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Cited by 1,617 publications
(1,442 citation statements)
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“…The Cartesian product ξ × ζ is isomorphic to ρ * 1 (ξ) ⊕ ρ * 2 (ζ) so the Euler class e(ξ × ζ) equals e(ξ) × e(ζ). Hence, if neither e(ξ) nor e(ζ) is zero or a torsion element, then the same holds for e(ξ × ζ); see [14].…”
Section: The Constructionmentioning
confidence: 95%
“…The Cartesian product ξ × ζ is isomorphic to ρ * 1 (ξ) ⊕ ρ * 2 (ζ) so the Euler class e(ξ × ζ) equals e(ξ) × e(ζ). Hence, if neither e(ξ) nor e(ζ) is zero or a torsion element, then the same holds for e(ξ × ζ); see [14].…”
Section: The Constructionmentioning
confidence: 95%
“…According to the above notation the total Chern class of the sheaf W can be expressed as follows [10] c.…”
Section: Chern Classmentioning
confidence: 99%
“…By E = (E, ¥, M) we denote the complex conjugation of the bundle E (see [6]). For any x G M fibres E x and E r coincide as sets.…”
Section: K-thmentioning
confidence: 99%
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