Complex cobordism with involutions and geometric orientations

Abstract

We calculate the cobordism ring C2* of stably almost complex manifolds with involution, and investigate the C2-spectrum C2 which represents it. We introduce the notion of a geometrically oriented C2-spectrum, which extends the notion of a complex oriented C2-spectrum, and of which C2 is the universal example. Examples, in addition to C2, include the Eilenberg-Maclane spectrum H ZC2 and the connective cover kC2 of C2-equivariant K-theory. On the algebraic side, we define and study filtered C2-equivariant formal group laws, which are the algebraic structures determined by geometrically oriented C2-spectra. We prove some of the fundamental properties of filtered C2-equivariant formal group laws, as well as a universality statement for the filtered C2-equivariant formal group law determined by C2.