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The framework is based on projective geometry, which is the natural language for describing the geometry of multiple views. The affine and Euclidean geometries are regarded as special cases of projective geometry.

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The analysis includes points, lines, quadrics and curved surfaces. Several new reconstruction methods are developed. Some features of these methods include the possibility of handling: i missing data, ii several different primitives simultaneously and iii minimal cases.


This problem is known as auto-calibration. Citations Publications citing this paper.

Proof of Atiyah's conjecture for two special types of configurations Dragomir Z. Towards the Atiyah-Sutcliffe conjectures for coplanar hyperbolic points Joseph Malkoun. Anyons in geometric models of matter Michael Atiyah , Matilde Marcolli.

On the geometry of quantum indistinguishability A. References Publications referenced by this paper.

The geometry of classical particles Michael Atiyah. The geometry of point particles. Cambridge , P.

Points, Lines, Planes, Segments, & Rays - Collinear vs Coplanar Points - Geometry

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