Riemann-Roch theorem for smooth manifolds

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In mathematics, a Riemann-Roch theorem for smooth manifolds is a version of results such as the Hirzebruch-Riemann-Roch theorem or Grothendieck-Riemann-Roch theorem (GRR) without a hypothesis making the smooth manifolds involved carry a complex structure. Results of this kind were obtained by Michael Atiyah and Friedrich Hirzebruch in 1959, reducing the requirements to something like a spin structure.

In their paper Riemann-Roch theorems for differentiable manifolds (Bull. Amer. Math. Soc. 65 (1959) 276-281) they define, for oriented smooth closed manifolds X and Y and a continuous mapping

f: Y → X

that f is a c₁-map if there is c₁ in the integral cohomology group

H²(Y, Z)

such that for the Stiefel-Whitney classes w₂ we have

c₁ = w₂(Y) − f^*(w₂(X) modulo 2

in

H²(Y, Z/2Z).

Writing ch(X) for the image in H^*(X, Q) they showed that for f a c₁-map there is

f_!: ch(Y) → ch(X)

which is a homomorphism of abelian groups, and satisfying

f_!(y)A^(X) = f_*(y.exp(c₁)/2)A^(Y)),

where A^ is the A-hat genus and f_* the Gysin homomorphism. This mimics the GRR theorem; but f_! has only an implicit definition.

This they specialised and refined in the case X = a point, where the condition becomes the existence of a spin structure on Y. Corollaries are on Pontryagin classes and the J-homomorphism.