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· 2014 · DOI 10.1090/surv/201

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Topological Elliptic Genera I -- The mathematical foundation

math.AT · 2024-12-03 · unverdicted · novelty 7.0

Constructs topological elliptic genera as G-equivariant refinements of classical elliptic genera and derives a divisibility result for Euler numbers of Sp-manifolds.

Chromatic defect, Wood's theorem, and higher real $K$-theories

math.AT · 2024-02-27 · unverdicted · novelty 6.0

Introduces chromatic defect via X(n), computes it for key spectra, develops an obstruction theory, and shows Wood-like equivalences exist generally to construct Z-indexed Adams-Novikov towers.

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Topological Elliptic Genera I -- The mathematical foundation math.AT · 2024-12-03 · unverdicted · none · ref 11
Constructs topological elliptic genera as G-equivariant refinements of classical elliptic genera and derives a divisibility result for Euler numbers of Sp-manifolds.
Chromatic defect, Wood's theorem, and higher real $K$-theories math.AT · 2024-02-27 · unverdicted · none · ref 22
Introduces chromatic defect via X(n), computes it for key spectra, develops an obstruction theory, and shows Wood-like equivalences exist generally to construct Z-indexed Adams-Novikov towers.

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