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Douglas Ravenel
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1	REMEMBERING MARK MAHOWALD 1931–2013 DOUGLAS C. RAVENEL WITH CONTRIBUTIONS BY MARTIN C. TANGORA, STEWART B. PRIDDY, DONALD M. DAVIS, MARK J. BEHRENS AND WEN-HSIUNG LIN UNABRIDGED VERSION OF A SIMILAR ARTICLE THAT APPEAR Add to Reading List Source URL: web.math.rochester.edu - Date: 2016-09-27 09:46:57
2	THE HOPF RING FOR P (n) DOUGLAS C. RAVENEL AND W. STEPHEN WILSON Abstract. We show that E∗ (P (n) ), the E-homology of the Ω-spectrum for ∗ P (n), is an E∗ free Hopf ring for E a complex oriented theory with In s Add to Reading List Source URL: www.math.jhu.edu - Date: 2014-03-30 15:19:14
3	Journal of Pure and Applied Algebra. © North-Holland Publishing Company THE HOPF RING FOR COMPLEX COBORDISM Douglas C. RAVENEL* Columbia University and University of Washington Add to Reading List Source URL: www.math.jhu.edu - Date: 2014-03-30 15:19:15
4	BULLETIN OF THE AMERICAN MATHEMATICAL SOCIETY Volume 80, Number 6, November 1974 THE HOPF RING FOR COMPLEX COBORDISM1 BY DOUGLAS C. RAVENEL AND W. STEPHEN WILSON Add to Reading List Source URL: www.math.jhu.edu Language: English - Date: 2014-03-30 15:19:14 Algebra Abstract algebra Algebraic topology Mathematics Complex cobordism BrownPeterson cohomology Cobordism Cohomology Formal group Ring Steenrod algebra Landweber exact functor theorem
5	Model structures and their applications GRK 1150 PhD-seminar In the past the language of model categories has been an enormously helpful tool to describe phenomena in homotopy theory, and in this seminar we would like to Add to Reading List Source URL: www.math.uni-bonn.de Language: English - Date: 2005-11-23 11:13:14 Abstract algebra Algebra Homotopy theory Mathematics Model category Cohomology Douglas Ravenel Highly structured ring spectrum Bousfield localization Rational homotopy theory Homotopy category Derived category
6	W. Stephen Wilson Education: S.B., M.I.T. (MathS.M., M.I.T. (MathPh.D., M.I.T. (MathField: Algebraic Topology: Homotopy Theory: Complex Cobordism: Brown-Peterson Add to Reading List Source URL: www.math.jhu.edu Language: English - Date: 2016-06-04 08:09:41 Algebraic topology Homotopy theory Douglas Ravenel Cohomology theories Michael Boardman Cohomology Morava K-theory Goro Nishida Adams spectral sequence W. Stephen Wilson Spectrum Complex cobordism
7	Graduate Student Seminar in Sommer Term 2011: Chromatic Homotopy Theory Lennart Meier April 4, 2011 The stable homotopy groups of spheres are one of the central objects of algebraic topology. While it is relatively easy Add to Reading List Source URL: www.math.uni-bonn.de Language: English - Date: 2011-04-05 05:45:17 Homotopy theory Algebraic topology Adams spectral sequence Douglas Ravenel Homotopy groups of spheres Cohomology Steenrod algebra Spectral sequence Chromatic spectral sequence Frank Adams Complex cobordism BrownPeterson cohomology
8	Johns Hopkins University March 10-13, 2007 W. Stephen Wilson Douglas Ravenel Add to Reading List Source URL: www.math.jhu.edu - Date: 2007-02-20 10:30:57
9	Contemporary Mathematics What we still don’t know about loop spaces of spheres Douglas C. Ravenel University of Rochester Abstract. We describe a program for computing the Morava K-theory of Add to Reading List Source URL: www.math.rochester.edu Language: English - Date: 2004-04-27 12:27:38 Algebraic topology Algebra Homotopy groups of spheres Steenrod algebra Eilenberg–MacLane space Spectral sequence Spectrum EHP spectral sequence Eilenberg–Moore spectral sequence Abstract algebra Topology Homotopy theory
10	Johns Hopkins University March 10-13, 2007 W. Stephen Wilson Douglas Ravenel Add to Reading List Source URL: math.jhu.edu - Date: 2007-02-20 10:30:57

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