On exotic equivalences and a theorem of Franke

Abstract

Using Franke's methods we construct new examples of exotic equivalences. We show that for any symmetric ring spectrum R whose graded homotopy ring π*R is concentrated in dimensions divisible by a natural number N ≥ 5 and has homological dimension at most three, the homotopy category of R-modules is equivalent to the derived category of π*R. The Johnson-Wilson spectrum E(3) and the truncated Brown-Peterson spectrum BP 2 for any prime p ≥ 5 are our main examples. If additionally the homological dimension of π*R is equal to two, then the homotopy category of R-modules and the derived category of π*R are triangulated equivalent. Here the main examples are E(2) and BP 1 at p ≥ 5. The last part of the paper discusses a triangulated equivalence between the homotopy category of E(1)-local spectra at a prime p ≥ 5 and the derived category of Franke's model. This is a theorem of Franke and we fill a gap in the proof.