The real Betti realization of motivic Thom spectra and of very effective Hermitian K-theory

Abstract

Real Betti realization is a symmetric monoidal functor from the category of motivic spectra to that of topological spectra, extending the functor that associates to a scheme over R the space of its real points. In this article, we prove some results about the real Betti realizations of certain motivic E1- and E∞-rings. We show that the motivic Thom spectrum functor and the topological one correspond to each other, as symmetric monoidal functors, under real (and complex) realization. In particular, we obtain equivalences of E∞-rings between the real realizations of the variants MGL, MSL, and MSp of algebraic cobordism, and the variants MO, MSO, and MU of topological cobordism, respectively. Using this, we identify the E1-ring structure on the real realization of ko, the very effective cover of Hermitian K-theory, by an explicit 2-local fracture square, as being equivalent to L(R)≥ 0, the connective L-theory spectrum of R.