Chromatic Homotopy is Monoidally Algebraic at Large Primes

Abstract

Fix a prime p and a chromatic height h. We prove that the homotopy (k,1)-category of Lh-local spectra hk(Spp,h) is algebraic as a symmetric monoidal category when p > O(h2+kh). To achieve this, we develop a general tool for investigating such algebraicity questions, based on an operadic variant of Goerss-Hopkins obstruction theory. Other applications include the monoidal algebraicity of modules over the Lubin-Tate spectrum hk(ModEp,h) whenever p >O(kh), from which we deduce that h1 (ModKU(p)) and h1(ModKO(p)) are algebraic as tt-categories if and only if p is odd.