Grassmann Algebra

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TableOfContents.nb 5 4.4 Geometrically Interpreted m-elements Types of geometrically interpreted m-elements The m-vector The bound m-vector Bound simple m-vectors expressed by points 4.5 Decomposition into Components The shadow Decomposition in a 2-space Decomposition in a 3-space Decomposition in a 4-space Decomposition of a point or vector in an n-space 4.6 Geometrically Interpreted Spaces Vector and point spaces Coordinate spaces Geometric dependence Geometric duality 4.7 m-planes m-planes defined by points m-planes defined by m-vectors m-planes as exterior quotients The operator 4.8 Line Coordinates � Lines in a plane � Lines in a 3-plane Lines in a 4-plane Lines in an m-plane 4.9 Plane Coordinates � Planes in a 3-plane Planes in a 4-plane Planes in an m-plane 4.10 Calculation of Intersections � The intersection of two lines in a plane � The intersection of a line and a plane in a 3-plane � The intersection of two planes in a 3-plane � Example: The osculating plane to a curve 5 The Complement 5.1 Introduction 2001 4 5
TableOfContents.nb 6 5.2 Axioms for the Complement The grade of a complement The linearity of the complement operation The complement axiom The complement of a complement axiom The complement of unity 5.3 Defining the Complement The complement of an m-element The complement of a basis m-element Defining the complement of a basis 1-element Determining the value of � 5.4 The Euclidean Complement Tabulating Euclidean complements of basis elements Formulae for the Euclidean complement of basis elements 5.5 Complementary Interlude Alternative forms for complements Orthogonality Visualizing the complement axiom The regressive product in terms of complements Relating exterior and regressive products 5.6 The Complement of a Complement The complement of a cobasis element The complement of the complement of a basis 1-element The complement of the complement of a basis m-element The complement of the complement of an m-element 5.7 Working with Metrics � The default metric � Declaring a metric � Declaring a general metric � Calculating induced metrics � The metric for a cobasis � Creating tables of induced metrics � Creating palettes of induced metrics 5.8 Calculating Complements � Entering a complement � Converting to complement form � Simplifying complements � Creating tables and palettes of complements of basis elements 5.9 Geometric Interpretations The Euclidean complement in a vector 2-space � The Euclidean complement in a plane � The Euclidean complement in a vector 3-space 5.10 Complements in a vector subspace of a multiplane Metrics in a multiplane The complement of an m-vector 2001 4 5
Page 1 and 2: Grassmann Algebra Exploring applica
Page 3 and 4: TableOfContents.nb 2 1.7 Exploring
Page 5: TableOfContents.nb 4 3.5 The Common
Page 9 and 10: TableOfContents.nb 8 6.7 The Induce
Page 11 and 12: TableOfContents.nb 10 9 Exploring G
Page 13 and 14: Preface The origins of this book Th
Page 15 and 16: Preface.nb 3 Chapters 7 to 13: Expl
Page 17 and 18: 1. Introduction 1.1 Background The
Page 19 and 20: Introduction.nb 3 the scientific wo
Page 21 and 22: Introduction.nb 5 A plane can be re
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Page 27 and 28: Introduction.nb 11 ¥ Scalars facto
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Page 41 and 42: TheExteriorProduct.nb 2 � Calcula
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TheExteriorProduct.nb 18 BasisTable
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TheExteriorProduct.nb 20 That is: e
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TheExteriorProduct.nb 22 CobasisPal
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TheExteriorProduct.nb 24 � 1 The
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TheExteriorProduct.nb 26 ��
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TheExteriorProduct.nb 28 Let ei m b
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TheExteriorProduct.nb 30 Α1 � Α
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TheExteriorProduct.nb 32 2.9 Soluti
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TheExteriorProduct.nb 34 Evaluating
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TheExteriorProduct.nb 36 ��Α 2
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TheExteriorProduct.nb 38 Division b
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TheRegressiveProduct.nb 2 3.9 Produ
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TheRegressiveProduct.nb 4 The grade
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TheRegressiveProduct.nb 6 � �8:
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TheRegressiveProduct.nb 8 The inver
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TheRegressiveProduct.nb 10 1. Repla
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TheRegressiveProduct.nb 12 Example
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TheRegressiveProduct.nb 14 Here we
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TheRegressiveProduct.nb 16 Extendin
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TheRegressiveProduct.nb 18 Finally,
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TheRegressiveProduct.nb 20 Example:
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TheRegressiveProduct.nb 22 � Auto
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TheRegressiveProduct.nb 24 Y � Cr
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TheRegressiveProduct.nb 26 e1 �
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TheRegressiveProduct.nb 28 Similarl
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TheRegressiveProduct.nb 30 A 3 �
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TheRegressiveProduct.nb 32 Provided
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TheRegressiveProduct.nb 34 n � i
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TheRegressiveProduct.nb 36 � A 2-
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TheRegressiveProduct.nb 38 SimpleQ
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TheRegressiveProduct.nb 40 �Α m
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TheRegressiveProduct.nb 42 x p �
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TheRegressiveProduct.nb 44 Here the
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4 Geometric Interpretations 4.1 Int
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GeometricInterpretations.nb 3 and t
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GeometricInterpretations.nb 5 Sir W
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GeometricInterpretations.nb 7 A not
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GeometricInterpretations.nb 9 The g
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GeometricInterpretations.nb 11 simp
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GeometricInterpretations.nb 27 Alte
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GeometricInterpretations.nb 33 P1
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TheComplement.nb 2 � Converting t
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TheComplement.nb 4 5.2 Axioms for t
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TheComplement.nb 6 essential underp
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TheComplement.nb 8 ��
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TheComplement.nb 10 Basis elements
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TheComplement.nb 12 ei m ��
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TheComplement.nb 14 Relating exteri
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TheComplement.nb 18 The default met
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TheComplement.nb 20 �3; DeclareMe
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TheComplement.nb 22 We can transfor
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TheComplement.nb 24 2 2 2 ��1,3
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TheComplement.nb 26 � Simplifying
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TheComplement.nb 28 ComplementTable
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TheComplement.nb 32 hence can be fa
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TheComplement.nb 38 ei m The comple
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TheComplement.nb 40 e i ��
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TheComplement.nb 42 Α m �Α1 �
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TheInteriorProduct.nb 2 6.9 The Cro
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TheInteriorProduct.nb 4 An alternat
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TheInteriorProduct.nb 6 ��
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TheInteriorProduct.nb 8 ToScalarPro
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TheInteriorProduct.nb 14 InteriorCo
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TheInteriorProduct.nb 16 Thus Α 3
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TheInteriorProduct.nb 18 Det�Deve
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TheInteriorProduct.nb 20 If Α is e
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TheInteriorProduct.nb 22 Measure�
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TheInteriorProduct.nb 24 The measur
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TheInteriorProduct.nb 26 6.7 The In
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TheInteriorProduct.nb 30 Interior p
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TheInteriorProduct.nb 32 �Α m
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TheInteriorProduct.nb 34 Implicatio
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TheInteriorProduct.nb 36 Α m �
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TheInteriorProduct.nb 38 Or, more s
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TheInteriorProduct.nb 40 � ��
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TheInteriorProduct.nb 42 � The an
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TheInteriorProduct.nb 44 6.15 Histo
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ExploringScrewAlgebra.nb 2 The obje
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ExploringScrewAlgebra.nb 4 so that
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ExploringScrewAlgebra.nb 6 The comp
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ExploringScrewAlgebra.nb 8 S ��
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8 Exploring Mechanics 8.1 Introduct
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ExploringMechanics.nb 3 every 'line
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ExploringMechanics.nb 5 � � P
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ExploringMechanics.nb 7 8.3 Momentu
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ExploringMechanics.nb 9 The bound v
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ExploringMechanics.nb 11 8.4 Newton
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ExploringMechanics.nb 13 8.7 The Ve
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ExploringGrassmannAlgebra.nb 2 �
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ExploringGrassmannAlgebra.nb 4 Decl
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ExploringGrassmannAlgebra.nb 6 �3
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10 Exploring the Generalized Grassm
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ExpTheGeneralizedProduct.nb 3 For b
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ExpTheGeneralizedProduct.nb 5 Α m
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ExpTheGeneralizedProduct.nb 7 It is
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ExpTheGeneralizedProduct.nb 11 Exam
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11 Exploring Hypercomplex Algebra 1
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12 Exploring Clifford Algebra 12.1
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ExploringCliffordAlgebra.nb 3 12.17
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ExploringCliffordAlgebra.nb 53 2001
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ExplorGrassmannMatrixAlgebra.nb 2 1
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A Brief Biography of Grassmann Herm
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ABriefBiographyOfGrassmann.nb 3 I h
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Declarations �n �n declare a li
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Glossary To be completed. Ausdehnun
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Glossary.nb 3 Grade The grade of an
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Glossary.nb 5 Physical entities Poi
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Bibliography To be completed Armstr
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Bibliography2.nb 3 Clifford W K 187
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Bibliography2.nb 5 quaternions and
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Grassmann Algebra

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