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Sunday, April 19, 2020 | History

5 edition of **Morava K-theories and localisation** found in the catalog.

- 157 Want to read
- 38 Currently reading

Published
**1999** by American Mathematical Society in Providence, R.I .

Written in English

- K-theory.,
- Localization theory.

**Edition Notes**

Statement | Mark Hovey, Neil P. Strickland. |

Series | Memoirs of the American Mathematical Society,, no. 666 |

Contributions | Strickland, Neil P., 1966- |

Classifications | |
---|---|

LC Classifications | QA3 .A57 no. 666, QA612.3 .A57 no. 666 |

The Physical Object | |

Pagination | viii, 100 p. ; |

Number of Pages | 100 |

ID Numbers | |

Open Library | OL34877M |

ISBN 10 | 0821810790 |

LC Control Number | 99019210 |

Mathematical Sciences book recommendation by: @ Author/Heading: A. Kaushik Title and series: Web Analytics: An hour a day Edition: No. of vols.: ISBN: Date of Publication: Place: Chichester Publisher: Wiley Price: Source of Reference: Amazon UK Other info: Priority: Essential Category: Primary Research Mathematical Sciences book.

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Morava K-theories and localisation. [Mark Hovey; Neil P Strickland] Home. WorldCat Home About WorldCat Help. Search. Search for Library Items Search for Lists Search for Book, Internet Resource: All Authors / Contributors: Mark Hovey; Neil P Strickland. Find more information about: ISBN: ISBN: OCLC Number: Notes: "Mayvolumenumber (end of volume)." Description: 1 online resource (viii, pages).

Morava K-theories and localisation Article in Memoirs of the American Mathematical Society 00() January with 41 Reads How we measure 'reads'. In stable homotopy theory, a branch of mathematics, Morava K-theory is one of a collection of cohomology theories introduced in algebraic topology by Jack Morava in unpublished preprints in the early s.

For every prime number p (which is suppressed in the notation), it consists of theories K(n) for each nonnegative integer n, each a ring spectrum in the sense of homotopy. Memoirs of the American Mathematical Society ; pp; MSC: Primary 55; Electronic ISBN: Product Code: MEMO//E List Price: $ AMS Member Price: $ MAA Member Price: $ Urs Würgler, Morava K-theories: a survey; in Algebraic topology Poznan–, Lecture Notes in Math.,Springer, Berlin, ; Mark Hovey, Neil P.

Strickland, Morava K-theories and localisation. Mem. Amer. Math. Soc. () ; Paul Goerss, (Pre-)sheaves of ring spectra over the moduli stack of formal group mater: Rice University. The Morava K-theories of Eilenberg-MacLane spaces and the Conner-Floyd conjecture, Amer.

Math. (),– MathSciNet Cited by: Morava K-Theories and Localisation (Memoirs of the American Mathematical Society) May 1, by Mark Hovey, Neil P. Strickland. Stack Exchange network consists of Q&A communities including Stack Overflow, the largest, most trusted online community for developers to learn, share their knowledge, and build their careers.

Visit Stack Exchange. Hovey and N.P. Strickland, Morava K-theories and localisation, Mem. Amer. Math. Soc. (), no. Ramification in p-adic Lie extensions Journées de Author: Takeshi Torii. We calculate the (p=2) Morava K-theory of all of the spaces in the connective Omega spectra for Z ×BO, BO, BSO, and leads to a description of the (p=2) Brown–Peterson cohomology of many of these spaces.

Of particular interest is the space BO〈8〉 and its relationship to by: MORAVA K-THEORY OF EILENBERG-MAC LANE SPACES ERIC PETERSON This talk is about a s computation by Ravenel and Wilson of the Morava K-theories of certain Eilenberg-Mac Lane spaces.

This is a really neat computation, and it involves essentially all the sorts of algebra and algebraic. Abstract. We completely describe the Morava K-theories with respect to the prime p for the étale model of the classifying space of \(G{L_m}\left({\mathbb{Z}\left[ {\sqrt[p]{1},1/p} \right]} \right)\) when p is an odd regular p = 3 and m = 2 (and conjecturally for m = ∞) these cohomologies are the same as those of the classifying space : Marian F.

Anton. Morava K-theories with K-theory \stabilizing" to even degrees. We thought that our results or proofs would need exotic types of completion. However, such examples cannot exist. Because K(0) does not t the pattern we must sometimes go to the p-adic completion of BPfor our results.

Proposition If X and Y have even Morava K-theory, then so. We develop some basic methods for calculating Morava K-theories of compact Lie groups, and compute certain pivotal show that K ̃ (2) ∗ BP has odd elements, where P is the 3-Sylow subgroup of GL 4 (Z/3).

This disproves a conjecture of Hopkins, Kuhn and Ravenel. We also calculate Morava K-theories of semidirect products of cyclic groups with elementary Cited by: Morava K-theories and localisation, Mark Hovey and Neil Strickland: Symmetric spectra, preprint: M.

Hovey, B. Shipley, and J. Smith: Spectra and symmetric spectra in general model categories, Preprint: Mark Hovey: MORITA THEORY FOR HOPF ALGEBROIDS and PRESHEAVES OF GROUPOIDS, Mark Hovey. collects all we need to know about the Morava K-theories of groups of smaller order.

Section 4 lists the 51 groups of order 32 and disposes of those whose Morava K-theory is either in the literature or can easily be read oﬀ from known computations.

Finally, Section 5 contains the remaining calculations. Date: Novem Cited by: We will also show that twisted Morava K-theory is, in some sense, a reduction of twisted Morava E-theory.

The proofs of Theorems and rely heavily on the computations of the Morava K-theory of Eilenberg–MacLane spaces, originally due to Ravenel–Wilson [41], and recently revisited in Hopkins–Lurie [20].

Daniel G. Quillen, On the formal group laws of unoriented and complex cobordism theory, Bulletin of the American Mathematical Society 75 (), MR () [26]Cited by: 6. The enjoyment of theatre (9th edition) book: jim The Enjoyment of Theatre (9th Edition) by Jim A.

Patterson,Tim Donahue. our price 6, Save Rs. [PDF] Morava K-Theories And [PDF] How To Draw A Chibi Girl - A Tutorial. You can write a book review and share your experiences. Other readers will always be interested in your opinion of the books you've read. Whether you've loved the book or not, if you give your honest and detailed thoughts then people will find new books that are right for them., Free ebooks since ITERATED CHROMATIC LOCALISATION N.

STRICKLAND AND N. BELLUMAT Abstract. We study a certain monoid of endofunctors of the stable homotopy category that includes localizations with respect to ﬁnite unions of Morava K-theories.

We work in an axiomatic framework that can also be applied to analogous questions in equivariant stable homotopy theory.

In Section 14 of Morava K-theories and localisation, Hovey and Strickland discuss an obstruction to extending this to something compatible with the monoidal structure (possessing appropriate maps $\pi_\alpha X \otimes \pi_\beta Y \to \pi_{\alpha \odot \beta}(X \odot Y)$ satisfying all the desired naturality properties).

They comment that there. Broto and S. Zarati: On sub-A*-algebras of H*V.- M.J. Hopkins, N.J. Kuhn, D.C. Ravenel: Morava K-theories of classifying spaces and generalized characters for finite groups.- K. Ishiguro: Classifying spaces of compact simple lie groups and p-tori.- A.T.

Lundell: Concise tables of James numbers and some homotopyof classical Lie groups and. Mark Hovey and Neil P. Strickland, Morava K-theories and localisation. Nguyen H. Hu'ng and Franklin P. Peterson, Spherical classes and the Dickson algebra.

Michele Intermont, An Equivarinat van Kampen Spectral Sequence. Kenshi Ishiguro, Pairings of p-compact groups and H-structures on the classifying spaces of finite loop spaces.

We import into homotopy theory the algebrogeometric construction of the cotangent space of a geometric point on a scheme. Specializing to the category of spectra local to a Morava K –theory of height d, we show that this can be used to produce a choice-free model of the determinantal sphere as well as an efficient Picard-graded cellular decomposition of K (ℤ p, d + 1).

Morava K-theories and Localisation Kicking Mrs Winters Out, Alexander Bailey Being Black - Aboriginal cultures in 'settled' Australia, Ian Keen Home Remodeling for Dummies, Morris.

Morava ﬁrst constructed these homology theories by employing a fundamental connection, uncovered by Quillen, between sta-ble homotopy theory and the theory of formal Lie groups. Because of the strength of this con-nection, the Morava K–theories exert a remarkable amount of control over the stable category.

Notes from the semester class at Harvard. Contribute to ecpeterson/FormalGeomNotes development by creating an account on GitHub. Similarly for elliptic cohomology, cobordism, Morava K-theories, etc, etc. All of these should have Galois actions as well coming from that on π ∞ (X) \pi_{\infty}(X).

A lot of results about stable homotopy theory probably translate more or less immediately to these l l-adic versions. Things like the construction of Chern classes for example. [CF66] PE Conner and EE Floyd. The relation of cobordism to k-theories. [DHS88] Ethan S Devinatz, Michael J Hopkins, and Je rey H Smith.

Nilpotence and stable homotopy theory i. Annals of Mathematics, (2){, [Hat03] Allen Hatcher. Vector bundles and k-theory. available on the author’s website, [Hop99] Michael J Hopkins. well as with respect to the Morava K-theories K(n) which play the role of a kind of residue ﬁeld for E(n). These localised categories can be viewed as approximations to the homotopy category of spectra.

Essentially, Bousﬁeld localisation serves to focus attention on the part of stable homotopy theory visible to a given homology theory. Morava K-theories And Localisation: T+ 22 MB: Differential Infrared Radiometer-based Thermometric Instrument For Non-contact Temperature And Frict: T+ 19 MB: Hollywood Talks Turkey: The Screens Greatest Flops: T+ 22 MB.

In joint work with Birgit Richter, we study the Morava K-theories of THH(E(n)), with an aim at investigating if McClure-Staffeldt’s splitting in lower chromatic pieces generalizes.

Under the assumption that E(2) is commutative, we show that THH(E(2)) splits as a wedge sum of E(2) and its lower chromatic localizations. A case of monoidal uniqueness of algebraic models A case of monoidal uniqueness of algebraic models Roitzheim, Constanze We prove that there is at most one algebraic model for modules over the K.1/-local sphere at odd primes that retains some monoidal information.

Keywords. Homotopical algebra, stable homotopy theory. on transfers, characteristic classes and cohomology rings (in particular for Morava K-theories). Publications and prepublications: Book.

On Structured Ring Spectra (volume of the. London Mathematical Society Lecture Notes. Series, Cambridge University Press ()) Hans-Joachim Baues, Elias Gabriel Minian, Birgit Richter. Voevodsky: BK conjecture for Z mod 2 coeffs and algebraic Morava K-theories. File in Voevodsky folder.

Discussion of BK conj and related conjectures. P axioms for cohomology theories on simplicial schemes. Proof that existence of algebraic Morava K-theories satisfying certain properties would imply the BK conjecture.

Problem book in the theory of functions- Vol I: problems in the elementary theory of functions. Knopp, # Functions of a complex variable. In stable homotopy theory, there are many "intermediate" characteristics (p.n) associated with the so called "Morava K-theories".

It turns out that the norm map is an isomorphism in all those intermediate characteristics and a vast generalization to. [23] Mark Hovey and Neil P Strickland, Morava K-theories and localisation, Mem. Amer. Math.

Soc. (), no.[24] David J. Hunter and Nicholas J. Kuhn, Characterizations of spectra with U -injective cohomology which satisfy the Brown-Author: Neil Strickland.

Morfismos issue for December Morfismos, Vol. 13, No. 2,pp. 1– The Arf-Kervaire invariant of framed manifolds.Time-periodic shear layers occur naturally in a wide range of applications from engineering to physiology.

Transition to turbulence in such flows is of practical interest and there have been several papers dealing with the stability of flows composed of a steady component plus an oscillatory part with zero mean.Together with MATHS Introduction to Financial Mathematics I, this course provides an introduction to the basic mathematical concepts and techniques used in finance and business and includes topics from calculus, linear algebra and probability, emphasising their inter-relationships and applications to the financial area; introduces students to the use of computers in .