AbstractIn the spirit of “The Fundamental Theorem for the algebraic K-theory of spaces: I” (J. Pure Appl. Algebra 160 (2001) 21–52) we introduce a category of sheaves of topological spaces on n-dimensional projective space and present a calculation of its K-theory, a “non-linear” analogue of Quillen's isomorphism Ki(PRn)≅⊕0nKi(R)
In this paper, we study K-theory of spectral schemes by using locally free sheaves. Let us regard th...
In this paper, we study K-theory of spectral schemes by using locally free sheaves. Let us regard th...
We use techniques from both real and complex algebraic geometry to study K-theoretic and related inv...
Hüttemann T, Klein JR, Vogell W, Waldhausen F, Williams B. The "fundamental theorem" for the algebra...
AbstractLet X↦A(X) denote the algebraic K-theory of spaces functor. The main objective of this paper...
AbstractThe semi-topological K-theory K∗semi(X) of a quasi-projective complex algebraic variety X is...
The algebraic $K$-theory of Waldhausen $\infty$-categories is the functor corepresented by the unit ...
Hüttemann T. Algebraic K-theory of non-linear projective spaces. Bielefeld (Germany): Bielefeld Univ...
Hüttemann T. Algebraic K-theory of non-linear projective spaces. Bielefeld (Germany): Bielefeld Univ...
summary:This paper gives an exposition of algebraic K-theory, which studies functors $K_n:\text{Ring...
summary:This paper gives an exposition of algebraic K-theory, which studies functors $K_n:\text{Ring...
Hüttemann T, Klein JR, Vogell W, Waldhausen F, Williams B. The "fundamental theorem" for the algebra...
We study relative algebraic K-theory of admissible Zariski-Riemann spaces and prove that it is equiv...
AbstractLet X↦A(X) denote the algebraic K-theory of spaces functor. In the first paper of this serie...
We will work over a quasi-projective variety over a field, though many statements will work for arbi...
In this paper, we study K-theory of spectral schemes by using locally free sheaves. Let us regard th...
In this paper, we study K-theory of spectral schemes by using locally free sheaves. Let us regard th...
We use techniques from both real and complex algebraic geometry to study K-theoretic and related inv...
Hüttemann T, Klein JR, Vogell W, Waldhausen F, Williams B. The "fundamental theorem" for the algebra...
AbstractLet X↦A(X) denote the algebraic K-theory of spaces functor. The main objective of this paper...
AbstractThe semi-topological K-theory K∗semi(X) of a quasi-projective complex algebraic variety X is...
The algebraic $K$-theory of Waldhausen $\infty$-categories is the functor corepresented by the unit ...
Hüttemann T. Algebraic K-theory of non-linear projective spaces. Bielefeld (Germany): Bielefeld Univ...
Hüttemann T. Algebraic K-theory of non-linear projective spaces. Bielefeld (Germany): Bielefeld Univ...
summary:This paper gives an exposition of algebraic K-theory, which studies functors $K_n:\text{Ring...
summary:This paper gives an exposition of algebraic K-theory, which studies functors $K_n:\text{Ring...
Hüttemann T, Klein JR, Vogell W, Waldhausen F, Williams B. The "fundamental theorem" for the algebra...
We study relative algebraic K-theory of admissible Zariski-Riemann spaces and prove that it is equiv...
AbstractLet X↦A(X) denote the algebraic K-theory of spaces functor. In the first paper of this serie...
We will work over a quasi-projective variety over a field, though many statements will work for arbi...
In this paper, we study K-theory of spectral schemes by using locally free sheaves. Let us regard th...
In this paper, we study K-theory of spectral schemes by using locally free sheaves. Let us regard th...
We use techniques from both real and complex algebraic geometry to study K-theoretic and related inv...
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