AbstractWe prove that for any infinite field F, the map H3(SLn(F),Z)→H3(SLn+1(F),Z) is an isomorphism for all n≥3. When n=2 the cokernel of this map is naturally isomorphic to 2⋅K3M(F), where KnM(F) is the nth Milnor K-group of F. We deduce that the natural homomorphism from H3(SL2(F),Z) to the indecomposable K3 of F, K3(F)ind, is surjective for any infinite field F
Abstract. The aim of this note is to give a simplified proof of the surjectivity of the natural Miln...
We use the properties of the refined Bloch group to study the structure of H3(SL2(F), Z) for a fiel...
AbstractLet F be a finite field, and φ: F∗ → E a surjective group homomorphism from the multiplicati...
We prove that for any infinite field F, the map H-3(SLn(F), Z) -> H-3(SLn+1 (F), Z) is an isomorphis...
It is known that, for an infinite field F, the indecomposable part of 'K IND. 3' (F) and the third h...
It is known that, for an infinite field F, the indecomposable part of 'K IND. 3' (F) and the third h...
Abstract. The third homology group of GLn(R) is studied, where R is a ‘ring with many units ’ with c...
Let F be a field of characteristic zero and let ft,n be the stabilization homomorphism Hn(SLt(F), Z)...
Some rights reserved. For more information, please see the item record link above. Title The third h...
Abstract. We calculate, for certain higher-dimensional local fields F, the third homology of SL2(F) ...
AbstractWe study the relationship between the third homology group of SL2(R) and K3(R), for R in a l...
Abstract. We prove analogues of the fundamental theorem of K-theory for the second and third homolog...
AbstractLet GL(Z) (respectively SL(Z)) be the infinite general (respectively special) linear group a...
We prove analogues of the fundamental theorem of K -theory for the second and the third homology of...
AbstractWe study the relationship between the third homology group of SL2(R) and K3(R), for R in a l...
Abstract. The aim of this note is to give a simplified proof of the surjectivity of the natural Miln...
We use the properties of the refined Bloch group to study the structure of H3(SL2(F), Z) for a fiel...
AbstractLet F be a finite field, and φ: F∗ → E a surjective group homomorphism from the multiplicati...
We prove that for any infinite field F, the map H-3(SLn(F), Z) -> H-3(SLn+1 (F), Z) is an isomorphis...
It is known that, for an infinite field F, the indecomposable part of 'K IND. 3' (F) and the third h...
It is known that, for an infinite field F, the indecomposable part of 'K IND. 3' (F) and the third h...
Abstract. The third homology group of GLn(R) is studied, where R is a ‘ring with many units ’ with c...
Let F be a field of characteristic zero and let ft,n be the stabilization homomorphism Hn(SLt(F), Z)...
Some rights reserved. For more information, please see the item record link above. Title The third h...
Abstract. We calculate, for certain higher-dimensional local fields F, the third homology of SL2(F) ...
AbstractWe study the relationship between the third homology group of SL2(R) and K3(R), for R in a l...
Abstract. We prove analogues of the fundamental theorem of K-theory for the second and third homolog...
AbstractLet GL(Z) (respectively SL(Z)) be the infinite general (respectively special) linear group a...
We prove analogues of the fundamental theorem of K -theory for the second and the third homology of...
AbstractWe study the relationship between the third homology group of SL2(R) and K3(R), for R in a l...
Abstract. The aim of this note is to give a simplified proof of the surjectivity of the natural Miln...
We use the properties of the refined Bloch group to study the structure of H3(SL2(F), Z) for a fiel...
AbstractLet F be a finite field, and φ: F∗ → E a surjective group homomorphism from the multiplicati...
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