On the metalinear algebraic cobordism spectrum

Abstract

In this paper, we study the metalinear algebraic cobordism spectrum MML (also sometimes denoted MSLc), which is built from the structure groups of oriented vector bundles. We establish an interpolation between MSL and MML and deduce that the canonical morphism MSL MML admits a retraction. We parametrize all such retractions in the category of MSL-modules and, after fixing one of them, obtain an equivalence MML Σ2,1MGL. As an application of these results, we determine various invariants of the metalinear algebraic cobordism spectrum over a field (after inverting the exponential characteristic). More precisely, we determine the first few Milnor-Witt stems of MML in terms of the very effective algebraic and hermitian K-theory spectra, and the geometric diagonal of MML in terms of Stong's complex-spin cobordism ring. We also compute the slices and use them to describe the category of 2-inverted modules over the E∞-ring spectrum MML.