Lie theory and the Chern-Weil homomorphism

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In which book or scientific article of encounter the construction of the characteristic classes of Chern-Weil by means of Lie algebras.
I found an article titled "Lie theory and the Chern-Weil homomorphism " by A. Alekseev and E. Meinrenken, some demonstrations I can not understand.
Thanks for your help.




lie-derivative




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  • Everything is about Lie algebra-valued curvature forms, so any reference will do. You can look at Chern's Complex Manifolds without Potential Theory (particularly the second edition) or any number of more modern sources.
    – Ted Shifrin
    Jul 26 at 1:19














up vote
0
down vote

favorite












In which book or scientific article of encounter the construction of the characteristic classes of Chern-Weil by means of Lie algebras.
I found an article titled "Lie theory and the Chern-Weil homomorphism " by A. Alekseev and E. Meinrenken, some demonstrations I can not understand.
Thanks for your help.




lie-derivative




share|cite|improve this question



















  • Everything is about Lie algebra-valued curvature forms, so any reference will do. You can look at Chern's Complex Manifolds without Potential Theory (particularly the second edition) or any number of more modern sources.
    – Ted Shifrin
    Jul 26 at 1:19












up vote
0
down vote

favorite









up vote
0
down vote

favorite











In which book or scientific article of encounter the construction of the characteristic classes of Chern-Weil by means of Lie algebras.
I found an article titled "Lie theory and the Chern-Weil homomorphism " by A. Alekseev and E. Meinrenken, some demonstrations I can not understand.
Thanks for your help.




lie-derivative




share|cite|improve this question











In which book or scientific article of encounter the construction of the characteristic classes of Chern-Weil by means of Lie algebras.
I found an article titled "Lie theory and the Chern-Weil homomorphism " by A. Alekseev and E. Meinrenken, some demonstrations I can not understand.
Thanks for your help.





lie-derivative





share|cite|improve this question










share|cite|improve this question




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asked Jul 26 at 1:02









Victor Huuanca Sullca

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  • Everything is about Lie algebra-valued curvature forms, so any reference will do. You can look at Chern's Complex Manifolds without Potential Theory (particularly the second edition) or any number of more modern sources.
    – Ted Shifrin
    Jul 26 at 1:19
















  • Everything is about Lie algebra-valued curvature forms, so any reference will do. You can look at Chern's Complex Manifolds without Potential Theory (particularly the second edition) or any number of more modern sources.
    – Ted Shifrin
    Jul 26 at 1:19















Everything is about Lie algebra-valued curvature forms, so any reference will do. You can look at Chern's Complex Manifolds without Potential Theory (particularly the second edition) or any number of more modern sources.
– Ted Shifrin
Jul 26 at 1:19




Everything is about Lie algebra-valued curvature forms, so any reference will do. You can look at Chern's Complex Manifolds without Potential Theory (particularly the second edition) or any number of more modern sources.
– Ted Shifrin
Jul 26 at 1:19















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