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    The cross-ratio of collinear point quadruples is an invar... — Carmelics
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    Home/Modality & Possibility
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    Supports→Metric properties of a geometry can be defined intrinsically using projective invariants rather than by convention from a numerical manifold.

    The cross-ratio of collinear point quadruples is an invariant of the projective group.

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    Related propositions within the same area of thought.
    A certain function of this cross-ratio behaves like an ordinary distance functio...By fixing a conic κ and ranging point pairs over the region bounded by κ, the cr...Metric properties of a geometry can be defined intrinsically using projective in...The collineations mapping a given conic onto itself form a group under which thi...

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    Cross-ratio can be defined intrinsically in projective geometry using ...84%Because quadruples of collinear points are not freely transitive under...82%No transformation in the projective group can map an arbitrary quadrup...80%The cross-ratio of four collinear points P, Q, R, S is uniquely determ...79%

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    SEP: geometry-19th
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    Can metric properties be fixed in this way? Traditionally one defines the distance between two points (x1, … ,xn) and (y1, … ,yn) of a numerical manifold as the positive square root of (x1 − y1) 2 + … + (xn − y n)2. The group of isometries consists of the transformations that preserve this function. However, this is just a convention, adopted to ensure that the geometry is Euclidean. Using projective geometry, Klein thought of something better. No real-valued function of point pairs, defined on

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