Lie theory and the Chern–Weil homomorphism

Abstract: Abstract. Let P → B be a principal G-bundle. For any connection θ on P , the Chern-Weil construction of characteristic classes defines an algebra homomorphism from the Weil algebra W g = Sg * ⊗ ∧g * into the algebra of differential forms A = Ω(P ). Invariant polynomials (Sg * )inv ⊂ W g map to cocycles, and the induced map in cohomology (Sg * )inv → H(A basic ) is independent of the choice of θ. The algebra Ω(P ) is an example of a commutative g-differential algebra with connection, as introduced by H. Cartan … Show more

“…The component P (2,0) consists of a family of holomorphic bidifferential operators on X for any open subset U α in U: Identity (A.6) can be written more explicitly as…”

Lectures on Duflo Isomorphisms in Lie Algebra and Complex Geometry

“…The component P (2,0) consists of a family of holomorphic bidifferential operators on X for any open subset U α in U: Identity (A.6) can be written more explicitly as…”

Lectures on Duflo Isomorphisms in Lie Algebra and Complex Geometry

“…In order to obtain the most natural results, this degree three element is a necessary ingredient in the Dirac operator (see (2.6)). For example, the cubic term is needed for the following: (i) a simple formula for the square of the Dirac operator [8], (ii) a generalization of the Borel-Weil-Bott theorem [9], (iii) a strong connection with infinitesimal character [7, Section 7]; [1,10] and (iv) Lemma 2.5 below.…”

“…There are also interesting recent results in terms of (the algebraic version of) Kostant's cubic Dirac operator. See, for example, [1,7,10].…”

Principal series representations and harmonic spinors

“…Their cohomology classes do not depend on the connection. Thirdly and finally we construct the algebra Weil homomorphism I(G) → H even DR (M ) [145] which associates de Rham cohomology classes with the closed forms on M previously obtained.…”

Universal Coefficient Theorem and Quantum Field Theory