We prove that two, apparently different, class-group valued Galois module structure invariants associated to the algebraic $K$-groups of rings of algebraic integers coincide. This comparison result is particularly important in making explicit calculations
Abstract. Using Hausmann and Vogel’s homology sphere bundle interpretation of algebraic K-theory, we...
According to Atiyah, K-theory is that part of linear algebra that studies additive or abelian proper...
Suppose N/L is a finite Galois extension of number fields, and L contains an imaginary quadratic fie...
Abstract. We prove that two, apparently different, class-group valued Galois module structure invari...
Galois module structure deals with the construction of algebraic invariants from a Galois extension ...
Abstract. We establish the equivalence of two definitions of invariants measuring the Galois module ...
Throughout number theory and arithmetic-algebraic geometry one encounters objects endowed with a nat...
We compare two approaches to the study of Galois module structures: on the one hand, factor equivale...
ABSTRACT. Using Hausmann and Vogel's homology sphere bundle interpretation of algebraic K-theor...
The book focuses on the relation between transformation groups and algebraic K-theory. The general p...
We prove very general index formulae for integral Galois modules, specifically for units in rings of...
de Smit We prove very general index formulae for integral Galois modules, specifically for units in ...
In the early 1970s, Morava studied forms of topological K-theory and observed that they have interes...
This paper generalises Chinburg's construction [4, 5] of invariants in the class group of an in...
Suppose N/L is a finite Galois extension of number fields, and L contains an imaginary quadratic fie...
Abstract. Using Hausmann and Vogel’s homology sphere bundle interpretation of algebraic K-theory, we...
According to Atiyah, K-theory is that part of linear algebra that studies additive or abelian proper...
Suppose N/L is a finite Galois extension of number fields, and L contains an imaginary quadratic fie...
Abstract. We prove that two, apparently different, class-group valued Galois module structure invari...
Galois module structure deals with the construction of algebraic invariants from a Galois extension ...
Abstract. We establish the equivalence of two definitions of invariants measuring the Galois module ...
Throughout number theory and arithmetic-algebraic geometry one encounters objects endowed with a nat...
We compare two approaches to the study of Galois module structures: on the one hand, factor equivale...
ABSTRACT. Using Hausmann and Vogel's homology sphere bundle interpretation of algebraic K-theor...
The book focuses on the relation between transformation groups and algebraic K-theory. The general p...
We prove very general index formulae for integral Galois modules, specifically for units in rings of...
de Smit We prove very general index formulae for integral Galois modules, specifically for units in ...
In the early 1970s, Morava studied forms of topological K-theory and observed that they have interes...
This paper generalises Chinburg's construction [4, 5] of invariants in the class group of an in...
Suppose N/L is a finite Galois extension of number fields, and L contains an imaginary quadratic fie...
Abstract. Using Hausmann and Vogel’s homology sphere bundle interpretation of algebraic K-theory, we...
According to Atiyah, K-theory is that part of linear algebra that studies additive or abelian proper...
Suppose N/L is a finite Galois extension of number fields, and L contains an imaginary quadratic fie...
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