Higher Algebraic K-Theory of Non-Commutative Gamma Semirings: The Quillen and Waldhausen Spectra
Abstract
In the companion paper~GokavarapuIJPA2025, we developed a classical algebraic K-theory for non-commutative n-ary -semirings (T,) in terms of finitely generated projective n-ary -modules and their automorphisms, and we identified the low K-groups K0(T,) and K1(T,) with appropriate Grothendieck and Whitehead groups. The present paper continues this programme by constructing and comparing several models for the higher algebraic K-theory of (T,). Starting from the Quillen-exact category C := T-Modbi of bi-finite, slot-sensitive n-ary -modules introduced earlier, we define the higher K-groups Kn(T,) via Quillen's Q-construction~Quillen73 on C and via Waldhausen's S-construction~Waldhausen85 on the Waldhausen category of bounded chain complexes in C. We prove a Gillet--Waldhausen type comparison theorem~GilletGrayson87 showing that the resulting Quillen and Waldhausen K-theory spectra are canonically weakly equivalent. Using dg-enhancements and the derived category of quasi-coherent sheaves on the non-commutative spectrum SpecTnc(T)~GokavarapuJRMS2266, we further identify these spectra with the K-theory of the small stable ∞-category of perfect complexes~Thomason90. As consequences, we obtain functoriality, localization, and excision sequences~Weibel13, and a derived Morita invariance statement for Kn(T,)~Keller94. These results show that algebraic K-theory of non-commutative n-ary -semirings is a derived-geometric invariant of Specnc(T) and reduce concrete computations to geometric d\'evissage and homological techniques developed in the earlier papers of the series.
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