Polar actions on complex hyperbolic spaces

Slides:

Advertisements

Similar presentations

Differentiation of Hyperbolic Functions. Differentiation of Hyperbolic Functions by M. Seppälä Hyperbolic Functions.

Advertisements

1 In this lecture Number Theory Quotient and Remainder Floor and Ceiling Proofs Direct proofs and Counterexamples (cont.) Division into cases.

Algebra - Complex Numbers Leaving Cert Helpdesk 27 th September 2012.

Complex numbers Definitions Conversions Arithmetic Hyperbolic Functions.

On isoparametric hypersurfaces in complex hyperbolic spaces Miguel Domínguez Vázquez (joint work with J. Carlos Díaz Ramos) International Meeting on Differential.

Isoparametric foliations on complex projective spaces Miguel Domínguez Vázquez Differential Geometry Days In honour of Luis A. Cordero Department of Geometry.

Real hypersurfaces with constant principal curvatures in complex projective and hyperbolic spaces Miguel Domínguez Vázquez (joint work with J. C. Díaz.

If R = {(x,y)| y = 3x + 2}, then R -1 = (1) x = 3y + 2 (2) y = (x – 2)/3 (3) {(x,y)| y = 3x + 2} (4) {(x,y)| y = (x – 2)/3} (5) {(x,y)| y – 2 = 3x} (6)

Same Channel Same Satellite. Channel 3B N18 Channel 3B N18 Channel 3B N19 Channel 3B N19 Channel 3B M2 Channel 3B M2 A0 vs A1A0 vs A2A1 vs A2.

A GRADUATING RESEARCH PROJECT FOR THE BACHALOLIC DEGEES.

1/03/09 De 89 à 98. 1/03/09 De 89 à 98 1/03/09 De 89 à 98.

3.3 Parallel and Perpendicular Lines To Relate Parallel and Perpendicular Lines.

1 Week 1 Complex numbers: the basics 1. The definition of complex numbers and basic operations 2. Roots, exponential function, and logarithm 3. Multivalued.

Chapter 5. Operations on Multiple R. V.'s 1 Chapter 5. Operations on Multiple Random Variables 0. Introduction 1. Expected Value of a Function of Random.

Fundamental Group

Areas of Parallelograms and Triangles Geometry Unit 4, Lesson 1.

Three Extremal Problems for Hyperbolically Convex Functions Roger W. Barnard, Kent Pearce, G. Brock Williams Texas Tech University [Computational Methods.

9.7 Products and Quotients of Complex Numbers in Polar Form

POLYNOMIAL, RATIONAL, EXPONENTIAL, AND LOGARITHMIC FUNCTIONS College Algebra.

Chapter (3) Transcendental Functions 1- Trigonometric Functions 2- Exponential Functions 3- Hyperbolic Functions.

Advanced Higher Mathematics Methods in Algebra and Calculus Geometry, Proof and Systems of Equations Applications of Algebra and Calculus AH.

Vocabulary A definition is comprised of a category or classification and a critical attribute. The critical attribute is the thing that makes one definition.

The Complex Plane; De Moivre’s Theorem. Polar Form.

Graphing Polar Graphs Calc AB- Section10.6A. Symmetry Tests for Polar Graphs 1.Symmetry about the x -axis: If the point lies on the graph, the point ________.

Complex Roots Solve for z given that z 4 =81cis60°

Pierre de Fermat Pierre de Fermat Pierre de Fermat was a French lawyer and government official most remembered for his work in.

SAT Prep. Postulates and Theorems Relating Points, Lines, and Planes Use postulates and theorems relating points, lines, and planes.

。 33 投资环境 3 开阔视野提升竞争力。 3 嘉峪关市概况。 3 。 3 嘉峪关是一座新兴的工业旅游城市，因关得名，因企设市，是长城文化与丝路文化交汇点，是全国唯一一座以长城关隘命名的城市。嘉峪关关城位于祁连山、黑山之间。 1965 年建市，下辖雄关区、镜铁区、长城区，全市总面积 2935.

Principal curvatures of isoparametric hypersurfaces in complex hyperbolic spaces Miguel Domínguez Vázquez joint work with J. Carlos Díaz Ramos Conference.

Singularities ECE 6382 Notes are from D. R. Wilton, Dept. of ECE David R. Jackson 1.

CHAPTER 1 COMPLEX NUMBERS

Introduction to Measure Theory

Cauchy’s theory for complex integrals

Advanced Higher Mathematics

Week 1 Complex numbers: the basics

Polar Form and its Applications

CHAPTER 1 COMPLEX NUMBERS

Chapter 7 Applications of Lie Groups to Differential Equations

MTH 324 Lecture # 18 Complex Integration.

Chapter 4: Cyclic Groups

5.6 – Find the Rational Zeros

Let Maths take you Further…

Proving Theorems about Isosceles Triangles (5.6.2)

Analytic Number Theory MTH 435

Sketching/Information Sheets.

1-5 Postulates and Theorems Relating Points, Lines and Planes

Lesson 2-8 Proof Review.

Countable and Countably Infinite Sets

The sum of any two even integers is even.

Section 3.2 The Exponential, Trigonometric, and Hyperbolic Functions

5.5 Properties of the Definite Integral

ASV Chapters 1 - Sample Spaces and Probabilities

Section 9.3 The Complex Plane

ECE 6341 Spring 2016 Prof. David R. Jackson ECE Dept. Notes 42.

Brazil promoted to Group V of the IMU

Linear Algebra Lecture 32.

Submanifolds and holonomy Sergio Console

Computer Aided Geometric Design

Copyright © 2017, 2013, 2009 Pearson Education, Inc.

Sec 2.8: The Derivative as a Function

De Moivre’s Theorem and nth Roots

75 previous answer What is of 37.5? ? go to.

Angles and Parallel Lines

7-2 Two Proof Oriented Triangle Theorems

The Complex Plane.

Chapter 7 Transformations.

75 previous answer What is of 60? ? go to.

Chapter 5 Congruent Triangles.

Perspective Sketching

Presentation transcript:

Polar actions on complex hyperbolic spaces Joint work with J. C. Díaz-Ramos and A. Kollross Miguel Domínguez Vázquez Instituto de Matemática Pura e Aplicada

Symmetry in submanifold theory

Polar actions Definition

Polar actions Previous classification results

Polar actions Previous classification results

Polar actions on CHn Sketch of the proof

Polar actions on CHn Sketch of the proof

Polar actions on CHn Sketch of the proof

Polar actions on CHn Sketch of the proof

Polar actions on CHn Classification theorem