Algebraic topology : proc. 17th annual summer research Inst. of AMS held at Univ. Wisconsin, Madison, June 29 - July 17, 1970 / ed. A. Liulevicius |
Autore | Liulevicius, Arunas |
Pubbl/distr/stampa | Providence, R. I. : American Mathematical Society, 1971 |
Descrizione fisica | v, 294 p. ; 25 cm. |
Disciplina | 514.2 |
Collana | Proceedings of symposia in pure mathematics, 0082-0717 ; 22 |
Soggetto topico | Algebraic topology |
ISBN | 0821814222 |
Classificazione |
AMS 55-06
AMS 55-XX |
Formato | Materiale a stampa |
Livello bibliografico | Monografia |
Lingua di pubblicazione | eng |
Record Nr. | UNISALENTO-991000664209707536 |
Liulevicius, Arunas | ||
Providence, R. I. : American Mathematical Society, 1971 | ||
Materiale a stampa | ||
Lo trovi qui: Univ. del Salento | ||
|
Algebraic topology : an introduction / William S. Massey |
Autore | Massey, William S. |
Edizione | [4th corrected printing] |
Pubbl/distr/stampa | New York : Springer-Verlag, 1977, c1967 |
Descrizione fisica | xxi, 261 p. : graphs ; 25 cm |
Disciplina | 514.2 |
Collana | Graduate texts in mathematics, ISSN 0072-5285 ; 56 |
Soggetto topico | Algebraic topology |
ISBN | 0387902716 |
Classificazione |
AMS 55-01
LC QA612.M37 |
Formato | Materiale a stampa |
Livello bibliografico | Monografia |
Lingua di pubblicazione | eng |
Record Nr. | UNISALENTO-991000664279707536 |
Massey, William S. | ||
New York : Springer-Verlag, 1977, c1967 | ||
Materiale a stampa | ||
Lo trovi qui: Univ. del Salento | ||
|
Algebraic topology / C. Maunder |
Autore | Maunder, C. |
Pubbl/distr/stampa | London : Van Nostrand Reinhold Co., 1970 |
Descrizione fisica | 375 p. ; 24 cm. |
Soggetto topico | Algebraic topology |
Classificazione |
510.55
512'89 QA612 |
Formato | Materiale a stampa |
Livello bibliografico | Monografia |
Lingua di pubblicazione | eng |
Record Nr. | UNISALENTO-991000805059707536 |
Maunder, C. | ||
London : Van Nostrand Reinhold Co., 1970 | ||
Materiale a stampa | ||
Lo trovi qui: Univ. del Salento | ||
|
Algebraic topology / C. R. F. Maunder |
Autore | Maunder, Charles Richard Francis |
Pubbl/distr/stampa | Cambridge [Eng.] : Cambridge University Press, 1980 |
Descrizione fisica | ix, 375 p. : ill. ; 24 cm |
Disciplina | 514.2 |
Soggetto topico | Algebraic topology |
ISBN | 0521298407 |
Classificazione |
AMS 55-01
LC QA612 |
Formato | Materiale a stampa |
Livello bibliografico | Monografia |
Lingua di pubblicazione | eng |
Record Nr. | UNISALENTO-991000664379707536 |
Maunder, Charles Richard Francis | ||
Cambridge [Eng.] : Cambridge University Press, 1980 | ||
Materiale a stampa | ||
Lo trovi qui: Univ. del Salento | ||
|
Algebraic topology / Edwin H. Spanier |
Autore | Spanier, Edwin Henry |
Edizione | [TMH edition] |
Pubbl/distr/stampa | New Delhi : Tata McGraw-Hill Pub. Co., 1971 |
Descrizione fisica | xiv, 528 p. ; 22 cm |
Disciplina | 514.2 |
Soggetto topico | Algebraic topology |
ISBN | 0070995826 |
Classificazione | AMS 55-XX |
Formato | Materiale a stampa |
Livello bibliografico | Monografia |
Lingua di pubblicazione | eng |
Record Nr. | UNISALENTO-991003425549707536 |
Spanier, Edwin Henry | ||
New Delhi : Tata McGraw-Hill Pub. Co., 1971 | ||
Materiale a stampa | ||
Lo trovi qui: Univ. del Salento | ||
|
Algebraic topology / Edwin H. Spanier |
Autore | Spanier, Edwin Henry |
Pubbl/distr/stampa | New York : McGraw-Hill, c1966 |
Descrizione fisica | xiv, 528 p. ; 23 cm |
Collana | McGraw-Hill series in higher mathematics |
Soggetto topico | Algebraic topology |
Classificazione | AMS 55-XX |
Formato | Materiale a stampa |
Livello bibliografico | Monografia |
Lingua di pubblicazione | eng |
Record Nr. | UNISALENTO-991000664449707536 |
Spanier, Edwin Henry | ||
New York : McGraw-Hill, c1966 | ||
Materiale a stampa | ||
Lo trovi qui: Univ. del Salento | ||
|
Algebraic topology / Edwin H. Spanier |
Autore | Spanier, Edwin Henry |
Edizione | [1st corr. ed.] |
Pubbl/distr/stampa | New York : Springer-Verlag, c1966 |
Descrizione fisica | xiv, 528 p. ; 24 cm |
Disciplina | 514.2 |
Soggetto topico | Algebraic topology |
ISBN | 0387906460 |
Classificazione | AMS 55-XX |
Formato | Materiale a stampa |
Livello bibliografico | Monografia |
Lingua di pubblicazione | eng |
Record Nr. | UNISALENTO-991000664519707536 |
Spanier, Edwin Henry | ||
New York : Springer-Verlag, c1966 | ||
Materiale a stampa | ||
Lo trovi qui: Univ. del Salento | ||
|
Algebraic Topology [[electronic resource] ] : VIASM 2012–2015 / / edited by H.V. Hưng Nguyễn, Lionel Schwartz |
Edizione | [1st ed. 2017.] |
Pubbl/distr/stampa | Cham : , : Springer International Publishing : , : Imprint : Springer, , 2017 |
Descrizione fisica | 1 online resource (VII, 180 p. 5 illus., 2 illus. in color.) |
Disciplina | 514.2 |
Collana | Lecture Notes in Mathematics |
Soggetto topico |
Algebraic topology
Category theory (Mathematics) Homological algebra Algebraic Topology Category Theory, Homological Algebra |
ISBN | 3-319-69434-0 |
Formato | Materiale a stampa |
Livello bibliografico | Monografia |
Lingua di pubblicazione | eng |
Nota di contenuto |
Intro -- Introduction -- Contents -- 1 Hodge Filtration and Operations in Higher Hochschild (Co)homology and Applications to Higher String Topology -- 1.1 Introduction and Overview -- 1.2 Notations, Conventions and a Few Standard Facts -- 1.3 Higher Hochschild (Co)homology -- 1.3.1 -Modules and Hochschild (Co)chain Complexes over Spaces -- 1.3.2 Combinatorial Higher Hochschild (Co)chains -- 1.3.3 Derived Hochschild (Co)chains -- 1.4 Hodge Filtration and λ-Operations on Hochschild (Co)homology over Spheres and Suspensions -- 1.4.1 γ-Rings and Lambda Operations -- 1.4.2 Edgewise Subdivision and Simplicial Approach to λ-Operations -- 1.4.3 Hodge Filtration for Hochschild Cochains over Spheres and Suspensions -- 1.4.4 Hodge Filtration on Hochschild Cochains on the Standard Model -- 1.4.5 Hodge Filtration and λ-Operations for Hochschild Chains over Spheres and Suspensions -- 1.4.6 Hodge Filtration and the Eilenberg-Zilber Model for Hochschild Cochains of Suspensions and Products -- 1.5 Additional Ring Structures for Higher Hochschild Cohomology -- 1.5.1 The Wedge and Cup Product -- 1.5.2 The Universal En-Algebra Structure Lifting the Cup-Product -- 1.5.2.1 The En-Structure of Hochschild (Co)homology over Sn -- 1.5.2.2 The Combinatorial Description of the Centralizer of CDGA Maps -- 1.5.3 The O(d)-Equivariance of the Universal Ed Algebra Structure on Hochschild Cochomology over Spheres -- 1.6 Applications of Higher Hochschild-Kostant-Rosenberg Theorem -- 1.6.1 Statement of HKR Theorem -- 1.6.2 HKR Isomorphism and Hodge Decomposition -- 1.6.3 Compatibility of Hodge Decomposition with the Algebra Structure in Cohomology and Induced Poisn+1-Algebra Structure -- 1.6.4 Applications to Poisn-Algebras (Co)homology -- 1.7 Applications to Brane Topology -- 1.7.1 Higher Hochschild (Co)homology as a Model for Mapping Spaces.
1.7.2 Models for Brane Topology in Characteristic Zero -- References -- 2 On the Derived Functors of Destabilization and of Iterated Loop Functors -- 2.1 Introduction -- 2.2 Background -- 2.2.1 The Steenrod Algebra as a Quadratic Algebra -- 2.2.2 The Category of A-Modules -- 2.2.3 Unstable Modules and Destabilization -- 2.2.4 Derived Functors -- 2.2.5 Motivation for Studying Derived Functors of Destabilization and of Iterated Loop Functors -- 2.3 First Results on Derived Functors of Destabilization and of Iterated Loops -- 2.3.1 Derived Functors of Ω -- 2.3.2 Applications of Ω and Ω1 -- 2.3.3 Interactions Between Loops and Destabilization -- 2.3.4 Connectivity for Ds -- 2.3.5 Comparing Ds and Ωts -- 2.4 Singer Functors -- 2.4.1 The Unstable Singer Functors Rs -- 2.4.2 Singer Functors for M -- 2.4.3 The Singer Differential -- 2.5 Constructing Chain Complexes -- 2.5.1 Destabilization -- 2.5.2 Iterated Loops -- 2.5.3 The Lannes-Zarati Homomorphism -- 2.6 Perspectives -- 2.6.1 The Spherical Class Conjecture and Related Problems -- 2.6.2 Generalizations of the Lannes-Zarati Homomorphism -- References -- 3 A Mini-Course on Morava Stabilizer Groups and Their Cohomology -- 3.1 Introduction -- 3.2 Bousfield Localization and the Chromatic Set Up -- 3.2.1 Bousfield Localization -- 3.2.2 Morava K-Theories -- 3.2.3 LK(n)S0 as Homotopy Fixed Point Spectrum -- 3.3 Resolutions of K(n)-Local Spheres -- 3.3.1 The Example n=1 and p>2 -- 3.3.2 The Case That p-1 Does Not Divide n -- 3.3.3 The Example n=2 and p>3 -- 3.3.4 The Example n=1 and p=2 -- 3.3.5 The General Case p-1 Divides n -- 3.3.6 The Example n=2 and p=3 -- 3.3.7 Permutation Resolutions and Realizations -- 3.3.8 Applications and Work in Progress -- 3.3.8.1 The Case n=2 and p=3 -- 3.3.8.2 The Case n=2 and p>3 -- 3.3.8.3 The Case n=p=2 -- 3.4 The Morava Stabilizer Groups: First Properties. 3.4.1 The Morava Stabilizer Group as a Profinite Group -- 3.4.2 The Associated Mixed Lie Algebra of Sn -- 3.4.3 Torsion in the Morava Stabilizer Groups -- 3.5 On the Cohomology of the Stabilizer Groups with Trivial Coefficients -- 3.5.1 H1: The Stabilizer Group Made Abelian -- 3.5.2 The Cohomology of S1 -- 3.5.3 Structural Properties of H*(Sn,Z/p) -- 3.5.4 The Reduced Norm and a Decomposition of Sn -- 3.5.5 Cohomology in Case n=2 and p>2 -- 3.5.5.1 The Case p>3 -- 3.5.5.2 The Case p=3 -- 3.5.5.3 The Case p=2 -- 3.6 Cohomology with Non-trivial Coefficients and Resolutions -- 3.6.1 The Case n=1 -- 3.6.1.1 The Case p>2 -- 3.6.1.2 The Case p=2 -- 3.6.2 Some Comments on the Case n=2 -- References. |
Record Nr. | UNISA-996466537803316 |
Cham : , : Springer International Publishing : , : Imprint : Springer, , 2017 | ||
Materiale a stampa | ||
Lo trovi qui: Univ. di Salerno | ||
|
Algebraic topology [e-book] : VIASM 2012-2015 / Nguyen H.V. Hung, Lionel Schwartz, editors |
Descrizione fisica | 1 online resource (vii, 180 p. 5 ill., 2 ill. in color.) |
Disciplina | 514.2 |
Altri autori (Persone) |
Nguyễn H. V. Hu'ng
Schwartz, Lionelauthor |
Collana | Lecture Notes in Mathematics, 0075-8434 ; 2194 |
Soggetto topico |
Categories (Mathematics)
Algebra, Homological Algebraic topology |
ISBN |
9783319694344
3319694340 |
Classificazione |
AMS 55-06
AMS 18-06 AMS 00B25 LC QA612-612.8 |
Formato | Materiale a stampa |
Livello bibliografico | Monografia |
Lingua di pubblicazione | eng |
Record Nr. | UNISALENTO-991003564259707536 |
Materiale a stampa | ||
Lo trovi qui: Univ. del Salento | ||
|
Algebraic Topology : VIASM 2012–2015 / / edited by H.V. Hưng Nguyễn, Lionel Schwartz |
Edizione | [1st ed. 2017.] |
Pubbl/distr/stampa | Cham : , : Springer International Publishing : , : Imprint : Springer, , 2017 |
Descrizione fisica | 1 online resource (VII, 180 p. 5 illus., 2 illus. in color.) |
Disciplina | 514.2 |
Collana | Lecture Notes in Mathematics |
Soggetto topico |
Algebraic topology
Category theory (Mathematics) Homological algebra Algebraic Topology Category Theory, Homological Algebra |
ISBN | 3-319-69434-0 |
Formato | Materiale a stampa |
Livello bibliografico | Monografia |
Lingua di pubblicazione | eng |
Nota di contenuto |
Intro -- Introduction -- Contents -- 1 Hodge Filtration and Operations in Higher Hochschild (Co)homology and Applications to Higher String Topology -- 1.1 Introduction and Overview -- 1.2 Notations, Conventions and a Few Standard Facts -- 1.3 Higher Hochschild (Co)homology -- 1.3.1 -Modules and Hochschild (Co)chain Complexes over Spaces -- 1.3.2 Combinatorial Higher Hochschild (Co)chains -- 1.3.3 Derived Hochschild (Co)chains -- 1.4 Hodge Filtration and λ-Operations on Hochschild (Co)homology over Spheres and Suspensions -- 1.4.1 γ-Rings and Lambda Operations -- 1.4.2 Edgewise Subdivision and Simplicial Approach to λ-Operations -- 1.4.3 Hodge Filtration for Hochschild Cochains over Spheres and Suspensions -- 1.4.4 Hodge Filtration on Hochschild Cochains on the Standard Model -- 1.4.5 Hodge Filtration and λ-Operations for Hochschild Chains over Spheres and Suspensions -- 1.4.6 Hodge Filtration and the Eilenberg-Zilber Model for Hochschild Cochains of Suspensions and Products -- 1.5 Additional Ring Structures for Higher Hochschild Cohomology -- 1.5.1 The Wedge and Cup Product -- 1.5.2 The Universal En-Algebra Structure Lifting the Cup-Product -- 1.5.2.1 The En-Structure of Hochschild (Co)homology over Sn -- 1.5.2.2 The Combinatorial Description of the Centralizer of CDGA Maps -- 1.5.3 The O(d)-Equivariance of the Universal Ed Algebra Structure on Hochschild Cochomology over Spheres -- 1.6 Applications of Higher Hochschild-Kostant-Rosenberg Theorem -- 1.6.1 Statement of HKR Theorem -- 1.6.2 HKR Isomorphism and Hodge Decomposition -- 1.6.3 Compatibility of Hodge Decomposition with the Algebra Structure in Cohomology and Induced Poisn+1-Algebra Structure -- 1.6.4 Applications to Poisn-Algebras (Co)homology -- 1.7 Applications to Brane Topology -- 1.7.1 Higher Hochschild (Co)homology as a Model for Mapping Spaces.
1.7.2 Models for Brane Topology in Characteristic Zero -- References -- 2 On the Derived Functors of Destabilization and of Iterated Loop Functors -- 2.1 Introduction -- 2.2 Background -- 2.2.1 The Steenrod Algebra as a Quadratic Algebra -- 2.2.2 The Category of A-Modules -- 2.2.3 Unstable Modules and Destabilization -- 2.2.4 Derived Functors -- 2.2.5 Motivation for Studying Derived Functors of Destabilization and of Iterated Loop Functors -- 2.3 First Results on Derived Functors of Destabilization and of Iterated Loops -- 2.3.1 Derived Functors of Ω -- 2.3.2 Applications of Ω and Ω1 -- 2.3.3 Interactions Between Loops and Destabilization -- 2.3.4 Connectivity for Ds -- 2.3.5 Comparing Ds and Ωts -- 2.4 Singer Functors -- 2.4.1 The Unstable Singer Functors Rs -- 2.4.2 Singer Functors for M -- 2.4.3 The Singer Differential -- 2.5 Constructing Chain Complexes -- 2.5.1 Destabilization -- 2.5.2 Iterated Loops -- 2.5.3 The Lannes-Zarati Homomorphism -- 2.6 Perspectives -- 2.6.1 The Spherical Class Conjecture and Related Problems -- 2.6.2 Generalizations of the Lannes-Zarati Homomorphism -- References -- 3 A Mini-Course on Morava Stabilizer Groups and Their Cohomology -- 3.1 Introduction -- 3.2 Bousfield Localization and the Chromatic Set Up -- 3.2.1 Bousfield Localization -- 3.2.2 Morava K-Theories -- 3.2.3 LK(n)S0 as Homotopy Fixed Point Spectrum -- 3.3 Resolutions of K(n)-Local Spheres -- 3.3.1 The Example n=1 and p>2 -- 3.3.2 The Case That p-1 Does Not Divide n -- 3.3.3 The Example n=2 and p>3 -- 3.3.4 The Example n=1 and p=2 -- 3.3.5 The General Case p-1 Divides n -- 3.3.6 The Example n=2 and p=3 -- 3.3.7 Permutation Resolutions and Realizations -- 3.3.8 Applications and Work in Progress -- 3.3.8.1 The Case n=2 and p=3 -- 3.3.8.2 The Case n=2 and p>3 -- 3.3.8.3 The Case n=p=2 -- 3.4 The Morava Stabilizer Groups: First Properties. 3.4.1 The Morava Stabilizer Group as a Profinite Group -- 3.4.2 The Associated Mixed Lie Algebra of Sn -- 3.4.3 Torsion in the Morava Stabilizer Groups -- 3.5 On the Cohomology of the Stabilizer Groups with Trivial Coefficients -- 3.5.1 H1: The Stabilizer Group Made Abelian -- 3.5.2 The Cohomology of S1 -- 3.5.3 Structural Properties of H*(Sn,Z/p) -- 3.5.4 The Reduced Norm and a Decomposition of Sn -- 3.5.5 Cohomology in Case n=2 and p>2 -- 3.5.5.1 The Case p>3 -- 3.5.5.2 The Case p=3 -- 3.5.5.3 The Case p=2 -- 3.6 Cohomology with Non-trivial Coefficients and Resolutions -- 3.6.1 The Case n=1 -- 3.6.1.1 The Case p>2 -- 3.6.1.2 The Case p=2 -- 3.6.2 Some Comments on the Case n=2 -- References. |
Record Nr. | UNINA-9910257380603321 |
Cham : , : Springer International Publishing : , : Imprint : Springer, , 2017 | ||
Materiale a stampa | ||
Lo trovi qui: Univ. Federico II | ||
|