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发表于 2025-4-1 03:16:20
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Addictive
发表于 2025-4-1 06:36:53
Real Versus Complex,resulting vector space over . is denoted by . and called the . of the complex vector space .. For every basis .., .., ., .. of . over ., the vectors .., .., ., .., .., .., ., .. form a basis of . over ., because for every . ∈ ., the uniqueness of the expansion . is equivalent to the uniqueness of th
放气
发表于 2025-4-1 14:00:09
Hermitian Spaces,vector . ∈ . with a ... Since . the Hermitian inner product is uniquely recovered from the norm function and the multiplication-by-. operator as . Note that this agrees with the general ideology of Kähler triples from Sect. . on p. 471.