On lattice tilings of $\mathbb{Z}^n$ by limited magnitude error balls $\mathcal{B}(n,2,k_{1},k_{2})$ with $k_1>k_2$

Tao Zhang

On lattice tilings of Zn by limited magnitude error balls B(n,2,k1,k2) with k1>k2

Abstract

Lattice tilings of Zn by limited-magnitude error balls correspond to linear perfect codes under such error models and play a crucial role in flash memory applications. In this work, we establish three main results. First, we fully determine the existence of lattice tilings by B(n,2,3,0) in all dimensions n. Second, we completely resolve the case k1=k2+1. Finally, we prove that for any integers k1>k20 where k1+k2+1 is composite, no lattice tiling of Zn by the error ball B(n,2,k1,k2) exists for sufficiently large n.

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