A formula for the minimal coordination number of a parallel bundle
E.L. Starostin
TL;DR
This paper derives an exact formula for the minimal coordination number in parallel rod bundles, considering optimal packing scenarios on hexagonal and square lattices.
Contribution
It introduces a precise formula for minimal coordination numbers in parallel rod bundles based on optimal thickening, applicable to hexagonal and square lattice packings.
Findings
Provides an exact formula for minimal coordination numbers.
Applicable to hexagonal and square lattice packings.
Enhances understanding of packing efficiency in rod bundles.
Abstract
An exact formula for the minimal coordination numbers of the parallel packed bundle of rods is presented based on an optimal thickening scenario. Hexagonal and square lattices are considered.
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