PROJECTIVE PRODUCT SPACES DONALD M. DAVIS Abstract. Let n = (n1 , . . . , nr ). The quotient space Pn := S n1 × · · · × S nr (x ∼ −x) is what we call a projective product space. We determine the integral cohomo - Projective bundle - Document - PDFSEARCH.IO

First Page		Document Content
Date: 2009-08-24 07:19:56 Algebra Projective space Steenrod algebra Serre spectral sequence Sheaf Thom space Cohomology Line bundle Abstract algebra Topology Algebraic topology		PROJECTIVE PRODUCT SPACES DONALD M. DAVIS Abstract. Let n = (n1 , . . . , nr ). The quotient space Pn := S n1 × · · · × S nr /(x ∼ −x) is what we call a projective product space. We determine the integral cohomo Add to Reading List Source URL: www.lehigh.edu Download Document from Source Website File Size: 254,16 KB Share Document on Facebook

	441 Documenta Math. Rings of Integers of Type K(π, 1) Alexander Schmidt DocID: 1rjxx - View Document
	565 Documenta Math. Absolute Derivations and Zeta Functions Dedicated to Professor Kazuya Kato’s 50th birthday DocID: 1qcpk - View Document
	395 Doc. Math. J. DMV Applications of Weight-Two Motivic Cohomology Bruno Kahn DocID: 1qbyN - View Document
	565 Documenta Math. Absolute Derivations and Zeta Functions Dedicated to Professor Kazuya Kato’s 50th birthday DocID: 1q2DN - View Document
	147 K-Theory 15: 147–199, 1998. © 1998 Kluwer Academic Publishers. Printed in the Netherlands. Brown–Peterson Cohomology from Morava K-Theory DocID: 1pYV7 - View Document