Home
About
Advanced Search
Browse by Discipline
Scientific Societies
E-print Alerts
Add E-prints
FAQ
•
HELP
•
SITE MAP
•
CONTACT US
Search
Advanced Search
Gitik, Moti - School of Mathematical Sciences, Tel Aviv University
BLOWING UP POWER OF A SINGULAR CARDINAL WIDER GAPS School of Mathematical Sciences
PROCEEDINGS OF THE AMERICAN MATHEMATICAL SOCIETY
On almost precipitous ideals. Asaf Ferber and Moti Gitik
Pcf theory and Woodin cardinals Moti Gitik,a
Dropping cofinalities-gap 3-single drop February 3, 2009
Gap 3: Lectures March -May 2008 June 1, 2008
Short Extenders Forcings I January 26, 2011
A variant of Namba Forcing Moti Gitik
Intermediate models of Prikry generic extensions Moti Gitik
A remark on subforcings of the Prikry forcing We will show that every subforcing of the basic Prikry forcing is either trivial or
On a question of Pereira Moti Gitik
On partially wellfounded generic ultrapowers Moti Gitik and Menachem Magidor
Some pathological examples of precipitous ideals Moti Gitik
Simpler Short Extenders Forcing-Preserving Strong School of Mathematical Sciences
Simpler Short Extenders Forcing -arbitrary gap (January version).
POWER FUNCTION ON STATIONARY CLASSES MOTI GITIK AND CARMI MERIMOVICH
No Bound for the First Fixed Point School of Mathematical Sciences
On Gaps under GCH Type Assumptions School of Mathematical Sciences
On Some Configurations Related to the Shelah Weak Moti Gitik1
Dropping cofinalities and gaps School of Mathematical Sciences
The Power Set Function Moti Gitik
Arbitrary gap: Lectures June-August September 18, 2008
A Simpler Short Extenders Forcing-gap 3 School of Mathematical Sciences
APPROACHABILITY AT THE SECOND SUCCESSOR OF A SINGULAR CARDINAL
A model with a precipitous ideal but without normal Moti Gitik
Two Stationary Sets with Different Gaps of the Power Function
THE FAILURE OF DIAMOND ON A REFLECTING STATIONARY SET
ON NORMAL PRECIPITOUS IDEALS SCHOOL OF MATHEMATICAL SCIENCES
Violating the Singular Cardinals Hypothesis Without Large Cardinals
On the strength of no normal precipitous filter and Liad Tal
Simpler Short Extenders Forcing -arbitrary gap. School of Mathematical Sciences
On changing cofinality of partially ordered sets Moti Gitik
I Prikry-type Forcings 3 by Moti Gitik
A model with a measurable without normal measure Eilon Bilinsky and Moti Gitik
ADDING MANY -SEQUENCES TO A SINGULAR CARDINAL MOTI GITIK AND SPENCER UNGER
Extender based forcings, fresh sets and Aronszajn trees August 31, 2011
Indestructible Strong Compactness but not Supercompactness
Remarks on non-closure of the preparation forcing of [2] and an off-piste version of it.