Basic Topics of Projective Geometry
- Fundamentals 1
Elements and Elementary Incidence
- Fundamentals 2
Intervals:- Types, Equivalence and Identity
- Projective comparison 0
Perspectivity
- Projective comparison 1
Projectivity
- Projective comparison 2
Desargues
- Projective comparison 3
Skew Intervals
- Projective comparison 4
Two Intervals on a Line
- Projective comparison 5
Iteration of Identical Intervals: Projective Rulers
- Projective comparison 6
Intervals:- Inidentity, Non-equivalence, Mismatch
- Projective comparison 7
Replication of a Ruler “In Place”
- Projective comparison 8
Formal Proof of Invariant Incidence via Desargues Theorem
- Projective comparison 9
Skewed Equivalent Rulers and the possible Emergence of a Strictly
Projective Curve
- Projective comparison 10
Questions of Continuity, and, The Fundamental Theorem (under
development)
- Projective comparison 11
Line-wise and Point-wise Conics, from Duality —
with a Euclidean Fudge. First Intimations of Imaginary
Elements.
- Projective comparison 12
Projective Motion of Elements:- (1) Of a Point in a Line
(under development)
- Projective comparison 13
Comparison of Interlinear Intervals - Intervals formed by Two Lines
Incident in a Point, and with a Plane.
- Projective comparison 14
Comparison of Interplanar Intervals - Intervals formed by Two Planes
Incident in a Line (still to come).
- Projective comparison 15
Two Perpectivities in One Centre. The Harmonic Quadrilateral. Fixed Duality - Polarity.
Further
Basic Topics are Pending
- Imaginary Elements
Consider a Ball in a Box.
- Discussions (1)
Concerning Conservation of Incidence, Continuity and Projective
Surfaces
- The Tetrahedral Complex
Because Hyperboloids are not Surfaces
- On Real Linear Measure A Demo, excluding the Imaginary
- On Imaginary Measure A Demo, including the Imaginary
- 1 to 1 Correspondence Resolution of a Difficulty with Euclid
- Desargues: Five planes Desargues Theorem arises automatically as the Incidence of Any Five
Planes