The triangulated categories of framed bispectra and framed motives

Abstract

An alternative approach to the classical Morel-Voevodsky stable motivic homotopy theory SH(k) is suggested. The triangulated category of framed bispectra SHnisfr(k) and effective framed bispectra SHnisfr,eff(k) are introduced in the paper. Both triangulated categories only use Nisnevich local equivalences and have nothing to do with any kind of motivic equivalences. It is shown that SHnisfr(k) and SHnisfr,eff(k) recover the classical Morel-Voevodsky triangulated categories of bispectra SH(k) and effective bispectra SHeff(k) respectively. We also recover SH(k) and SHeff(k) as the triangulated category of framed motivic spectral functors SHS1fr[ Fr0(k)] and the triangulated category of framed motives SHfr(k) respectively constructed in the paper.