In this article we continue the development of a theory of noncommutative motives, initiated in [30]. We construct categories of A(1)-homotopy noncommutative motives, describe their universal properties, and compute their spectra of morphisms in terms of Karoubi Villamayor's K-theory (K V) and Weibel's homotopy K-theory (KH). As an application, we obtain a complete classification of all the natural transformations defined on KV,KH. This leads to a streamlined construction of Weibel's homotopy Chern character from KV to periodic cyclic homology. Along the way we extend Dwyer Friedlander's etale K-theory to the noncommutative world, and develop the universal procedure of forcing a functor to preserve filtered homotopy colimits.

• 出版日期2015
• 单位MIT