Stringy K-theory and the Chern character

Abstract: For a finite group G acting on a smooth projective variety X, we construct two new G-equivariant rings: first the stringy K-theory of X, and second the stringy cohomology of X. For a smooth Deligne-Mumford stack Y we also construct a new ring called the full orbifold K-theory of Y. For a global quotient Y=[X/G], the ring of G-invariants of the stringy K-theory of X is a subalgebra of the full orbifold K-theory of the the stack Y and is linearly isomorphic to the ``orbifold K-theory'' of Adem-Ruan (and hence At… Show more

“…We will use the following description of the Euler class of the obstruction bundle: Proposition 3.3 (see [7], [9]). …”

“…In Section 5.2 we use the Chern character homomorphism in [9] to show that the Chern character is an ring isomorphism.…”

“…Define W v,k to be the eigenbundle of W v , where v acts by multiplication by ζ k = e 2πik/r . Following [9], we define…”

On the <i>K</i>-theory of Toric Stack Bundles

“…We will use the following description of the Euler class of the obstruction bundle: Proposition 3.3 (see [7], [9]). …”

“…In Section 5.2 we use the Chern character homomorphism in [9] to show that the Chern character is an ring isomorphism.…”

“…Define W v,k to be the eigenbundle of W v , where v acts by multiplication by ζ k = e 2πik/r . Following [9], we define…”

On the <i>K</i>-theory of Toric Stack Bundles

“…We construct a stringy ring on the K-theory of the Borel construction of the inertia orbifold, similar to the stringy structure in K-theory that was defined in [JKK07]. This construction does not need rational coefficients either, and it uses the same principle of the stringy product.…”

“…Applying a calibrated Chern character map (mainly due to Jarvis-KaufmannKimura [JKK07]), we were able to prove that there is a ring homomorphism between the stringy ring on the K-theory of the inertia orbifold and the Chen-Ruan cohomology of the orbifold. We come to the conclusion that the right place to study stringy products is K-theory and not cohomology; this is due to the fact that the torsion classes in the stringy K-theory are present.…”

Stringy product on twisted orbifold K-theory for abelian quotients

Lectures on Gromov–Witten Invariants of Orbifolds