A topological model for cellular motivic spectra

Abstract

For any motivic E∞-ring spectrum A we construct an equivalence between the ∞-category of cellular motivic A-module spectra and modules over an E1-algebra in Z -graded spectra, under which the motivic grading corresponds to the Z-grading. If the base is the complex numbers or if A admits an E∞-orientation, we refine the E1-algebra to an E∞-algebra and to a symmetric monoidal equivalence. To capture the symmetric monoidal structure in the general situation, we lift to a symmetric monoidal equivalence to modules over an E∞-algebra in J -graded spectra that invert morphisms of J, where J is the diagram category of Sagave-Schlichtkrull, a model for Quillen's localization of the groupoid of finite sets and bijections.