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010   $a1-4008-8267-2
024 7 $a10.1515/9781400882670
035   $a(CKB)3710000000627794
035   $a(MiAaPQ)EBC4738764
035   $a(DE-B1597)467996
035   $a(OCoLC)979968814
035   $a(DE-B1597)9781400882670
035   $a(EXLCZ)993710000000627794
100   $a20190708d2016      fg              
101 0 $aeng
135   $aurcnu||||||||
181   $2rdacontent
182   $2rdamedia
183   $2rdacarrier
200 10$aSeminar on Transformation Groups. (AM-46), Volume 46 /$fArmand Borel
210  1$aPrinceton, NJ : $cPrinceton University Press, $d[2016]
210  4$dİ1961
215   $a1 online resource (261 pages) $cillustrations
225 0 $aAnnals of Mathematics Studies ;$v328
300   $a"Consists of the notes of a seminar held at the Institute for Advanced Study, in 1958-1959."
311   $a0-691-08030-5 
311   $a0-691-09094-7 
320   $aIncludes bibliographies.
327   $tFrontmatter -- $tTABLE OP CONTENTS -- $tINTRODUCTION -- $tCHAPTER I: COHOMOLOGY MANIFOLDS / $rBorel, A. -- $tCHAPTER II: HOMOLOGY AND DUALITY IN GENERALIZED MANIFOLDS / $rBorel, A. -- $tCHAPTER III: PERIODIC MAPS VIA SMITH THEORY / $rFloyd, E. E. -- $tCHAPTER IV: THE ACTION OF Zp OR T1 : GLOBAL THEOREMS / $rBorel, A. -- $tCHAPTER V: THE ACTION OF Zp T1 : LOCAL THEOREMS / $rBorel, A. -- $tCHAPTER VI: ISOTROPY SUBGROUPS OP TORAL GROUPS / $rFloyd, E. E. -- $tCHAPTER VII: FINITENESS OP NUMBER OF ORBIT TYPES / $rBredon, G. E. -- $tCHAPTER VIII: SLICES AND EQUIVARIANT IMBEDDINGS / $rPalais, R. S. -- $tCHAPTER IX: ORBITS OF HIGHEST DIMENSION / $rMontgomery, Deane -- $tCHAPTER X: THE SPECTRAL SEQUENCE OF A BIFILTERED MODULE, / $rBorel, A. -- $tCHAPTER XI: THE SPECTRAL SEQUENCE OF FARY / $rBorel, A. -- $tCHAPTER XII: FIXED POINT THEOREMS FOR ELEMENTARY COMMUTATIVE GROUPS I / $rBorel, A. -- $tCHAPTER XIII: FIXED POINT THEOREMS FOR ELEMENTARY COMMUTATIVE GROUPS II / $rBorel, A. -- $tCHAPTER XIV: ONE OR W O CLASSES OF ORBITS / $rBorel, A. -- $tCHAPTER XV: FIXED POINT SETS AND ORBITS OF COMPLEMENTARY DIMENSION / $rBredon, G. E. -- $tCHAPTER XVI: REMARKS ON THE SPECTRAL SEQUENCE OF A MAP / $rBorel, A. -- $tBackmatter
330   $aThe description for this book, Seminar on Transformation Groups. (AM-46), Volume 46, will be forthcoming.
410  0$aAnnals of mathematics studies ;$vno. 46.
606   $aAlgebraic topology
606   $aTransformation groups
610   $aAbelian group.
610   $aAddition.
610   $aAlgebraic topology.
610   $aAnalytic function.
610   $aArmand Borel.
610   $aBig O notation.
610   $aBijection.
610   $aChain complex.
610   $aCircle group.
610   $aCodimension.
610   $aCoefficient.
610   $aCohomology ring.
610   $aCohomology.
610   $aCommutative diagram.
610   $aComplex number.
610   $aConjugacy class.
610   $aConnected component (graph theory).
610   $aConnected space.
610   $aContinuous function.
610   $aCorollary.
610   $aCounterexample.
610   $aCup product.
610   $aCyclic group.
610   $aDiffeomorphism.
610   $aDifferentiable function.
610   $aDimension (vector space).
610   $aDimension function.
610   $aDimension.
610   $aDirect product.
610   $aDirect sum.
610   $aEmbedding.
610   $aEquivariant map.
610   $aEuclidean space.
610   $aExact sequence.
610   $aExponential function.
610   $aFiber bundle.
610   $aField of fractions.
610   $aFinite group.
610   $aFinitely generated module.
610   $aFunctor.
610   $aGroup action.
610   $aH-space.
610   $aHausdorff space.
610   $aHomeomorphism.
610   $aHomogeneous space.
610   $aHomological algebra.
610   $aHomology (mathematics).
610   $aHomology sphere.
610   $aHomomorphism.
610   $aIdeal (ring theory).
610   $aIdentity component.
610   $aInner automorphism.
610   $aInvariant subspace.
610   $aLie algebra.
610   $aLie group.
610   $aLinear combination.
610   $aLinearity.
610   $aLocally compact space.
610   $aManifold.
610   $aMathematical induction.
610   $aMaximal torus.
610   $aMetatheorem.
610   $aMetric space.
610   $aModule (mathematics).
610   $aMonotonic function.
610   $aN-sphere.
610   $aNeighbourhood (mathematics).
610   $aOpen set.
610   $aOrientability.
610   $aP-group.
610   $aParacompact space.
610   $aPartially ordered set.
610   $aPolynomial.
610   $aPresheaf (category theory).
610   $aPrime ideal.
610   $aProjective space.
610   $aQuotient space (topology).
610   $aReal variable.
610   $aRiemannian manifold.
610   $aScientific notation.
610   $aSheaf (mathematics).
610   $aSimply connected space.
610   $aSolvable group.
610   $aSpecial case.
610   $aSpectral sequence.
610   $aSubgroup.
610   $aSubset.
610   $aSupport (mathematics).
610   $aSylow theorems.
610   $aTangent vector.
610   $aTheorem.
610   $aTopological group.
610   $aTopological space.
610   $aTorsion subgroup.
610   $aTranspose.
610   $aUnique factorization domain.
610   $aUniversal bundle.
610   $aUniversal coefficient theorem.
610   $aVector space.
610   $aWeyl group.
615  0$aAlgebraic topology.
615  0$aTransformation groups.
676   $a512.86
700   $aBorel$b Armand, $045077
702   $aBorel$b A., $4ctb$4https://id.loc.gov/vocabulary/relators/ctb
702   $aBredon$b G. E., $4ctb$4https://id.loc.gov/vocabulary/relators/ctb
702   $aFloyd$b E. E., $4ctb$4https://id.loc.gov/vocabulary/relators/ctb
702   $aMontgomery$b Deane, $4ctb$4https://id.loc.gov/vocabulary/relators/ctb
702   $aPalais$b R. S., $4ctb$4https://id.loc.gov/vocabulary/relators/ctb
801  0$bDE-B1597
801  1$bDE-B1597
906   $aBOOK
912   $a9910154746603321
996   $aSeminar on Transformation Groups. (AM-46), Volume 46$92788527
997   $aUNINA