Can a small forcing create Kurepa trees

Certain very large cardinals are not created in small forcing extensions

Laver, Richard

November 2007

AbstractThe large cardinal axioms of the title assert, respectively, the existence of a nontrivial e...

Tree property at more cardinals

Stejskalová, Šárka

January 2014

In this thesis we study the Aronszajn and special Aronszajn trees, their existence and nonexistence....

Essential Kurepa trees versus essential Jech–Kunen trees

Jin, Renling
Shelah, Saharon

September 1994

AbstractBy an ω1-tree we mean a tree of cardinality ω1 and height ω1. An ω1-tree is called a Kurepa ...

Can a small forcing create Kurepa trees

Jin, Renling
Shelah, Saharon

April 1997

AbstractIn this paper we probe the possibilities of creating a Kurepa tree in a generic extension of...

Indestructibility of some compactness principles over models of PFA

Honzik, Radek
Lambie-Hanson, Chris
Stejskalová, Šárka

August 2022

We show that $\mathsf{PFA}$ (Proper Forcing Axiom) implies that adding any number of Cohen subsets o...

Kurepa-trees and Namba-forcing

Koenig, Bernhard
Yoshinobu, Yasuo

May 2006

We show that compact cardinals and {\rm MM} are sensitive to $\lambda$-closed forcings for arbitrari...

Planting Kurepa trees and killing Jech-Кunen trees in a model by using one inaccessible cardinal

Shelah, Saharon
Jin, R.

January 1992

By an $ω_1$- tree we mean a tree of power $ω_1$ and height $ω_1$. Under CH and $2^{ω_{1}} > ω_2$ we ...

Aronszajn trees on ℵ2 and ℵ3

Abraham, Uri

September 1983

AbstractAssuming the existence of a supercompact cardinal and a weakly compact cardinal above it, we...

Alternative Cichoń Diagrams and Forcing Axioms Compatible with CH

Switzer, Corey B

September 2020

This dissertation surveys several topics in the general areas of iterated forcing, infinite combinat...

Alternative Cichoń Diagrams and Forcing Axioms Compatible with CH

Switzer, Corey B

September 2020

This dissertation surveys several topics in the general areas of iterated forcing, infinite combinat...

Forcing with adequate sets of models as side conditions

John Krueger

August 2015

Abstract. We present a general framework for forcing on ω2 with finite con-ditions using countable m...

Extender based forcings, fresh sets and Aronszajn trees

Moti Gitik

January 2011

Extender based forcings are studied with respect of adding branches to Aronszajn trees. We construct...

The Tree Property

Cummings, James
Foreman, Matthew

January 1998

AbstractWe construct a model in which there are no ℵn-Aronszajn trees for any finiten⩾2, starting fr...

Tree property at more cardinals

Stejskalová, Šárka

January 2014

In this thesis we study the Aronszajn and special Aronszajn trees, their existence and nonexistence....

Essential Kurepa trees versus essential Jech–Kunen trees

Jin, Renling
Shelah, Saharon

September 1994

AbstractBy an ω1-tree we mean a tree of cardinality ω1 and height ω1. An ω1-tree is called a Kurepa ...

Certain very large cardinals are not created in small forcing extensions

Laver, Richard

November 2007

AbstractThe large cardinal axioms of the title assert, respectively, the existence of a nontrivial e...

Tree property at more cardinals

Stejskalová, Šárka

January 2014

In this thesis we study the Aronszajn and special Aronszajn trees, their existence and nonexistence....

Essential Kurepa trees versus essential Jech–Kunen trees

Jin, Renling
Shelah, Saharon

September 1994

AbstractBy an ω1-tree we mean a tree of cardinality ω1 and height ω1. An ω1-tree is called a Kurepa ...

Can a small forcing create Kurepa trees

Jin, Renling
Shelah, Saharon

April 1997

AbstractIn this paper we probe the possibilities of creating a Kurepa tree in a generic extension of...

Indestructibility of some compactness principles over models of PFA

Honzik, Radek
Lambie-Hanson, Chris
Stejskalová, Šárka

August 2022

We show that $\mathsf{PFA}$ (Proper Forcing Axiom) implies that adding any number of Cohen subsets o...

Kurepa-trees and Namba-forcing

Koenig, Bernhard
Yoshinobu, Yasuo

May 2006

We show that compact cardinals and {\rm MM} are sensitive to $\lambda$-closed forcings for arbitrari...

Planting Kurepa trees and killing Jech-Кunen trees in a model by using one inaccessible cardinal

Shelah, Saharon
Jin, R.

January 1992

By an $ω_1$- tree we mean a tree of power $ω_1$ and height $ω_1$. Under CH and $2^{ω_{1}} > ω_2$ we ...

Aronszajn trees on ℵ2 and ℵ3

Abraham, Uri

September 1983

AbstractAssuming the existence of a supercompact cardinal and a weakly compact cardinal above it, we...

Alternative Cichoń Diagrams and Forcing Axioms Compatible with CH

Switzer, Corey B

September 2020

This dissertation surveys several topics in the general areas of iterated forcing, infinite combinat...

Alternative Cichoń Diagrams and Forcing Axioms Compatible with CH

Switzer, Corey B

September 2020

This dissertation surveys several topics in the general areas of iterated forcing, infinite combinat...

Forcing with adequate sets of models as side conditions

John Krueger

August 2015

Abstract. We present a general framework for forcing on ω2 with finite con-ditions using countable m...

Extender based forcings, fresh sets and Aronszajn trees

Moti Gitik

January 2011

Extender based forcings are studied with respect of adding branches to Aronszajn trees. We construct...

The Tree Property

Cummings, James
Foreman, Matthew

January 1998

AbstractWe construct a model in which there are no ℵn-Aronszajn trees for any finiten⩾2, starting fr...

Tree property at more cardinals

Stejskalová, Šárka

January 2014

In this thesis we study the Aronszajn and special Aronszajn trees, their existence and nonexistence....

Essential Kurepa trees versus essential Jech–Kunen trees

Jin, Renling
Shelah, Saharon

September 1994

AbstractBy an ω1-tree we mean a tree of cardinality ω1 and height ω1. An ω1-tree is called a Kurepa ...

Certain very large cardinals are not created in small forcing extensions

Laver, Richard

November 2007

AbstractThe large cardinal axioms of the title assert, respectively, the existence of a nontrivial e...

Tree property at more cardinals

Stejskalová, Šárka

January 2014

In this thesis we study the Aronszajn and special Aronszajn trees, their existence and nonexistence....

Essential Kurepa trees versus essential Jech–Kunen trees

Jin, Renling
Shelah, Saharon

September 1994

AbstractBy an ω1-tree we mean a tree of cardinality ω1 and height ω1. An ω1-tree is called a Kurepa ...

Can a small forcing create Kurepa trees

Abstract

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Can a small forcing create Kurepa trees

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