<--- Back to Details
First PageDocument Content
Mathematics / Order theory / Non-standard analysis / Abstraction / Structure / Ultrafilter / Boolean algebra / Ideal / Ordinal number
Date: 2010-06-06 18:41:48
Mathematics
Order theory
Non-standard analysis
Abstraction
Structure
Ultrafilter
Boolean algebra
Ideal
Ordinal number

Introduction van der Waerden ideal W-ultrafilters

Add to Reading List

Source URL: spot.colorado.edu

Download Document from Source Website

File Size: 478,83 KB

Share Document on Facebook

Similar Documents

CVS: $Id: diary.tex,v18:18:26 david Exp $ :001 Let U be a ultrafilter on Z. Say that a subset A of Z is green (for lack of a better name!) relative to U iff for every k ∈ A the translation A

CVS: $Id: diary.tex,v18:18:26 david Exp $ :001 Let U be a ultrafilter on Z. Say that a subset A of Z is green (for lack of a better name!) relative to U iff for every k ∈ A the translation A

DocID: 1uEgA - View Document

HINDMAN’S THEOREM VIA ULTRAFILTERS LEO GOLDMAKHER Abstract. A self-contained exposition of the ultrafilter proof of Hindman’s theorem. This proof was explained to me by Mike Pawliuk. 1. Motivation

HINDMAN’S THEOREM VIA ULTRAFILTERS LEO GOLDMAKHER Abstract. A self-contained exposition of the ultrafilter proof of Hindman’s theorem. This proof was explained to me by Mike Pawliuk. 1. Motivation

DocID: 1sUWr - View Document

Introduction van der Waerden ideal W-ultrafilters

Introduction van der Waerden ideal W-ultrafilters

DocID: 1np28 - View Document

Continuous Cofinal Maps on Ultrafilters Natasha Dobrinen University of Denver joint work with Stevo Todorcevic

Continuous Cofinal Maps on Ultrafilters Natasha Dobrinen University of Denver joint work with Stevo Todorcevic

DocID: 1mYz3 - View Document

Topology and Markets Graciela Chichilnisky ` Editor Fields Institute Communications Volume 22, 1999

Topology and Markets Graciela Chichilnisky ` Editor Fields Institute Communications Volume 22, 1999

DocID: 1gbV8 - View Document