Definitions from Wikipedia (Perfect lattice)
▸ noun: In mathematics, a perfect lattice (or perfect form) is a lattice in a Euclidean vector space, that is completely determined by the set S of its minimal vectors in the sense that there is only one positive definite quadratic form taking value 1 at all points of S. Perfect lattices were introduced by .
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▸ noun: In mathematics, a perfect lattice (or perfect form) is a lattice in a Euclidean vector space, that is completely determined by the set S of its minimal vectors in the sense that there is only one positive definite quadratic form taking value 1 at all points of S. Perfect lattices were introduced by .
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▸ Wikipedia articles (New!)
▸ Words that often appear near perfect lattice
▸ Rhymes of perfect lattice
▸ Invented words related to perfect lattice