2017
DOI: 10.1007/s00454-016-9843-x
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Packings of Equal Disks in a Square Torus

Abstract: Packings of equal disks in the plane are known to have density at most π/ √ 12, although this density is never achieved in the square torus, which is what we call the plane modulo the square lattice. We find packings of disks in a square torus that we conjecture to be the most dense for certain numbers of packing disks, using continued fractions to approximate 1/ √ 3 and 2 − √ 3. We also define a constant to measure the efficiency of a packing motived by a related constant due to Markov for continued fractions… Show more

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Cited by 1 publication
(2 citation statements)
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“…Thesis [28] for quite a few conjectures for the most dense packings in various containers. Note that the most dense packings conjectured in [12] agree with those in [28]. For provably most dense packings for fixed square and triangular tori, for small numbers of disks there are the results in [11,30,12].…”
Section: Remarks and Related Worksupporting
confidence: 73%
See 1 more Smart Citation
“…Thesis [28] for quite a few conjectures for the most dense packings in various containers. Note that the most dense packings conjectured in [12] agree with those in [28]. For provably most dense packings for fixed square and triangular tori, for small numbers of disks there are the results in [11,30,12].…”
Section: Remarks and Related Worksupporting
confidence: 73%
“…Another interesting aspect of the ideas here is that we connect some of the principles of the rigidity theory of jammed packings as in the work of Will Dickinson et al [12], Oleg Musin and Anton Nikitenko [30], [13], and [12], with another theory of analytic circle packings as in the book of Kenneth Stephenson [33]. There are essentially two seemingly independent methods of creating a circle packing.…”
Section: Introductionmentioning
confidence: 99%