- HOMOTOPY CLASSIFICATION OF SPACES WITH INTERESTING COHOMOLOGY
- COHEN-MACAULAY AND GORENSTEIN COMPLEXES FROM A TOPOLOGICAL POINT OF VIEW
- ON THE 2-COMPACT GROUP DI(4) Abstract. Besides the simple connected compact Lie groups there exists one further
- HOMOLOGY DECOMPOSITIONS FOR CLASSIFYING SPACES OF FINITE GROUPS
- P{ADIC LATTICES OF PSEUDO REFLECTION GROUPS Abstract. Let U be a vector space over the p{adic rationals, and let W ! Gl(U)
- ON THE FUNCTOR `CLASSIFYING SPACE' FOR COMPACT LIE GROUPS
- MAPS BETWEEN CLASSIFYING SPACES AND APPLICATIONS Dietrich Notbohm
- TOPOLOGICAL REALIZATION OF A FAMILY OF PSEUDO REFLECTION GROUPS
- ON DAVIS-JANUSZKIEWICZ HOMOTOPY TYPES I; FORMALITY AND RATIONALISATION
- HOMOTOPY UNIQUENESS OF CLASSIFYING SPACES OF COMPACT CONNECTED LIE GROUPS AT PRIMES
- A UNIQUENESS RESULT FOR ORTHOGONAL GROUPS AS 2-COMPACT GROUPS
- CONNECTED FINITE LOOP SPACES WITH MAXIMAL TORI J. M. M ller and D. Notbohm
- FIBRATIONS OF CLASSIFYING SPACES Kenshi Ishiguro and Dietrich Notbohm
- FAKE LIE GROUPS WITH MAXIMAL TORI. IV Dietrich Notbohm
- A VECTOR BUNDLE OVER DAVIS-JANUSZKIEWICZ SPACES
- HOMOLOGY DECOMPOSITIONS FOR p-COMPACT GROUPS NATALIA CASTELLANA, RAN LEVI, AND DIETRICH NOTBOHM
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- THE GENERA OF PRODUCTS OF QUATERNIONIC PROJECTIVE SPACES
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- KERNELS OF MAPS BETWEEN CLASSIFYING SPACES Dietrich Notbohm
- CENTERS AND FINITE COVERINGS OF FINITE LOOP SPACES J. M. M ller and D. Notbohm
- CLASSIFYING SPACES OF COMPACT LIE GROUPS AND FINITE LOOP SPACES
- A MOD TWO ANALOGUE OF A CONJECTURE OF COOKE J. Aguad e, C. Broto and D. Notbohm
- THE GENERA OF PRODUCTS OF QUATERNIONIC PROJECTIVE SPACES
- SPACES WITH POLYNOMIAL MOD-p COHOMOLOGY D. Notbohm
- CONNECTED FINITE LOOP SPACES WITH MAXIMAL TORI by
- HOMOTOPY UNIQUENESS OF CLASSIFYING SPACES OF COMPACT CONNECTED LIE GROUPS AT PRIMES
- CLASSIFYING SPACES OF COMPACT LIE GROUPS AND FINITE LOOP SPACES
- FIBRATIONS OF CLASSIFYING SPACES by
- KERNELS OF MAPS BETWEEN CLASSIFYING SPACES by
- P-ADIC LATTICES OF PSEUDO REFLECTION GROUPS D. Notbohm
- ON THE 2-COMPACT GROUP DI(4) D. Notbohm
- FOR WHICH PSEUDO REFLECTION GROUPS ARE THE p-ADIC POLYNOMIAL INVARIANTS
- CENTERS AND FINITE COVERINGS OF FINITE LOOP SPACES by
- HOMOLOGY DECOMPOSITIONS FOR p-COMPACT GROUPS NAT`ALIA CASTELLANA, RAN LEVI, AND DIETRICH NOTBOHM
- FINITE LOOP SPACES ARE MANIFOLDS TILMAN BAUER, NITU KITCHLOO, DIETRICH NOTBOHM, AND ERIK KJ R
- SPACES WITH POLYNOMIAL MOD{p COHOMOLOGY Abstract. In the early seventies, Steenrod posed the question which polynomial
- DEPTH AND HOMOLOGY DECOMPOSITIONS DIETRICH NOTBOHM
- HOMOLOGY DECOMPOSITIONS FOR CLASSIFYING SPACES OF FINITE GROUPS
- THE FINITENESS OBSTRUCTION FOR LOOP SPACES D. Notbohm
- A UNIQUENESS RESULT FOR ORTHOGONAL GROUPS AS 2-COMPACT GROUPS
- FINITE LOOP SPACES ARE MANIFOLDS TILMAN BAUER, NITU KITCHLOO, DIETRICH NOTBOHM, AND ERIK KJAER
- A MOD TWO ANALOGUE OF A CONJECTURE OF COOKE J. Aguad'e, C. Broto and D. Notbohm
- ON DAVIS-JANUSZKIEWICZ HOMOTOPY TYPES I; FORMALITY AND RATIONALISATION
- HOMOTOPY CLASSIFICATION OF SPACES WITH INTERESTING COHOMOLOGY
- COHEN-MACAULAY AND GORENSTEIN COMPLEXES FROM A TOPOLOGICAL POINT OF VIEW
- THE FINITENESS OBSTRUCTION FOR LOOP SPACES Abstract. For nitely dominated spaces, Wall constructed a niteness obstruction,
- UNSTABLE SPLITTINGS OF CLASSIFYING SPACES OF p{COMPACT GROUPS
- FOR WHICH PSEUDO REFLECTION GROUPS ARE THE p{ADIC POLYNOMIAL INVARIANTS
- TOPOLOGICAL REALIZATION OF A FAMILY OF PSEUDO REFLECTION GROUPS
- FAKE LIE GROUPS WITH MAXIMAL TORI. IV by
- UNSTABLE SPLITTINGS OF CLASSIFYING SPACES OF p-COMPACT GROUPS
- MAPS BETWEEN CLASSIFYING SPACES AND APPLICATIONS by
- A VECTOR BUNDLE OVER DAVIS-JANUSZKIEWICZ SPACES
- ON THE FUNCTOR `CLASSIFYING SPACE' FOR COMPACT LIE GROUPS
