Introduction to the Category of Derived Motivic Spectra

Abstract: We formalize an abstraction of Grothendieck's philosophy of motives and construct a category of derived motivic spectra in the Segal category $\mathbb{R} \underline{\text{Hom}} ((\text{dSt}k)^{\text{op}}{/F}, \text{Top})$ ($\text{dSt}k$ the Segal category of derived stacks on s$k$-Alg, Top = $L \text{Set}{\Delta}$ the Segal category of simplicial sets), thereby providing a starting point for a construction of a stable motivic homotopy category in the Segal setting.