AbstractThe main result of the paper is the following:Theorem. Suppose all the Čech cohomology groups of a space X are finitely generated and Hm(X;Z) is free for some m⩾2. There is a metrizable space Y∈Cm−1∩LC∞ and a map f:X→Y such that f∗:Hk(Y;Z)→Hk(X;Z) is an isomorphism for all k⩾m. If dimX is finite or X is uniformly movable and Hk(X;Z) vanish for large k, then Y is a finite polyhedron
Let A be a regular local ring with quotient field K. Assume that 2 is invertible in A. Let W(A)͛...
Bekannte Theoreme von Carlson und Griffiths gestatten es, die Variation von Hodgestrukturen assozi...
Bekannte Theoreme von Carlson und Griffiths gestatten es, die Variation von Hodgestrukturen assozi...
AbstractIn this survey the cohomology rings H∗(M3;Z2) of orientable Seifert and graph manifolds are ...
AbstractThe main result of the paper is the following:Theorem. Suppose all the Čech cohomology group...
Letf:X→Ybe a map between simply connected spaces having the homotopyof finite type CW-complexes, whe...
AbstractWe lift the Euler characteristic of a nearly perfect complex to a relative algebraic K-group...
summary:We show that if Y is the Hausdorffization of the primitive spectrum of a $C^{\ast }$-algebra...
AbstractLet E be an r-connected finite complex of dimension n, where r≥1, and let p be an odd prime ...
AbstractIn this paper we give a detailed analysis of the interaction between homological self-corres...
AbstractWe calculate certain Samelson products of Sp(2). Using the result, we classify the homotopy ...
Let $R_0$ be any domain, let $R=R_0[U_1, ..., U_s]/I$, where $U_1, ..., U_s$ are indeterminates of s...
AbstractWe show that for every finite, simply connected CW complex X, and for any field K, depthH∗(Ω...
AbstractLet X be an algebraic variety over R, the field of real numbers. The interplay between the t...
We lift the Euler characteristic of a nearly perfect complex to a relative algebraic K-group by pass...
Let A be a regular local ring with quotient field K. Assume that 2 is invertible in A. Let W(A)͛...
Bekannte Theoreme von Carlson und Griffiths gestatten es, die Variation von Hodgestrukturen assozi...
Bekannte Theoreme von Carlson und Griffiths gestatten es, die Variation von Hodgestrukturen assozi...
AbstractIn this survey the cohomology rings H∗(M3;Z2) of orientable Seifert and graph manifolds are ...
AbstractThe main result of the paper is the following:Theorem. Suppose all the Čech cohomology group...
Letf:X→Ybe a map between simply connected spaces having the homotopyof finite type CW-complexes, whe...
AbstractWe lift the Euler characteristic of a nearly perfect complex to a relative algebraic K-group...
summary:We show that if Y is the Hausdorffization of the primitive spectrum of a $C^{\ast }$-algebra...
AbstractLet E be an r-connected finite complex of dimension n, where r≥1, and let p be an odd prime ...
AbstractIn this paper we give a detailed analysis of the interaction between homological self-corres...
AbstractWe calculate certain Samelson products of Sp(2). Using the result, we classify the homotopy ...
Let $R_0$ be any domain, let $R=R_0[U_1, ..., U_s]/I$, where $U_1, ..., U_s$ are indeterminates of s...
AbstractWe show that for every finite, simply connected CW complex X, and for any field K, depthH∗(Ω...
AbstractLet X be an algebraic variety over R, the field of real numbers. The interplay between the t...
We lift the Euler characteristic of a nearly perfect complex to a relative algebraic K-group by pass...
Let A be a regular local ring with quotient field K. Assume that 2 is invertible in A. Let W(A)͛...
Bekannte Theoreme von Carlson und Griffiths gestatten es, die Variation von Hodgestrukturen assozi...
Bekannte Theoreme von Carlson und Griffiths gestatten es, die Variation von Hodgestrukturen assozi...
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