Loading

Error: Cannot Load Popup Box

Hit List

Title:

Kisin's classification of p-divisible groups over regular local rings

Publisher:

Bonn : MPI ; Göttingen : Niedersächsische Staats- und Universitätsbibliothek

Year of Publication:

2007

Subjects:

31.00

31.00 Minimize

URL:

Content Provider:

My Lists:

My Tags:

Notes:

Title:

Families of p-divisible groups with constant Newton polygon

Author:

Description:

Let X be a p-divisible group with constant Newton polygon over a normal noetherian scheme S. We prove that there exists an isogeny to X → Y such that Y admits a slope filtration. In case S is regular this was proved by N. Katz for dim S = 1 and by T. Zink for dim S ≥ 1.

Let X be a p-divisible group with constant Newton polygon over a normal noetherian scheme S. We prove that there exists an isogeny to X → Y such that Y admits a slope filtration. In case S is regular this was proved by N. Katz for dim S = 1 and by T. Zink for dim S ≥ 1. Minimize

Contributors:

The Pennsylvania State University CiteSeerX Archives

Year of Publication:

2009-04-18

Source:

http://www.math.ruu.nl/people/oort/AM-ZFO9.ps

http://www.math.ruu.nl/people/oort/AM-ZFO9.ps Minimize

Document Type:

text

Language:

en

Subjects:

for dim S 1

for dim S 1 Minimize

Rights:

Metadata may be used without restrictions as long as the oai identifier remains attached to it.

Metadata may be used without restrictions as long as the oai identifier remains attached to it. Minimize

URL:

Content Provider:

My Lists:

My Tags:

Notes:

Title:

Families

Author:

Description:

of p-divisible groups with constant Newton polygon

of p-divisible groups with constant Newton polygon Minimize

Contributors:

The Pennsylvania State University CiteSeerX Archives

Year of Publication:

2012-11-06

Source:

http://arxiv.org/pdf/math/0209264v1.pdf

http://arxiv.org/pdf/math/0209264v1.pdf Minimize

Document Type:

text

Language:

en

Rights:

Metadata may be used without restrictions as long as the oai identifier remains attached to it.

Metadata may be used without restrictions as long as the oai identifier remains attached to it. Minimize

URL:

Content Provider:

My Lists:

My Tags:

Notes:

Title:

DUKE MATHEMATICAL JOURNAL Vol. 109, No. 1, © 2001 ON THE SLOPE FILTRATION

Author:

Description:

Let X be a p-divisible group over a regular scheme S such that the Newton polygon in each geometric point of S is the same. Then there is a p-divisible group isogenous to X which has a slope filtration. 1.

Let X be a p-divisible group over a regular scheme S such that the Newton polygon in each geometric point of S is the same. Then there is a p-divisible group isogenous to X which has a slope filtration. 1. Minimize

Contributors:

The Pennsylvania State University CiteSeerX Archives

Year of Publication:

2011-12-18

Source:

http://202.38.126.65/mathdoc/Duke.Mathematical.Journal/DMJ10901_3.pdf

http://202.38.126.65/mathdoc/Duke.Mathematical.Journal/DMJ10901_3.pdf Minimize

Document Type:

text

Language:

en

Rights:

Metadata may be used without restrictions as long as the oai identifier remains attached to it.

Metadata may be used without restrictions as long as the oai identifier remains attached to it. Minimize

URL:

Content Provider:

My Lists:

My Tags:

Notes:

Title:

Title not available

Author:

Description:

Boundedness results for finite flat group schemes over discrete valuation rings of mixed characteristic

Boundedness results for finite flat group schemes over discrete valuation rings of mixed characteristic Minimize

Contributors:

The Pennsylvania State University CiteSeerX Archives

Year of Publication:

2013-07-16

Source:

http://www.math.binghamton.edu/adrian/VZ3.pdf

http://www.math.binghamton.edu/adrian/VZ3.pdf Minimize

Document Type:

text

Language:

en

Rights:

Metadata may be used without restrictions as long as the oai identifier remains attached to it.

URL:

Content Provider:

My Lists:

My Tags:

Notes:

Title:

Breuil’s classification of p-divisible groups over regular local rings

Author:

Description:

of arbitrary dimension

of arbitrary dimension Minimize

Contributors:

The Pennsylvania State University CiteSeerX Archives

Year of Publication:

2010-12-14

Source:

http://www.math.binghamton.edu/adrian/VZ1.pdf

http://www.math.binghamton.edu/adrian/VZ1.pdf Minimize

Document Type:

text

Language:

en

Rights:

Metadata may be used without restrictions as long as the oai identifier remains attached to it.

URL:

Content Provider:

My Lists:

My Tags:

Notes:

Title:

The Display of a Formal p-Divisible Group

Author:

Description:

Introduction We fix throughout a prime number p . Let R be a commutative unitary ring. Let W (R) be the ring of Witt vectors. The ring structure on W (R) is functorial in R and has the property that the Witt polynomials are ring homomorphisms: w n : W (R) \Gamma! R (x 0 ; : : : x i ; : : : ) 7! x p n 0 + px p n\Gamma1 1 + : : : + p n x n Let us ...

Introduction We fix throughout a prime number p . Let R be a commutative unitary ring. Let W (R) be the ring of Witt vectors. The ring structure on W (R) is functorial in R and has the property that the Witt polynomials are ring homomorphisms: w n : W (R) \Gamma! R (x 0 ; : : : x i ; : : : ) 7! x p n 0 + px p n\Gamma1 1 + : : : + p n x n Let us denote the kernel of the homomorphism w 0 by I R . The Verschiebung is a homomorphism of additive groups: V : W (R) \Gamma!<F63. Minimize

Contributors:

The Pennsylvania State University CiteSeerX Archives

Year of Publication:

2009-04-12

Source:

http://www.mathematik.uni-bielefeld.de/sfb343/preprints/pr98017.ps.gz

http://www.mathematik.uni-bielefeld.de/sfb343/preprints/pr98017.ps.gz Minimize

Document Type:

text

Language:

en

Rights:

Metadata may be used without restrictions as long as the oai identifier remains attached to it.

URL:

Content Provider:

My Lists:

My Tags:

Notes:

Title:

Breuil’s classification of p-divisible groups over regular local rings of arbitrary dimension, Algebraic and arithmetic structures of moduli spaces

Author:

Description:

Abstract. Let k be a perfect field of characteristic p ≥ 3. We classify p-divisible groups over regular local rings of the form W(k)[[t1,.,tr, u]]/(u e + pbe−1u e−1 +. + pb1u + pb0), where b0,.,be−1 ∈ W(k)[[t1,.,tr]] and b0 is an invertible element. This classification was in the case r = 0 conjectured by Breuil and proved by Kisin. MSC 2000: 11...

Abstract. Let k be a perfect field of characteristic p ≥ 3. We classify p-divisible groups over regular local rings of the form W(k)[[t1,.,tr, u]]/(u e + pbe−1u e−1 +. + pb1u + pb0), where b0,.,be−1 ∈ W(k)[[t1,.,tr]] and b0 is an invertible element. This classification was in the case r = 0 conjectured by Breuil and proved by Kisin. MSC 2000: 11G10, 11G18, 14F30, 14G35, 14K10, and 14L05. 1 Minimize

Contributors:

The Pennsylvania State University CiteSeerX Archives

Year of Publication:

2013-08-04

Source:

http://arxiv.org/pdf/0808.2792v3.pdf

http://arxiv.org/pdf/0808.2792v3.pdf Minimize

Document Type:

text

Language:

en

Rights:

Metadata may be used without restrictions as long as the oai identifier remains attached to it.

URL:

Content Provider:

My Lists:

My Tags:

Notes:

Title:

P2P-RMI: Transparent Distribution of Remote Java Objects

Author:

Description:

Java Remote Method Invocation (RMI) is a built-in and easy-to-use framework for the distribution ofremote Java objects. Its simplicity and seamless inter-virtual machine communication has made it avaluable tool for distributed services. It nevertheless exhibits certain constraints that practically limitRMI applications to the classical client/se...

Java Remote Method Invocation (RMI) is a built-in and easy-to-use framework for the distribution ofremote Java objects. Its simplicity and seamless inter-virtual machine communication has made it avaluable tool for distributed services. It nevertheless exhibits certain constraints that practically limitRMI applications to the classical client/server distribution model, and make highly distributed and highlydynamic systems very difficult to build atop RMI.We present an approach that makes Java RMI usable for P2P and similar distribution models. Thesolution basically consists of three ideas: (1) separate the location of the registry from the remote serviceobject, (2) distribute the registry across a DHT infrastructure, and (3) transparently enhance the built-incommunication between RMI servers and clients to allow traversal of NAT and firewall boundaries. Ourapproach is extremely lightweight, transparent, and requires practically zero configuration. Minimize

Publisher:

Academy & Industry Research Collaboration Center (AIRCC)

Year of Publication:

2012-10-01T00:00:00Z

Document Type:

article

Language:

English

Subjects:

P2P ; RMI ; LCC:Electronic computers. Computer science ; LCC:QA75.5-76.95 ; LCC:Instruments and machines ; LCC:QA71-90 ; LCC:Mathematics ; LCC:QA1-939 ; LCC:Science ; LCC:Q ; DOAJ:Computer Science ; DOAJ:Technology and Engineering ; LCC:Electronic computers. Computer science ; LCC:QA75.5-76.95 ; LCC:Instruments and machines ; LCC:QA71-90 ; LCC:M...

P2P ; RMI ; LCC:Electronic computers. Computer science ; LCC:QA75.5-76.95 ; LCC:Instruments and machines ; LCC:QA71-90 ; LCC:Mathematics ; LCC:QA1-939 ; LCC:Science ; LCC:Q ; DOAJ:Computer Science ; DOAJ:Technology and Engineering ; LCC:Electronic computers. Computer science ; LCC:QA75.5-76.95 ; LCC:Instruments and machines ; LCC:QA71-90 ; LCC:Mathematics ; LCC:QA1-939 ; LCC:Science ; LCC:Q ; DOAJ:Computer Science ; DOAJ:Technology and Engineering Minimize

Rights:

CC by

CC by Minimize

Relations:

http://airccse.org/journal/cnc/0912cnc02.pdf

URL:

Content Provider:

My Lists:

My Tags:

Notes:

Title:

schemes over regular bases

Author:

Description:

results for p-divisible groups and abelian

results for p-divisible groups and abelian Minimize

Contributors:

The Pennsylvania State University CiteSeerX Archives

Year of Publication:

2012-11-22

Source:

http://arxiv.org/pdf/0909.0969v1.pdf

http://arxiv.org/pdf/0909.0969v1.pdf Minimize

Document Type:

text

Language:

en

Rights:

Metadata may be used without restrictions as long as the oai identifier remains attached to it.

URL:

Content Provider:

My Lists:

My Tags:

Notes:

Currently in BASE: 69,672,666 Documents of 3,344 Content Sources

http://www.base-search.net