The special linear version of the projective bundle theorem

Abstract

A special linear Grassmann variety SGr(k,n) is the complement to the zero section of the determinant of the tautological vector bundle over Gr(k,n). For a representable ring cohomology theory A(-) with a special linear orientation and invertible stable Hopf map η, including Witt groups and MSL[η-1], we have A(SGr(2,2n+1))=A(pt)[e]/(e2n), and A(SGr(2,2n)) is a truncated polynomial algebra in two variables over A(pt). A splitting principle for such theories is established. We use the computations for the special linear Grassmann varieties to calculate A(BSLn) in terms of the homogeneous power series in certain characteristic classes of the tautological bundle.