On p-adic Gram-Schmidt Orthogonalization Process
Abstract
In his famous book ``Basic Number Theory", Weil proved several theorems about the existence of norm-orthogonal bases in finite-dimensional vector spaces and lattices over local fields. In this paper, we transform Weil's proofs into algorithms for finding out various norm-orthogonal bases. These algorithms are closely related to the recently introduced closest vector problem (CVP) in p-adic lattices and they have applications in cryptography based on p-adic lattices.
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