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.
On the formal group laws of unoriented and complex cobordism theory
2 Pith papers cite this work. Polarity classification is still indexing.
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Short proof of Real Snaith equivalences via Wilson spaces yields E6 orientations, recovers E2ρ-structure on Real BP, and computes THR(KUR) and THR(MUPR) using a norm-inverted variant via nilpotence.
citing papers explorer
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Chromatic defect, Wood's theorem, and higher real $K$-theories
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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Structured Real Snaith Equivalences
Short proof of Real Snaith equivalences via Wilson spaces yields E6 orientations, recovers E2ρ-structure on Real BP, and computes THR(KUR) and THR(MUPR) using a norm-inverted variant via nilpotence.