Home
About
Advanced Search
Browse by Discipline
Scientific Societies
E-print Alerts
Add E-prints
FAQ
•
HELP
•
SITE MAP
•
CONTACT US
Search
Advanced Search
Sadofsky, Hal - Department of Mathematics, University of Oregon
INVERTIBLE SPECTRA IN THE E(n)-LOCAL STABLE HOMOTOPY CATEGORY
The Tate spectrum of vn-periodic complex oriented theories
Contemporary Mathematics Commutative Morava homology Hopf algebras
TATE COHOMOLOGY OF THEORIES WITH ONE DIMENSIONAL COEFFICIENT RING.
Formal Group Laws and Algebraic Topology Lecture notes
THE KOSZUL PROPERTY AS A TOPOLOGICAL INVARIANT AND MEASURE OF SINGULARITIES.
TATE COHOMOLOGY OF THEORIES WITH ONE DIMENSIONAL COEFFICIENT RING.
RIEMANNIAN MANIFOLDS WHOSE SKEW-SYMMETRIC CURVATURE OPERATOR HAS CONSTANT EIGENVALUES
Completions of Z=(p)-Tate cohomology of periodic spectra Matthew Ando, Jack Morava and Hal Sadofsky1
RIEMANNIAN MANIFOLDS WHOSE SKEW-SYMMETRIC CURVATURE OPERATOR HAS CONSTANT EIGENVALUES
TATE COHOMOLOGY LOWERS CHROMATIC BOUSFIELD CLASSES
Formal Group Laws and Algebraic Topology Lecture notes
Completions of Z/(p)-Tate cohomology of periodic spectra Matthew Ando, Jack Morava and Hal Sadofsky1
The Tate spectrum of vn -periodic complex oriented theories
Commutative Morava homology Hopf algebras Hal Sadofsky and W. Stephen Wilson
