David Fernández: Every strongly summable ultrafilter is sparse

Posted on May 16, 2013 by | 1 Comment

24/May/2013, 13:30–15:00
Fields institute,Room 210

Speaker: David J. Fernández Bretón

Title: “Every strongly summable ultrafilter is sparse!”

Abstract: The concept of a Strongly Summable Ultrafilter was born from Hindman’s efforts for proving the theorem that now bears his name (which at the time was known as Graham-Rothschild’s conjecture), although later on it got a life of its own and started to be studied for its own sake, mostly because of its nice algebraic properties. At the time the focus was on ultrafilters over the semigroup $(\mathbb N,+)$, but eventually Hindman, Protasov and Strauss generalized much of this theory to abelian groups in general in a 1998 paper. In that same paper, they introduced the notion of a sparse ultrafilter, one which subsumes that of strongly summable as a particular case but that has even nicer algebraic properties. In a 2012 paper, Hindman, Steprans and Strauss found a large class of abelian groups (which included $(\mathbb N,+)$) over which every strongly summable ultrafilter must be sparse.
In this talk I extend this result to all abelian groups. Moreover we show that in most cases the strong summability of these ultrafilters is due to their being additively isomorphic to a union ultrafilter (I will explain what this means). However, this does not happen in all cases: I will also construct (assuming $\mathfrak p=\mathfrak c$), on the Boolean group, a strongly summable ultrafilter that is not additively isomorphic to any union ultrafilter.

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2014 Winter School, Jan 25 – Feb 1, 2014

Posted on May 14, 2013 by | Leave a comment

www.winterschool.eu

Hejnice, Czech Republic, 25/Jan/2014 — 1/Feb/2014

Tutorial Speakers:

The price for the conference is 300 EUR and this covers all expenses including the bus from Prague to Hejnice and back. Accommodation will be in double rooms.

There is also a limited amount of money to support students and researchers without other sources of funding.

Important deadlines are:

Financial support application – Dec 11th
Registration – Dec 31st

Organizers:
David Chodounský, Jan Starý and Jonathan Verner

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Arnold W. Miller: Countable subgroups of Euclidean Space

Posted on May 13, 2013 by | Leave a comment

17/May/2013, 13:30–15:00
Fields institute,Room 210

Speaker: Arnold W. Miller

Title: Countable subgroups of Euclidean Space

Abstract:

In his PhD Thesis Konstantinos Beros proved a number of results about compactly generated subgroups of Polish groups. Such a group is K-sigma – the countable union of compact sets. He notes that the group of rationals under addition with the discrete topology is an example of a Polish group which is K-sigma (since it is countable) but not compactly generated.

Beros showed that for any Polish group G, every K-sigma subgroup of G is compactly generated iff every countable subgroup of G is compactly generated. Beros showed that any K-sigma subgroup of Z^omega (infinite product of the integers) is compactly generated and more generally, for any Polish group G, if every countable subgroup of G is finitely generated, then every countable subgroup of G^omega is compactly generated.

In unpublished work Beros asked whether finitely generated may be replaced by compactly generated in his theorem. He conjectured that the reals R under addition might be an example such that every countable subgroup of R is compactly generated but not every countable subgroup of R^omega is compactly generated. We prove that this is not true. The general question remains open.

In the course of our proof we came up with some interesting countable subgroups. We show that there is a dense subgroup of the plane which meets every line in a discrete set. Furthermore, for each n there is a dense subgroup of Euclidean space R^n which meets every (n-1)-dimensional subspace in a discrete set. Similarly there is a dense subgroup of R^omega which meets every finite dimensional subspace of R^omega in a discrete set.

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Monroe Eskew: Foreman’s Duality Theorem and Applications II

Posted on May 9, 2013 by | Leave a comment

Speaker: Monroe Eskew
Institution: UCI
Time: Mon, 05/13/2013 – 4:00pm – 5:30pm
Host: Martin Zeman
Location: RH 440R

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Peter Koepke: Namba-like singularizations of successor cardinals

Posted on May 8, 2013 by | Leave a comment

Monday, May 13, 2013, 16.30
Seminar room 1.008, Mathematical Institute, University of Bonn

Speaker: Peter Koepke (Bonn University)

Title: Namba-like singularizations of successor cardinals

Abstract:

Bukowski-Namba forcing preserves aleph_1 and changes the cofinality of aleph_2 to omega. We lift this to cardinals kappa > aleph_1: Assuming a measurable cardinal lambda we construct models over which there is a further “Namba-like” forcing which preserves all cardinals <= kappa and changes the cofinality of kappa^+ to omega. Cofinalities different from omega can also be achieved by starting from measurable cardinals of sufficiently strong Mitchell order. Using core model theory one can show that the respective measurable cardinals are also necessary. This is joint work with Dominik Adolf (Münster).

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Philipp Schlicht: Generalized Choquet spaces and groups

Posted on May 8, 2013 by | Leave a comment

Monday, May 6, 2013, 16.30
Seminar room 1.008, Mathematical Institute, University of Bonn

Speaker: Philipp Schlicht (Bonn University)

Title: Generalized Choquet spaces and groups

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There will be no more seminars this semester

Posted on May 7, 2013 by | Leave a comment

Rutgers Logic Seminars
Spring 2013

Descriptive Set Theory Seminar
Hill 423
There will be no more seminars
this semester.

Rutgers Logic Seminar
Hill 423
Monday May 6th, 5:00-6:20 pm
There will be no more seminars
this semester.

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This Week in Logic at CUNY

Posted on May 6, 2013 by | Leave a comment
Computational Logic Seminar

Tuesday, May 7, 2013 2:00 pm Graduate Center, rm. 3209
Speaker: Yoram Moses Israel Institute of Technology – Technion
Title: Knowledge and the Passage of Time
This talk will discuss how knowledge, nested knowledge, and common knowledge are gained in the presence of clocks and time bound information. It will complement the previous talk, in providing the causal structure underlying knowledge gain, from which the causal structure underlying basic coordination follows.

The talk will be based on joint work with Ido Ben Zvi.

Models of PA
Wednesday, May 8, 2013 5:00 pm GC 4214.03 
Speaker: Ermek Nurkhaidarov Penn State Mont Alto
Title: The automorphism group of a model of arithmetic: recognizing standard system
Let M be countable recursively saturated model of Peano Arithmetic. In the talk I will discuss ongoing research on recognizing standard system of M in the automorphism group of M.


Set theory seminar
Friday, May 10, 2013 8:00 am GC 5383 
Speaker: Joel David Hamkins The City University of New York
Title: Algebraicity and implicit definability in set theory
An element a is definable in a model M if it is the unique object in M satisfying some first-order property.  It is algebraic, in contrast, if it is amongst at most finitely many objects satisfying some first-order property φ, that is, if { b  |  M satisfies φ[b] } is a finite set containing a. In this talk, I aim to consider the situation that arises when one replaces the use of definability in several parts of set theory with the weaker concept of algebraicity. For example, in place of the class HOD of all hereditarily ordinal-definable sets, I should like to consider the class HOA of all hereditarily ordinal algebraic sets. How do these two classes relate? In place of the study of pointwise definable models of set theory, I should like to consider the pointwise algebraic models of set theory. Are these the same? In place of the constructible universe L, I should like to consider the inner model arising from iterating the algebraic (or implicit) power set operation rather than the definable power set operation.  The result is a highly interest new inner model of ZFC, denoted Imp, whose properties are only now coming to light.  Is Imp the same as L?  Is it absolute? I shall answer all these questions at the talk, but many others remain open.

This is joint work with Cole Leahy (MIT).

 


Model theory seminar
Friday, May 10, 2013 12:30 pm GC 6417 
Speaker: Athar Abdul-Quader CUNY Grad Center
Title: Transplendent models of rich theories
Following up on a talk by Roman Kossak earlier this semester, I will discuss work by Engstrom and Kaye which address the question of existence of transplendent models (models with expansions omitting a type). If there is time, I will talk about transplendent models of PA.


CUNY Logic Workshop
Friday, May 10, 2013 2:00 pm GC 6417 
Speaker: Thomas Johnstone The New York City College of Technology (CityTech), CUNY
Title: What is the theory ZFC without power set?
The theory ZFC-, consisting of the usual axioms of ZFC but with the power set axiom removed — specifically axiomatized by extensionality, foundation, pairing, union, infinity, separation, replacement and the assertion that every set can be well-ordered — is weaker than commonly supposed and is inadequate to establish several basic facts often desired in its context.

For example, there are models of ZFC- in which a countable union of countable sets is not countable. There are models of ZFC- for which the Los ultrapower theorem fails, even for wellfounded ultrapowers on a measurable cardinal. Moreover, the theory ZFC- is not sufficient to establish that the union of Σn and Πn sets is closed under bounded quantification. Lastly, there are models of ZFC- for which the Gaifman theorem fails, in that there exists cofinal embeddings j:M–>N between ZFC- models that are Σ1-elementary, but not fully elementary.

Nevertheless, these deficits of ZFC- are completely repaired by strengthening it to the theory obtained by using collection rather than replacement in the axiomatization above. This is joint work with Joel David Hamkins and Victoria Gitman, and it extends prior work of Andrzej Zarach.

arxiv preprint | post at jdh.hamkins.org | post on Victoria Gitman’s blog

NY Philosophical Logic Group
Time: 4-6pm, Monday, May 13th. (last meeting of the semester) 

Place: 2nd floor seminar room, Philosophy Department, NYU (5 Washington Place).
Speaker: Tamar Lando, Columbia University

Topic: The topology of gunk

Abstract: Space as we typically conceive of it in mathematics and physics is co posed of dimensionless points. Over the years, however, some have denied that points, or point-sized parts are genuine parts of space. Space, on an alternative view, is ‘gunky’: every part of space has a strictly smaller subpart. If this thesis is true, how should we model space mathematically? The traditional answer to this question is most famously associated with A.N. Whitehead, who developed a mathematics of pointless geometry that Tarski later modeled in regular open algebras. More recently, however, Whiteheadian space has come under attack, because it does not allow us to talk about the size or measure of regions in a nice way. A newer approach to the mathematics of gunk, advanced by F. Arntzenius, J. Hawthorne, and J.S. Russell, models space via the Lebesgue measure algebra, or algebra of (Lebesgue) measurable subsets of Euclidean space modulo sets of measure zero. But problems arise on this approach when it comes to doing topology. According to Arntzenius, the standard topological distinction between ‘open’ and ‘closed’ regions “is exactly the kind of distinction that we do not believe exists if reality is pointless.” I argue that the turn to non-standard topology in the measure-theoretic setting rests on a mistake. Once this is pointed out, the newer approach to gunk can claim two important advantages: it allows the gunk lover to talk about size and topology—both in perfectly standard ways. 
 

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Postdoc position in Set Theory in Torino (July 2013 to June 2015)

Posted on May 6, 2013 by | Leave a comment

There is an opening for a two year post-doc position in set theory in the department of mathematics of Torino university starting july 1st 2013 and finishing june the 30th 2015.

Applicants are required to be less than 35 and must have earned their Ph.D. title. It is also required to the applicants to have at least one publication in a peer reviewed journal in the last five years. The net salary is slightly more than 1400 euros per month. The post doc will join the logic group of the department which consists of Matteo Viale, Alessandro Andretta, Raphael Carroy (set theory), Domenico Zambella (model theory).

The selection of applicants will be based on an evaluation of the CV, of the publication records, and of their interests of research which must be in set theory. It is possible to file online the applications creating an account on the italian ministry of education website. If you intend to apply write to matteo.viale@unito.it in order to get detailed information on the filing procedure.

Applicants can deposit their online registration forms since the 7th of may 2013 up to the 28 of may 2013. Those passing a first selection will be admitted to a (skype) interview which will take place between the 5th and the 7th of june 2013.

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Monroe Eskew: Foreman’s Duality Theorem and Applications I

Posted on May 2, 2013 by | Leave a comment

Speaker: Monroe Eskew
Institution: UCI
Time: Mon, 05/06/2013 – 4:00pm – 5:30pm
Host: Martin Zeman
Location: RH 440R

We present a theorem of Foreman that allows an exact characterization of what happens to the structure of precipitous ideals after suitable forcing. This theorem unifies several well-known results, giving as them quick corollaries. We will use it to show: forcing precipitous ideals from large cardinals, preservation theorems of Kakuda and Baumgartner-Taylor, and Solovay’s consistency result on real-valued measurable cardinals. We will also show some new applications due to the speaker.

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