract

A ladder structure of operators is presented for the associated Legendre polynomials and the sphericas harmonics. In both cases these operators belong to the irreducible representation of the Lie algebra so ( 3 , 2 ) with quadratic Casimir equals to − 5 / 4 . As both are also bases of square-integrable functions, the universal enveloping algebra of so ( 3 , 2 ) is thus shown to be homomorphic to the space of linear operators acting on the L 2 functions defined on ( − 1 , 1 ) × Z and on the sphere S 2 , respectively. The presence of a ladder structure is suggested to be the general condition to obtain a Lie algebra representation defining in this way the “algebraic special functions” that are proposed to be the connection between Lie algebras and square-integrable functions so that the space of linear operators on the L 2 functions is homomorphic to the universal enveloping algebra. The passage to the group, by means of the exponential map, shows that the associated Legendre polynomials and the spherical harmonics support the corresponding unitary irreducible representation of the group SO ( 3 , 2 ) .

Published

2013

29. The Exponential Map for Lie Groups

Author

Roger Godement

Subjects

Discrete mathematics, Pure mathematics, Lie algebra, Lie group, Exponential map (Lie theory), Mathematics

Abstract

The exponential map for Lie groups is studied and used to prove properties of Lie groups and the relation with Lie algebras.

Published

2017

30. Computations with Bernstein Projectors of SL(2)

Author

Allen Moy

Subjects

Pure mathematics, Nilpotent, Distribution (mathematics), Character table, Rank (linear algebra), Group (mathematics), Lie algebra, Unipotent, Mathematics::Representation Theory, Exponential map (Lie theory), Mathematics

Abstract

For the p-adic group G = SL(2), we present results of the computations of the sums of the Bernstein projectors of a given depth. Motivation for the computations is based on a conversation with Roger Howe in August 2013. The computations are elementary, but they provide an expansion of the delta distribution \(\delta _{1_{G}}\) into an infinite sum of G-invariant locally integrable essentially compact distributions supported on the set of topologically unipotent elements. When these distributions are transferred, by the exponential map, to the Lie algebra, they give G-invariant distributions supported on the set of topologically nilpotent elements, whose Fourier transforms turn out to be characteristic functions of very natural G-domains. The computations in particular rely on the SL(2) discrete series character tables computed by Sally–Shalika in 1968. This new phenomenon for general rank has also been independently noticed in recent work of Bezrukavnikov, Kazhdan, and Varshavsky.

Published

2017

31. THE GROUP OF DIFFEOMORPHISMS OF A NON COMPACT MANIFOLD IS NOT REGULAR

Author

Jean-Pierre Magnot, magnot, jean-pierre, Laboratoire Angevin de Recherche en Mathématiques (LAREMA), and Université d'Angers (UA)-Centre National de la Recherche Scientifique (CNRS)

Subjects

Path (topology), Mathematics - Differential Geometry, infinite dimensional Lie groups, Pure mathematics, [NLIN.NLIN-SI] Nonlinear Sciences [physics]/Exactly Solvable and Integrable Systems [nlin.SI], General Mathematics, [SHS.INFO]Humanities and Social Sciences/Library and information sciences, [PHYS.MPHY]Physics [physics]/Mathematical Physics [math-ph], [MATH.MATH-OA]Mathematics [math]/Operator Algebras [math.OA], 01 natural sciences, [MATH.MATH-GM]Mathematics [math]/General Mathematics [math.GM], [NLIN.NLIN-PS]Nonlinear Sciences [physics]/Pattern Formation and Solitons [nlin.PS], [PHYS.QPHY]Physics [physics]/Quantum Physics [quant-ph], [MATH.MATH-MP]Mathematics [math]/Mathematical Physics [math-ph], 0103 physical sciences, Lie algebra, FOS: Mathematics, Order (group theory), 22E65, 22E66, [MATH.MATH-AP]Mathematics [math]/Analysis of PDEs [math.AP], [NLIN.NLIN-SI]Nonlinear Sciences [physics]/Exactly Solvable and Integrable Systems [nlin.SI], 22E66, 0101 mathematics, [MATH.MATH-MP] Mathematics [math]/Mathematical Physics [math-ph], [MATH.MATH-AP] Mathematics [math]/Analysis of PDEs [math.AP], 22E65, [MATH.MATH-MG]Mathematics [math]/Metric Geometry [math.MG], Mathematics::Symplectic Geometry, Mathematics, diffeomorphisms, Group (mathematics), lcsh:Mathematics, 010102 general mathematics, [MATH.MATH-GM] Mathematics [math]/General Mathematics [math.GM], lcsh:QA1-939, Exponential map (Lie theory), Topology of uniform convergence, Manifold, exponential map, Compact space, Differential Geometry (math.DG), [MATH.MATH-DG]Mathematics [math]/Differential Geometry [math.DG], diffeology, [NLIN.NLIN-CD]Nonlinear Sciences [physics]/Chaotic Dynamics [nlin.CD], [SHS.GESTION]Humanities and Social Sciences/Business administration, 010307 mathematical physics, [MATH.MATH-DG] Mathematics [math]/Differential Geometry [math.DG], [MATH.MATH-SP]Mathematics [math]/Spectral Theory [math.SP]

Abstract

We show that a group of diffeomorphisms $\D$ on the open unit interval $I,$ equipped with the topology of uniform convergence on any compact set of the derivatives at any order, is non regular: the exponential map is not defined for some path of the Lie algebra. this result extends to the group of diffeomorphisms of finite dimensional, non compact manifold $M.$, Comment: Corrected version, better presentation

Published

2017

32. Exponential map and algebra associated to a Lie pair

Author

Camille Laurent-Gengoux, Ping Xu, and Mathieu Stiénon

Subjects

Lie algebroid, Algebraic structure, Homotopy, Modulo, 010102 general mathematics, Structure (category theory), General Medicine, Mathematics::Algebraic Topology, 01 natural sciences, Exponential map (Lie theory), Algebra, Mathematics::K-Theory and Homology, Mathematics::Quantum Algebra, Mathematics::Category Theory, 0103 physical sciences, Lie algebra, 010307 mathematical physics, 0101 mathematics, Mathematics::Symplectic Geometry, Quotient, Mathematics

Abstract

In this Note, we unveil homotopy-rich algebraic structures generated by the Atiyah classes relative to a Lie pair ( L , A ) of algebroids. In particular, we prove that the quotient L / A of such a pair admits an essentially canonical homotopy module structure over the Lie algebroid A, which we call Kapranov module.

Published

2012

33. Multiplication: From Thales to Lie

Author

Pradipkumar H. Keskar

Subjects

business.product_category, Straightedge, Intercept theorem, Infinitesimal, Exponential map (Lie theory), Education, Algebra, Ruler, Lie algebra, Multiplication, Lie theory, Arithmetic, business, Mathematics

Abstract

The ancient Greek mathematician Thales of Miletus devised a method to make large measurements like the heights of pyramids. The straightedge or ruler construction of multiplication can be traced back to this method of Thales. The ruler construction also exists for addition. In this article, we indicate how the comparison between these two constructions leads to Lie theory, a device created by Lie to reduce the multiplicative problems to the additive ones. It is hoped that this enhances the interest in these two themes.

Published

2012

34. Derivations and automorphisms on non-commutative power series

Author

Kentaro Ihara

Subjects

Algebra, Filtered algebra, Algebra and Number Theory, Cellular algebra, Universal enveloping algebra, Automorphism, Affine Lie algebra, Exponential map (Lie theory), Graded Lie algebra, Lie conformal algebra, Mathematics

Abstract

We define a class of derivations on the algebra of the non-commutative power series in two variables and study the structure of the Lie algebra generated by them. After detecting the corresponding automorphisms under the exponential map explicitly, we clarify the structure of the automorphism group by means of the Hausdorff group associated to the Lie algebra.

Published

2012

35. The Carlitz shtuka

Author

Lenny Taelman

Subjects

Carlitz module, Class (set theory), Pure mathematics, Algebra and Number Theory, Mathematics - Number Theory, Group (mathematics), Algebraic number field, Exponential map (Lie theory), Algebra, FOS: Mathematics, Finitely-generated abelian group, Number Theory (math.NT), Algebraic number, Shtuka, Unit (ring theory), Function fields, Function field, Class number, Mathematics, 11G09

Abstract

Recently we have used the Carlitz exponential map to define a finitely generated submodule of the Carlitz module having the right properties to be a function field analogue of the group of units in a number field. Similarly, we constructed a finite module analogous to the class group of a number field. In this short note more algebraic constructions of these "unit" and "class" modules are given and they are related to Ext modules in the category of shtukas., 9 pages

Published

2011

36. A p-adic analogue of the Borel regulator and the Bloch–Kato exponential map

Author

Guido Kings and Annette Huber

Subjects

Discrete mathematics, General Mathematics, Lie algebra cohomology, Regulator, Formal group, Isomorphism, Exponential map (Lie theory), Mathematics, Exponential function

Abstract

In this paper we define a p-adic analogue of the Borel regulator for the K-theory of p-adic fields. The van Est isomorphism in the construction of the classical Borel regulator is replaced by the Lazard isomorphism. The main result relates this p-adic regulator to the Bloch–Kato exponential and the Soulé regulator. On the way we give a new description of the Lazard isomorphism for certain formal groups. We also show that the Soulé regulator is induced by continuous and even analytic classes.

Published

2010

37. Splitting methods for SU(N) loop approximation

Author

Tatiana Shingel and Peter Oswald

Subjects

41A29, Polynomial, Mathematics(all), Numerical Analysis, Smoothness (probability theory), 41A17, Degree (graph theory), General Mathematics, Applied Mathematics, Numerical Analysis (math.NA), Type (model theory), Exponential map (Lie theory), Combinatorics, Loop (topology), Loop group, FOS: Mathematics, Order (group theory), 42A10, Mathematics - Numerical Analysis, Analysis, Mathematics

Abstract

The problem of finding the correct asymptotic rate of approximation by polynomial loops in dependence of the smoothness of the elements of a loop group seems not well-understood in general. For matrix Lie groups such as SU(N), it can be viewed as a problem of nonlinearly constrained trigonometric approximation. Motivated by applications to optical FIR filter design and control, we present some initial results for the case of SU(N)-loops, N>1. In particular, using representations via the exponential map and ideas from splitting methods, we prove that the best approximation of an SU(N)-loop belonging to a Hoelder-Zygmund class Lip_alpha with alpha>1/2 by a polynomial SU(N)-loop of degree n is of the order O(n^{-\alpha/(1+\alpha)}) as n tends to infinity. Although this approximation rate is not considered final (and can be improved in special cases), to our knowledge it is the first general, nontrivial result of this type., Comment: 14 pages, still submitted to J. Approx. Th. typos corrected, part of the proof of Lemma 4 concerning the auxiliary statement on page 8 rewritten in a clearer way

Published

2009

38. On the existence of global bisections of Lie groupoids

Author

Zhuo Chen, Zhang Ju Liu, and De Shou Zhong

Subjects

Lie groupoid, Algebra, Pure mathematics, Computer Science::Discrete Mathematics, Applied Mathematics, General Mathematics, Bisection, Point (geometry), Multiplication, Mathematics::Differential Geometry, Exponential map (Lie theory), Mathematics, Exponential function

Abstract

We show that every source connected Lie groupoid always has global bisections through any given point. This bisection can be chosen to be the multiplication of some exponentials as close as possible to a prescribed curve. The existence of bisections through more than one prescribed point is also discussed. We give some interesting applications of these results.

Published

2009

39. Kinematic state estimation and motion planning for stochastic nonholonomic systems using the exponential map

Author

Matthew S. Moses, Gregory S. Chirikjian, Yu Zhou, Yan Liu, and Wooram Park

Subjects

Nonholonomic system, Computer science, Lie algebra representation, General Mathematics, Physical system, Lie group, Geometry, Exponential map (Lie theory), Article, Computer Science Applications, Control and Systems Engineering, Lie algebra, Applied mathematics, Motion planning, Software, Rotation group SO

Abstract

SUMMARYA nonholonomic system subjected to external noise from the environment, or internal noise in its own actuators, will evolve in a stochastic manner described by an ensemble of trajectories. This ensemble of trajectories is equivalent to the solution of a Fokker–Planck equation that typically evolves on a Lie group. If the most likely state of such a system is to be estimated, and plans for subsequent motions from the current state are to be made so as to move the system to a desired state with high probability, then modeling how the probability density of the system evolves is critical. Methods for solving Fokker-Planck equations that evolve on Lie groups then become important. Such equations can be solved using the operational properties of group Fourier transforms in which irreducible unitary representation (IUR) matrices play a critical role. Therefore, we develop a simple approach for the numerical approximation of all the IUR matrices for two of the groups of most interest in robotics: the rotation group in three-dimensional space,SO(3), and the Euclidean motion group of the plane,SE(2). This approach uses the exponential mapping from the Lie algebras of these groups, and takes advantage of the sparse nature of the Lie algebra representation matrices. Other techniques for density estimation on groups are also explored. The computed densities are applied in the context of probabilistic path planning for kinematic cart in the plane and flexible needle steering in three-dimensional space. In these examples the injection of artificial noise into the computational models (rather than noise in the actual physical systems) serves as a tool to search the configuration spaces and plan paths. Finally, we illustrate how density estimation problems arise in the characterization of physical noise in orientational sensors such as gyroscopes.

Published

2008

40. On complex exponential groups

Author

Martin Moskowitz and Richard Sacksteder

Subjects

General Mathematics, Simple Lie group, Lie group, Center (group theory), Exponential map (Lie theory), Circle group, Complex Lie group, Surjective function, Algebra, Combinatorics, symbols.namesake, Euler's formula, symbols, Mathematics

Abstract

Lai, W\"ustner and Chatterjee have shown in a variety of cases that the exponential map of a connected complex Lie group is surjective only if its center is connected. Here we prove this is true without restriction for any complex connected Lie group.

Published

2008

41. Symmetries of Analytic Curves

Author

Maximilian Hanusch

Subjects

Mathematics - Differential Geometry, 010308 nuclear & particles physics, 010102 general mathematics, Block (permutation group theory), Inverse, 01 natural sciences, Exponential map (Lie theory), Combinatorics, Analytic manifold, Computational Theory and Mathematics, Differential Geometry (math.DG), 58D19, Iterated function, 0103 physical sciences, Homogeneous space, Lie algebra, FOS: Mathematics, Geometry and Topology, 0101 mathematics, Lie group action, Analysis, Mathematics

Abstract

Analytic curves are classified w.r.t. their symmetry under a regular and separately analytic Lie group action on an analytic manifold. We show that an analytic curve is either exponential or splits into countably many analytic immersive curves, each of them discretely generated by the symmetry group (i.e., each such curve naturally decomposes into countably many symmetry free subcurves that are mutually and uniquely related by the Lie group action). We additionally extend the classification result to the analytic 1-submanifold case. Specifically, we show that an analytic 1-submanifold is either free or (exponential, i.e.) analytically diffeomorphic (via the exponential map) to the unit circle or an interval. The corresponding decomposition results in the free case are outlined in this paper, but proven in a separate one., Comment: 77 pages. Version as published in Differential Geometry and its Applications (up to additional presentational improvements)

Published

2016

42. Soficity, short cycles and the Higman group

Author

Harald Andrés Helfgott and Kate Juschenko

Subjects

Exponentiation, Mathematics - Number Theory, Group (mathematics), Applied Mathematics, General Mathematics, 010102 general mathematics, 0102 computer and information sciences, Group Theory (math.GR), 01 natural sciences, Exponential map (Lie theory), Combinatorics, Higman group, 010201 computation theory & mathematics, 20F65, 11B37, FOS: Mathematics, Number Theory (math.NT), 0101 mathematics, Mathematics - Group Theory, Mathematics

Abstract

This is a paper with two aims. First, we show that the map from $\mathbb{Z}/p\mathbb{Z}$ to itself defined by exponentiation $x\to m^x$ has few $3$-cycles -- that is to say, the number of cycles of length three is $o(p)$. This improves on previous bounds. Our second objective is to contribute to an ongoing discussion on how to find a non-sofic group. In particular, we show that, if the Higman group were sofic, there would be a map from $\mathbb{Z}/p\mathbb{Z}$ to itself, locally like an exponential map, yet satisfying a recurrence property., 27 pages. Revised version. We address results by Glebsky and Kassabov-Kuperberg-Riley that go against the heuristic, allowing for the construction of functions that behave like $x\to m^x$, $m\ne 2$ and satisfy a recurrence property

Published

2015

43. On $C^*$-algebras of exponential solvable Lie groups and their real ranks

Author

Ingrid Beltiţă and Daniel Beltiţă

Subjects

Discrete mathematics, Applied Mathematics, 010102 general mathematics, Mathematics - Operator Algebras, Lie group, Rank (differential topology), 01 natural sciences, Exponential map (Lie theory), 22E27, 22D25, Exponential function, 010101 applied mathematics, Combinatorics, FOS: Mathematics, Bijection, Ideal (ring theory), Representation Theory (math.RT), 0101 mathematics, Operator Algebras (math.OA), Mathematics::Representation Theory, Analysis, Mathematics - Representation Theory, Mathematics

Abstract

For any solvable Lie group whose exponential map $\exp_G\colon{\mathfrak g}\to G$ is bijective, we prove that the real rank of $C^*(G)$ is equal to $\dim({\mathfrak g}/[{\mathfrak g},{\mathfrak g}])$. We also indicate a proof of a similar formula for the stable rank of $C^*(G)$, as well as some estimates on the ideal generated by the projections in $C^*(G)$., 8 pages

Published

2015

44. Improved Newton iteration for nonlinear matrix equations on quadratic Lie groups

Author

Zichen Deng, Suying Zhang, and Wencheng Li

Subjects

Applied Mathematics, Numerical analysis, Mathematical analysis, Lie group, Exponential map (Lie theory), Steffensen's method, Local convergence, Computational Mathematics, symbols.namesake, Newton fractal, Lie algebra, symbols, Newton's method, Mathematics

Abstract

In this paper we consider Newton iteration methods for solving nonlinear equations on matrix Lie groups. Recently, Owren and Welfert have proposed a method where the original nonlinear equation is transformed into a nonlinear equation on the Lie algebra of the group via the exponential map, thus Newton iteration methods may be applied. Based on this we suggest two improved variants of Newton iteration algorithm. One is that the exponential map would be approximated by Cayley map and give a Cayley version Newton iteration method for solving nonlinear equations on quadratic Lie groups, then we show that, the proposed method converges quadratically; Another is a variant of Newton type method with accelerated convergence and the numerical tests reported seem to support that it converges with cubically.

Published

2006

45. Supplement to 'On the Levi-flats in Complex Tori of Dimension Two'

Author

Takeo Ohsawa

Subjects

Section (fiber bundle), Combinatorics, Connection (fibred manifold), Line bundle, General Mathematics, Lie algebra, Compact Riemann surface, Exponential map (Lie theory), Mathematics, Meromorphic function, Complex Lie group

Abstract

The purpose of this note is to describe certain Levi-flats in [O] more in detail, by showing that they are natural generalization of Nemirovski’s example in [N]. Let C be a compact Riemann surface, let L → C be a holomorphic line bundle, and let s be a meromorphic section of L whose zeros and poles are all simple. Let C ′ ⊂ C be the complement of the set of zeros and poles of s, let L′ ⊂ L be the complement of the zero section, and let R′ = R\{0}. Let a > 1, and let Z act on L′ by fiberwise multiplication by a for m ∈ Z. Then it is easy to see that the closure of R′s(C ′)/Z in L′/Z is a Levi-flat whose complement is Stein if C ′ = C (cf. [N]). This construction is immediately generalized to produce Levi-flats with Stein complements in higher dimension, by considering smooth ample divisors and the associated line bundles with canonical sections. On the other hand, since not all elliptic principal bundles arise as quotients of C∗-bundles, it may not be so immediate to see how one can generalize Nemirovski’s construction to the elliptic principal bundles. However, it is actually immediate if one regards d log s as a meromorphic connection of the bundle L′/Z as we shall see below. Let C be as above, let E0 be an elliptic curve, i.e. a compact 1-dimensional complex Lie group, and let E π → C be a principal E0-bundle. Let g be the Lie algebra of E0. We shall regard E0 as a quotient space of g by the exponential map. The kernel of the exponential map will be denoted by gZ and E0 will be identified with g/gZ in what follows. Given a closed subgroup Γ ⊂ E0 and a finite subset Σ ⊂ C, let Ω(Γ,Σ) be the set of meromorphic connections ω of E with at most simple poles in Σ

Published

2006

46. Hilbert–Schmidt groups as infinite-dimensional Lie groups and their Riemannian geometry

Author

Maria Gordina

Subjects

Pure mathematics, Curvature of Riemannian manifolds, Simple Lie group, Mathematical analysis, Lie group, Exponential map (Lie theory), Representation theory, Exponential map, Ricci curvature, Lie groups and Lie algebras, Symmetric space, Mathematics::Differential Geometry, Lie theory, Analysis, Infinite-dimensional groups, Mathematics

Abstract

We describe the exponential map from an infinite-dimensional Lie algebra to an infinite-dimensional group of operators on a Hilbert space. Notions of differential geometry are introduced for these groups. In particular, the Ricci curvature, which is understood as the limit of the Ricci curvature of finite-dimensional groups, is calculated. We show that for some of these groups the Ricci curvature is - ∞ .

Published

2005

47. Geometric integration on Euclidean group with application to articulated multibody systems

Author

Jonghoon Park and Wan Kyun Chung

Subjects

Euclidean group, Lie group, Multibody system, Topology, Rigid body, Exponential map (Lie theory), Computer Science Applications, Runge–Kutta methods, Generalized coordinates, Control and Systems Engineering, Applied mathematics, Electrical and Electronic Engineering, Quaternion, Mathematics

Abstract

Numerical integration methods based on the Lie group theoretic geometrical approach are applied to articulated multibody systems with rigid body displacements, belonging to the special Euclidean group SE(3), as a part of generalized coordinates. Three Lie group integrators, the Crouch-Grossman method, commutator-free method, and Munthe-Kaas method, are formulated for the equations of motion of articulated multibody systems. The proposed methods provide singularity-free integration, unlike the Euler-angle method, while approximated solutions always evolve on the underlying manifold structure, unlike the quaternion method. In implementing the methods, the exact closed-form expression of the differential of the exponential map and its inverse on SE(3) are formulated in order to save computations for its approximation up to finite terms. Numerical simulation results validate and compare the methods by checking energy and momentum conservation at every integrated system state.

Published

2005

48. Hochschild Cohomologies of the Algebra of Smooth Functions

Author

V. V. Zharinov

Subjects

Algebra, Laplace transform, Mathematics::K-Theory and Homology, Associative algebra, Adjoint representation, Bimodule, Statistical and Nonlinear Physics, Space (mathematics), Exponential map (Lie theory), Mathematical Physics, Cohomology, Vector space, Mathematics

Abstract

Based on the previously developed technique using the Laplace transformation of distributions with compact support, we calculate the Hochschild cohomologies of the algebra of smooth functions on a finite-dimensional real vector space with coefficients in the adjoint representation.

Published

2004

49. Extensions of the Duflo map and Chern-Simons expectation values

Author

Hanno Sahlmann and Thomas Zilker

Subjects

Symmetric algebra, Pure mathematics, 010308 nuclear & particles physics, Operator (physics), Chern–Simons theory, FOS: Physical sciences, General Physics and Astronomy, Mathematical Physics (math-ph), General Relativity and Quantum Cosmology (gr-qc), 01 natural sciences, Exponential map (Lie theory), General Relativity and Quantum Cosmology, Algebra, Bracket (mathematics), Mathematics::Quantum Algebra, 0103 physical sciences, Lie algebra, Geometry and Topology, Invariant (mathematics), 010306 general physics, Mathematics::Representation Theory, Subspace topology, Mathematical Physics, Mathematics

Abstract

The Duflo map is a valuable tool for operator ordering in contexts in which Kirillov-Kostant brackets and their quantizations play a role. A priori, the Duflo map is only defined on the subspace of the symmetric algebra over a Lie algebra consisting of elements invariant under the adjoint action. Here we discuss extensions to the whole symmetric algebra, as well as their application to the calculation of Chern-Simons theory expectation values., 22 pages, 2 figures, matches published version

Published

2015

50. A note on large gauge transformations in double field theory

Author

Usman Naseer, Massachusetts Institute of Technology. Center for Theoretical Physics, Massachusetts Institute of Technology. Department of Physics, and Naseer, Usman

Subjects

Physics, High Energy Physics - Theory, Nuclear and High Energy Physics, Conjecture, FOS: Physical sciences, Gauge (firearms), Exponential map (Lie theory), symbols.namesake, High Energy Physics - Theory (hep-th), Jacobian matrix and determinant, symbols, Lie derivative, Field theory (psychology), Mathematical physics

Abstract

We give a detailed proof of the conjecture by Hohm and Zwiebach in double field theory. This result implies that their proposal for large gauge transformations in terms of the Jacobian matrix for coordinate transformations is, as required, equivalent to the standard exponential map associated with the generalized Lie derivative along a suitable parameter., Comment: 34 pages, no figures

Published

2015