Packings in real projective spaces

July 05, 2017 Β· Declared Dead Β· πŸ› SIAM Journal on applied algebra and geometry

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Authors Matthew Fickus, John Jasper, Dustin G. Mixon arXiv ID 1707.01858 Category math.MG Cross-listed cs.IT, math.CO Citations 34 Venue SIAM Journal on applied algebra and geometry Last Checked 1 month ago
Abstract
This paper applies techniques from algebraic and differential geometry to determine how to best pack points in real projective spaces. We present a computer-assisted proof of the optimality of a particular 6-packing in $\mathbb{R}\mathbf{P}^3$, we introduce a linear-time constant-factor approximation algorithm for packing in the so-called Gerzon range, and we provide local optimality certificates for two infinite families of packings. Finally, we present perfected versions of various putatively optimal packings from Sloane's online database, along with a handful of infinite families they suggest, and we prove that these packings enjoy a certain weak notion of optimality.
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