The densest double lattice packing of four-spheres

A. C. Woods

doi:10.1112/S0025579300005258

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In an unpublished, dissertation Cleaver [1] proved the following

Theorem 1. If L is a lattice in euclidean four-space R4 of determinant d(L) = 1 and with no pair of its points within unit distance apart then any four-sphere of radius 1 contains a point of L.

References

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Bambah, R.P and Woods, A.C 1980. Minkowski's conjecture for n = 5; a theorem of Skubenko. Journal of Number Theory, Vol. 12, Issue. 1, p. 27.

1987. Geometry of Numbers. Vol. 37, Issue. , p. 632.

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Hans-Gill, R.J. Raka, Madhu Sehmi, Ranjeet and Sucheta 2009. A unified simple proof of a conjecture of Woods for n⩽6. Journal of Number Theory, Vol. 129, Issue. 5, p. 1000.

Hans-Gill, R.J. Raka, Madhu and Sehmi, Ranjeet 2009. On conjectures of Minkowski and Woods for n=7. Journal of Number Theory, Vol. 129, Issue. 5, p. 1011.

Hans-Gill, R. J. Raka, Madhu and Sehmi, Ranjeet 2010. Estimates on Conjectures of Minkowski and woods. Indian Journal of Pure and Applied Mathematics, Vol. 41, Issue. 4, p. 595.

Hans-Gill, R. J. Raka, Madhu and Sehmi, Ranjeet 2011. Estimates on conjectures of Minkowski and woods II. Indian Journal of Pure and Applied Mathematics, Vol. 42, Issue. 5, p. 307.

Kathuria, Leetika Hans-Gill, R. J. and Raka, Madhu 2015. On a question of Uri Shapira and Barak Weiss. Indian Journal of Pure and Applied Mathematics, Vol. 46, Issue. 3, p. 287.

KATHURIA, LEETIKA and RAKA, MADHU 2016. On conjectures of Minkowski and Woods for n = 9. Proceedings - Mathematical Sciences, Vol. 126, Issue. 4, p. 501.

Kathuria, Leetika and Raka, Madhu 2022. On conjectures of Minkowski and Woods for $$\varvec{n=10}$$. Proceedings - Mathematical Sciences, Vol. 132, Issue. 2,

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The densest double lattice packing of four-spheres

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