Using methods developed by Franke, we obtain algebraic classification results
for modules over certain symmetric ring spectra (S-algebras). In particular,
for any symmetric ring spectrum R whose graded homotopy ring π∗R has
graded global homological dimension 2 and is concentrated in degrees divisible
by some natural number N≥4, we prove that the homotopy category of
R-modules is equivalent to the derived category of the homotopy ring
π∗R. This improves the Bousfield-Wolbert algebraic classification of
isomorphism classes of objects of the homotopy category of R-modules. The
main examples of ring spectra to which our result applies are the p-local
real connective K-theory spectrum ko(p), the Johnson-Wilson spectrum
E(2), and the truncated Brown-Peterson spectrum BP, for an odd prime p.Comment: 39 page
