ミンコフスキーの不等式
1. Minkowski inequalityIn mathematical analysis, the Minkowski inequality establishes that the L spaces are normed vector spaces. Let S be a measure space, let 1 ≤ p ≤ ∞ and let f and g be elements of L(S). Then f + g is in L(S), and we have the triangle inequality with equality for 1 < p < ∞ if and only if f and g are positively linearly dependent, i.e. , f = g for some ≥ 0.
Read “Minkowski inequality” on English Wikipedia
Read “ミンコフスキーの不等式” on Japanese Wikipedia
Read “Minkowski inequality” on DBpedia
Read “Minkowski inequality” on English Wikipedia
Read “ミンコフスキーの不等式” on Japanese Wikipedia
Read “Minkowski inequality” on DBpedia
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