A New Linear Programming Method in Sphere Packing
Abstract: Inspired by the linear programming method developed by Cohn and Elkies (Ann. Math. 157(2): 689-714, 2003), we introduce a new linear programming method to solve the sphere packing problem. More concretely, we consider sequences of auxiliary functions ${g_m}_{m\in \mathbb{N}{+}}$, where $g_m$ is a $m\Lambda$-periodic auxiliary function defined on $\mathbb{R}n$, with $\Lambda$ being a given full-rank lattice in $\mathbb{R}n$. This new method extends the original approach and offers a greater flexibility. Furthermore, using this new linear programming framework, we construct several effective auxiliary functions for dimensions $n=1,2,3$. We hope this approach provides valuable insights into solving sphere packing problems for $n=2,3$ and even higher dimensions.
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