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MARC Lista (tabellare)
Categorical framework for the study of singular spaces / / William Fulton and Robert MacPherson
Categorical framework for the study of singular spaces / / William Fulton and Robert MacPherson
Autore Fulton William <1939->
Pubbl/distr/stampa Providence, Rhode Island : , : American Mathematical Society, , [1981]
Descrizione fisica 1 online resource (173 p.)
Disciplina 510 s
514/.24
Collana Memoirs of the American Mathematical Society
Soggetto topico Homology theory
Categories (Mathematics)
Soggetto genere / forma Electronic books.
ISBN 1-4704-0650-0
Formato Materiale a stampa
Livello bibliografico Monografia
Lingua di pubblicazione eng
Nota di contenuto ""Table of Contents""; ""Part I: Bivariant theories""; ""Â1 Survey""; ""1.1 Bivariant theories""; ""1.2 Grothendieck transformations""; ""1.3 Orientations and Gysin homomorphisms""; ""1.4 Formules of Riemann-Roch type""; ""1.5 An Example""; ""1.6 Guide to [BT]""; ""1.7 Acknowledgements""; ""Â2 Bivariant Theories""; ""2.1 The underlying category""; ""2.2 Axioms for a bivariant theory""; ""2.3 Associated contravariant and covariant functors""; ""2.4 External products""; ""2.5 Gysin homomorphisms""; ""2.6 Orientations""; ""2.7 Grothendieck transformations""; ""Â3 Topological Theories""
""3.1 Construction of a bivariant theory from a cohomology theory""""3.2 Grothendieck transformations of topological theories""; ""3.3 Supports""; ""3.4 Specialization""; ""Â4 Orientations in Topology""; ""4.1 Normally non-singular maps""; ""4.2 Cohomology operations""; ""4.3 Differentiable Riemann-Roch""; ""Â5 Transfer and Fixed Point Index""; ""Â6 Whitney Classes""; ""6.1 The bivariant theory FF""; ""6.2 The Grothendieck transformation Ï?""; ""6.3 Consequences of Theorem 6A""; ""6.4 Proof of uniqueness of Ï?""; ""6.5 Construction of Ï?""; ""6.6 Applications""
""Â7 Grothendieck Duality and Derived Functors""""7.1 Grothendieck duality""; ""7.2 Duality and Riemann-Roch""; ""7.3 Homology from derived functors""; ""7.4 Etale theory""; ""Â8 Operational Theories""; ""Â9 Rational Equivalence and Intersection Formulas""; ""9.1 Operational rational equivalence theory""; ""9.2 Intersection formulas""; ""Â10 Other Bivariant Theories; Open Problems""; ""10.1 Fixed point theorems for coherent sheaves""; ""10.2 Finite groups""; ""10.3 Orientations in algebraic geometry""; ""10.4 Chern classes""; ""10.5 Equivariant Whitney classes""; ""10.6 Verdier duality""
""10.7 Non-submersive maps in topology""""10.8 Independent squares for algebraic K-theory""; ""10.9 Uniqueness questions""; ""10.10 Analytic Riemann-Roch""; ""10.11 Rational equivalence""; ""10.12 Higher K-theory""; ""10.13 Geometric interpretation of bivariant homology elements""; ""Part II: Products in Riemann-Roch""; ""Â0 Introduction""; ""0.1 Some history""; ""0.2 Summary of results""; ""0.3 Plan of the proof""; ""Â1 Statement of the theorem""; ""1.1 Bivariant algebraic K-theory""; ""1.2 Morphisms of finite Tor dimension""; ""1.3 Local complete intersection morphisms""
""1.4 The Riemann-Roch theorem""""1.5 The Chern character""; ""1.6 Riemann-Roch with supports""; ""Â2 Complexes""; ""2.1 Topological complexes""; ""2.2 Some homological algebra""; ""2.3 An application""; ""2.4 The main lemma""; ""Â3 Proof of the theorem""; ""References""
Record Nr. UNINA-9910480014403321
Fulton William <1939->  
Providence, Rhode Island : , : American Mathematical Society, , [1981]
Materiale a stampa
Lo trovi qui: Univ. Federico II
Opac: Controlla la disponibilità qui
Categorical framework for the study of singular spaces / / William Fulton and Robert MacPherson
Categorical framework for the study of singular spaces / / William Fulton and Robert MacPherson
Autore Fulton William <1939->
Pubbl/distr/stampa Providence, Rhode Island : , : American Mathematical Society, , [1981]
Descrizione fisica 1 online resource (173 p.)
Disciplina 510 s
514/.24
Collana Memoirs of the American Mathematical Society
Soggetto topico Homology theory
Categories (Mathematics)
ISBN 1-4704-0650-0
Formato Materiale a stampa
Livello bibliografico Monografia
Lingua di pubblicazione eng
Nota di contenuto ""Table of Contents""; ""Part I: Bivariant theories""; ""Â1 Survey""; ""1.1 Bivariant theories""; ""1.2 Grothendieck transformations""; ""1.3 Orientations and Gysin homomorphisms""; ""1.4 Formules of Riemann-Roch type""; ""1.5 An Example""; ""1.6 Guide to [BT]""; ""1.7 Acknowledgements""; ""Â2 Bivariant Theories""; ""2.1 The underlying category""; ""2.2 Axioms for a bivariant theory""; ""2.3 Associated contravariant and covariant functors""; ""2.4 External products""; ""2.5 Gysin homomorphisms""; ""2.6 Orientations""; ""2.7 Grothendieck transformations""; ""Â3 Topological Theories""
""3.1 Construction of a bivariant theory from a cohomology theory""""3.2 Grothendieck transformations of topological theories""; ""3.3 Supports""; ""3.4 Specialization""; ""Â4 Orientations in Topology""; ""4.1 Normally non-singular maps""; ""4.2 Cohomology operations""; ""4.3 Differentiable Riemann-Roch""; ""Â5 Transfer and Fixed Point Index""; ""Â6 Whitney Classes""; ""6.1 The bivariant theory FF""; ""6.2 The Grothendieck transformation Ï?""; ""6.3 Consequences of Theorem 6A""; ""6.4 Proof of uniqueness of Ï?""; ""6.5 Construction of Ï?""; ""6.6 Applications""
""Â7 Grothendieck Duality and Derived Functors""""7.1 Grothendieck duality""; ""7.2 Duality and Riemann-Roch""; ""7.3 Homology from derived functors""; ""7.4 Etale theory""; ""Â8 Operational Theories""; ""Â9 Rational Equivalence and Intersection Formulas""; ""9.1 Operational rational equivalence theory""; ""9.2 Intersection formulas""; ""Â10 Other Bivariant Theories; Open Problems""; ""10.1 Fixed point theorems for coherent sheaves""; ""10.2 Finite groups""; ""10.3 Orientations in algebraic geometry""; ""10.4 Chern classes""; ""10.5 Equivariant Whitney classes""; ""10.6 Verdier duality""
""10.7 Non-submersive maps in topology""""10.8 Independent squares for algebraic K-theory""; ""10.9 Uniqueness questions""; ""10.10 Analytic Riemann-Roch""; ""10.11 Rational equivalence""; ""10.12 Higher K-theory""; ""10.13 Geometric interpretation of bivariant homology elements""; ""Part II: Products in Riemann-Roch""; ""Â0 Introduction""; ""0.1 Some history""; ""0.2 Summary of results""; ""0.3 Plan of the proof""; ""Â1 Statement of the theorem""; ""1.1 Bivariant algebraic K-theory""; ""1.2 Morphisms of finite Tor dimension""; ""1.3 Local complete intersection morphisms""
""1.4 The Riemann-Roch theorem""""1.5 The Chern character""; ""1.6 Riemann-Roch with supports""; ""Â2 Complexes""; ""2.1 Topological complexes""; ""2.2 Some homological algebra""; ""2.3 An application""; ""2.4 The main lemma""; ""Â3 Proof of the theorem""; ""References""
Record Nr. UNINA-9910788895103321
Fulton William <1939->  
Providence, Rhode Island : , : American Mathematical Society, , [1981]
Materiale a stampa
Lo trovi qui: Univ. Federico II
Opac: Controlla la disponibilità qui
Categorical framework for the study of singular spaces / / William Fulton and Robert MacPherson
Categorical framework for the study of singular spaces / / William Fulton and Robert MacPherson
Autore Fulton William <1939->
Pubbl/distr/stampa Providence, Rhode Island : , : American Mathematical Society, , [1981]
Descrizione fisica 1 online resource (173 p.)
Disciplina 510 s
514/.24
Collana Memoirs of the American Mathematical Society
Soggetto topico Homology theory
Categories (Mathematics)
ISBN 1-4704-0650-0
Formato Materiale a stampa
Livello bibliografico Monografia
Lingua di pubblicazione eng
Nota di contenuto ""Table of Contents""; ""Part I: Bivariant theories""; ""Â1 Survey""; ""1.1 Bivariant theories""; ""1.2 Grothendieck transformations""; ""1.3 Orientations and Gysin homomorphisms""; ""1.4 Formules of Riemann-Roch type""; ""1.5 An Example""; ""1.6 Guide to [BT]""; ""1.7 Acknowledgements""; ""Â2 Bivariant Theories""; ""2.1 The underlying category""; ""2.2 Axioms for a bivariant theory""; ""2.3 Associated contravariant and covariant functors""; ""2.4 External products""; ""2.5 Gysin homomorphisms""; ""2.6 Orientations""; ""2.7 Grothendieck transformations""; ""Â3 Topological Theories""
""3.1 Construction of a bivariant theory from a cohomology theory""""3.2 Grothendieck transformations of topological theories""; ""3.3 Supports""; ""3.4 Specialization""; ""Â4 Orientations in Topology""; ""4.1 Normally non-singular maps""; ""4.2 Cohomology operations""; ""4.3 Differentiable Riemann-Roch""; ""Â5 Transfer and Fixed Point Index""; ""Â6 Whitney Classes""; ""6.1 The bivariant theory FF""; ""6.2 The Grothendieck transformation Ï?""; ""6.3 Consequences of Theorem 6A""; ""6.4 Proof of uniqueness of Ï?""; ""6.5 Construction of Ï?""; ""6.6 Applications""
""Â7 Grothendieck Duality and Derived Functors""""7.1 Grothendieck duality""; ""7.2 Duality and Riemann-Roch""; ""7.3 Homology from derived functors""; ""7.4 Etale theory""; ""Â8 Operational Theories""; ""Â9 Rational Equivalence and Intersection Formulas""; ""9.1 Operational rational equivalence theory""; ""9.2 Intersection formulas""; ""Â10 Other Bivariant Theories; Open Problems""; ""10.1 Fixed point theorems for coherent sheaves""; ""10.2 Finite groups""; ""10.3 Orientations in algebraic geometry""; ""10.4 Chern classes""; ""10.5 Equivariant Whitney classes""; ""10.6 Verdier duality""
""10.7 Non-submersive maps in topology""""10.8 Independent squares for algebraic K-theory""; ""10.9 Uniqueness questions""; ""10.10 Analytic Riemann-Roch""; ""10.11 Rational equivalence""; ""10.12 Higher K-theory""; ""10.13 Geometric interpretation of bivariant homology elements""; ""Part II: Products in Riemann-Roch""; ""Â0 Introduction""; ""0.1 Some history""; ""0.2 Summary of results""; ""0.3 Plan of the proof""; ""Â1 Statement of the theorem""; ""1.1 Bivariant algebraic K-theory""; ""1.2 Morphisms of finite Tor dimension""; ""1.3 Local complete intersection morphisms""
""1.4 The Riemann-Roch theorem""""1.5 The Chern character""; ""1.6 Riemann-Roch with supports""; ""Â2 Complexes""; ""2.1 Topological complexes""; ""2.2 Some homological algebra""; ""2.3 An application""; ""2.4 The main lemma""; ""Â3 Proof of the theorem""; ""References""
Record Nr. UNINA-9910829189203321
Fulton William <1939->  
Providence, Rhode Island : , : American Mathematical Society, , [1981]
Materiale a stampa
Lo trovi qui: Univ. Federico II
Opac: Controlla la disponibilità qui
Curvas algebraicas : introducción a la geometría algebraica / / William Fulton
Curvas algebraicas : introducción a la geometría algebraica / / William Fulton
Autore Fulton William <1939->
Edizione [1st ed.]
Pubbl/distr/stampa Barcelona, España : , : Editorial Reverté, , 2005
Descrizione fisica 1 recurso en línea (147 páginas)
Disciplina 516.352
Soggetto topico Curves, Algebraic
Geometry, Algebraic
ISBN 84-291-9117-8
Formato Materiale a stampa
Livello bibliografico Monografia
Lingua di pubblicazione spa
Altri titoli varianti Introducción a la geometría algebraica
Record Nr. UNINA-9910794442703321
Fulton William <1939->  
Barcelona, España : , : Editorial Reverté, , 2005
Materiale a stampa
Lo trovi qui: Univ. Federico II
Opac: Controlla la disponibilità qui
Curvas algebraicas : introducción a la geometría algebraica / / William Fulton
Curvas algebraicas : introducción a la geometría algebraica / / William Fulton
Autore Fulton William <1939->
Edizione [1st ed.]
Pubbl/distr/stampa Barcelona, España : , : Editorial Reverté, , 2005
Descrizione fisica 1 recurso en línea (147 páginas)
Disciplina 516.352
Soggetto topico Curves, Algebraic
Geometry, Algebraic
ISBN 84-291-9117-8
Formato Materiale a stampa
Livello bibliografico Monografia
Lingua di pubblicazione spa
Altri titoli varianti Introducción a la geometría algebraica
Record Nr. UNINA-9910817035103321
Fulton William <1939->  
Barcelona, España : , : Editorial Reverté, , 2005
Materiale a stampa
Lo trovi qui: Univ. Federico II
Opac: Controlla la disponibilità qui
Schubert varieties and degeneracy loci / / William Fulton, Piotr Pragacz
Schubert varieties and degeneracy loci / / William Fulton, Piotr Pragacz
Autore Fulton William <1939->
Edizione [1st ed. 1998.]
Pubbl/distr/stampa Berlin, Heidelberg : , : Springer-Verlag, , [1998]
Descrizione fisica 1 online resource (X, 150 p.)
Disciplina 516.35
Collana Lecture Notes in Mathematics
Soggetto topico Schubert varieties
Intersection theory (Mathematics)
Vector bundles
ISBN 3-540-69804-3
Formato Materiale a stampa
Livello bibliografico Monografia
Lingua di pubblicazione eng
Nota di contenuto to degeneracy loci and schubert polynomials -- Modern formulation; Grassmannians, flag varieties, schubert varieties -- Symmetric polynomials useful in geometry -- Polynomials supported on degeneracy loci -- The Euler characteristic of degeneracy loci -- Flag bundles and determinantal formulas for the other classical groups -- and polynomial formulas for other classical groups -- The classes of Brill-Noether loci in Prym varieties -- Applications and open problems.
Record Nr. UNINA-9910146302703321
Fulton William <1939->  
Berlin, Heidelberg : , : Springer-Verlag, , [1998]
Materiale a stampa
Lo trovi qui: Univ. Federico II
Opac: Controlla la disponibilità qui
Schubert varieties and degeneracy loci / / William Fulton, Piotr Pragacz
Schubert varieties and degeneracy loci / / William Fulton, Piotr Pragacz
Autore Fulton William <1939->
Edizione [1st ed. 1998.]
Pubbl/distr/stampa Berlin, Heidelberg : , : Springer-Verlag, , [1998]
Descrizione fisica 1 online resource (X, 150 p.)
Disciplina 516.35
Collana Lecture Notes in Mathematics
Soggetto topico Schubert varieties
Intersection theory (Mathematics)
Vector bundles
ISBN 3-540-69804-3
Formato Materiale a stampa
Livello bibliografico Monografia
Lingua di pubblicazione eng
Nota di contenuto to degeneracy loci and schubert polynomials -- Modern formulation; Grassmannians, flag varieties, schubert varieties -- Symmetric polynomials useful in geometry -- Polynomials supported on degeneracy loci -- The Euler characteristic of degeneracy loci -- Flag bundles and determinantal formulas for the other classical groups -- and polynomial formulas for other classical groups -- The classes of Brill-Noether loci in Prym varieties -- Applications and open problems.
Record Nr. UNISA-996466872403316
Fulton William <1939->  
Berlin, Heidelberg : , : Springer-Verlag, , [1998]
Materiale a stampa
Lo trovi qui: Univ. di Salerno
Opac: Controlla la disponibilità qui