Let $L$ be a full rank lattice in $\mathbb Z^{n}$. For a large real number $K$, how can we make the vector in $L$ whose euclidean norm is small than $K$? I thought that I can find vectors easily in $\mathbb R$-span, but it is hard to find a vector in a lattice.
2026-03-26 22:19:25.1774563565
Lattice vector size reduction
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