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Erlangen program
13 Circles and Cross Ratio
Projective Geometry: a Short Introduction
Projective Coordinates and Compactification in Elliptic, Parabolic and Hyperbolic 2-D Geometry
Lie Group and Geometry on the Lie Group SL2(R)
Concept of Symmetry in Closure Spaces As a Tool for Naturalization of Information
Cassirer and the Structural Turn in Modern Geometry
Cycles Cross Ratio: an Invitation
The Concept of Manifold, 1850-1950
Geometric Modelling Summer 2018
Symmetry-Based Generative Design: a Teaching Experiment
Erlangen Program at Large-1: Geometry of Invariants
The Erlangen Program Revisited: a Didactic Perspective
A Historical Overview of Connections in Geometry A
Grassmannian Algebras and the Erlangen Program with Emphasis on Projective Geometry Jos´Eg
Impedance and Power Transformations by the Isometric Circle Method and Non-Euclidean Hyperbolic Geometry
Sophus Lie and Felix Klein: the Erlangen Program and Its Impact in Mathematics and Physics
Henri Poincaré and the Epistemological Interpretation of the Erlangen Program Philosophia Scientiæ, Tome 1, No 4 (1996), P
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Top View
7 X 11 Long.P65
Klein's" Erlanger Programm": Do Traces of It Exist in Physical Theories?
Erlangen Program at Large–1: Geometry of Invariants
Hyperbolic Geometry, Möbius Transformations, and Geometric Optimization
Pre-Publication Accepted Manuscript
A Generalized Cross Ratio 3
Non-Euclidean Biosymmetries and Algebraic Harmony in Genomes of Higher and Lower Organisms
An Introduction to Kleinian Geometry Via Lie Groups
Erlangen Program in Geometry and Analysis: The
Erlangen Program at Large - 1 : Geometry of Invariants Vladimir V
Projections and Dimensions
Geometry and Topology Miles Reid and Balazs Szendroi Frontmatter More Information
Introduction
Research School a View of F. Klein's Erlangen Program Through GA
On Klein's So-Called Non-Euclidean Geometry