Description |
1 online resource. |
|
text file |
Series |
Mathematics research developments series
|
|
Mathematics research developments series.
|
Bibliography |
Includes bibliographical references and index. |
Contents |
GROUP THEORY:CLASSES, REPRESENTATION ANDCONNECTIONS, AND APPLICATIONS; GROUP THEORY:CLASSES, REPRESENTATION ANDCONNECTIONS, AND APPLICATIONS; CONTENTS; PREFACE; APPLICATION OF SYMMETRY ANALYSIS TODESCRIPTION OF ORDERED STRUCTURES INCRYSTALS; ABSTRACT; INTRODUCTION; PHYSICAL CHARACTERISTICS OF THE PROBLEM; SYMMETRY-ADAPTED DESCRIPTION OF THE ORDERING MODE; CONDITIONS IMPOSED ON PHYSICAL SOLUTIONS AND THENUMBER OF FREE PARAMETERS; ""MODY"" PROGRAM -- A PRACTICAL IMPLEMENTATION OFSYMMETRY ANALYSIS; SCALAR ORDER PARAMETERS: SITE OCCUPATION PROBABILITY. |
|
VECTOR QUANTITIES -- MAGNETIC MOMENTS OR ATOMICDISPLACEMENTSTENSORS -- QUADRUPOLAR ORDERING IN SOLIDS; EXAMPLE 1: MAGNETIC ORDERING -- COMPARISON OF THREEORDERING WAVE-VECTORS IN; EXAMPLE 2: ORDERING SITE OCCUPATION PROBABILITIES ANDACCOMPANYING ATOMIC DISPLACEMENTS IN ERMN2D2; Hydrogen Ordering; EXAMPLE 3: QUADRUPOLAR MOMENT TENSOR ORDERING IN UPD3; SYMMETRY ANALYSIS OF THE ACCOMPANYING STRUCTURALDEFORMATIONS; REFERENCES; HIGHER ALGEBRAIC K -- THEORY OFG -- REPRESENTATIONS FOR THE ACTIONS OF FINITEAND ALGEBRAIC GROUPS G; INTRODUCTION; CHAPTER I. EQUIVARIANT EXACT CATEGORIES. |
|
Section 1. Exact Categories and Some Relevant Examples1.1. Definition; 1.2. Examples; Section 2. Equivariant Exact Categories for the Action of Finite Groups; 2.1. Category of G- Representations; 2.2. Examples; 2.3. G-Representations as Functor Categories; 2.4. Relative G- Representations as Functor Categories; Section 3. Equvariant Exact Categories for the Actions of Algebraic Groups; 3.1. Some Generalities on Algebraic Groups; 3.2. Representations of G in P (F); 3.3. G- Modules on G-spaces X. |
|
CHAPTER II. HIGHER K-THEORY OF EQUIVARIANT EXACTCATEGORIES -- DEFINITIONS, EXAMPLES, AND SOME RESULTSSection 1. Brief Review of () n K C, n 0, C an Exact Category; 1.1. Definition of () n K C; 1.2. The Plus Construction -- Another Definition of (()) () n n K PA =K A n 1; 1.3. Examples of n K of Ordinary And Equivariant Exact Categories; 1.4. Mod- l s higher K-theory (ordinary and equivariant); 1.4.2. Examples; 1.5. Profinite Higher K-Theory (Ordinary and Equivariant); 1.5.2. Examples; Section 2. Induction Techniques for finite group actions ; Mackey functors. |
Local Note |
eBooks on EBSCOhost EBSCO eBook Subscription Academic Collection - North America |
Contents |
2.1. Mackey functors -- Brief Review2.1.1. Definition; 2.2. Higher K-Theory as Mackey Functors (For Finite Group Actions); 2.2.2. Theorem [10] [39]; 2.2.3. Remarks; 2.3. Some Consequent Results on Higher K-Theory of Grouprings; 2.3.1. Theorem [39] [10]; 2.3.2. Theorem [39] [9]; Definition 2.3.4.; 2.3.5. Theorem [39] [24]; CHAPTER III. SOME RESULTS ON THE ACTION OF FINITE ANDALGBRAIC GROUPS; Section 1. Some results on (), (), (), (), () n n n n n K RG G RG Cl RG SK RG SG RG n 0(G finite) and consequences for some infinite groups. |
Language |
English. |
Subject |
Group theory.
|
|
Group theory. |
Genre/Form |
Electronic books.
|
|
Electronic books.
|
Added Author |
Danellis, Charles W., editor.
|
Other Form: |
Print version: Group theory New York : Nova Science Publishers, Inc., [2010] 1608761754 (hardcover : alk. paper) (DLC) 2009034517 |
ISBN |
9781613249680 (e-Book) |
|
1613249683 |
|
9781608761753 (hardcover : alkaline paper) |
|
1608761754 (hardcover : alkaline paper) |
|