Stable Homotopy Theory: Lectures Delivered at the University of California at Berkeley 1961 |
Contents
Introduction | 1 |
Stable homotopy theory Construction | 22 |
Applications of homological algebra | 38 |
Copyright | |
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Common terms and phrases
A-map admissible monomials apply C₁ Cartan formula chain complex cohomology operations commute comparison theorem conjecture consider construct correspondence cup-product d₂ define deformation differentials dimension E2 term Eckmann Edited Eilenberg-MacLane objects Eilenberg-MacLane space elements of odd equivalent exact sequences exterior algebra Exts,t f₁ fibering finite function give h₂ homological algebra homology homomorphism homotopy classes Hopf algebra induction isomorphically by f J-homomorphism L,Z₂ lemma linearly independent little Borel theorem Manuskripte map f Map X,Y morphisms odd torsion group pair X,Y periodicity polynomial algebra proof properties prove question quotient recall Remark resolution S-theory Seiten Séminaire Seminar Serre Spanier-Whitehead spectral sequence Sq Sq Sq Sq¹ stable complex stable homotopy theory stable objects Steenrod algebra Steenrod square subgroup Suppose given suspension tortoise universal examples vector fields Xn+1 Z₂