Add to ORKGIn this paper we will define a cardinal invariant corresponding to the independence number for partitions of $\omega $. By using Cohen forcing we will prove that this cardinal invariant is consistently smaller than the continuum.
summary:We prove several results on some cardinal invariants of the continuum which are closely rela...
The independence of the continuum hypothesis is a result of broad impact: it settles a basic questio...
AbstractI use generic embeddings induced by generic normal measures on Pκ(λ) that can be forced to e...
In this paper we will define a cardinal invariant corresponding to the independence number for parti...
summary:We study cardinal coefficients related to combinatorial properties of partitions of $\omega$...
The tale and the goals The topos of this research can be traced back to 1878 when the mathematician ...
We prove some consistency results about b() and d(), which are natural generalisations of the cardi...
grantor: University of TorontoWe study the influence of the fundamental forcing notions, C...
Abstract. Assuming the P-ideal dichotomy, we attempt to isolate those car-dinal characteristics of t...
This thesis examines the interactions between the continuum function and large cardinals. It is know...
This bachelor thesis studies properties of Cohen Forcing and its relation to the unprovability of Co...
Abstract. I present a forcing indestructibility theorem for the large cardinal ax-iom Vopenka‘s Prin...
One of the basic results in set theory is that the cardinality of the power set of the natural numbe...
In this survey paper, we will summarise some of the more and less known results on the generalisatio...
This paper investigates the relations K+--t (a): and its variants for uncountable cardinals K. First...
summary:We prove several results on some cardinal invariants of the continuum which are closely rela...
The independence of the continuum hypothesis is a result of broad impact: it settles a basic questio...
AbstractI use generic embeddings induced by generic normal measures on Pκ(λ) that can be forced to e...
In this paper we will define a cardinal invariant corresponding to the independence number for parti...
summary:We study cardinal coefficients related to combinatorial properties of partitions of $\omega$...
The tale and the goals The topos of this research can be traced back to 1878 when the mathematician ...
We prove some consistency results about b() and d(), which are natural generalisations of the cardi...
grantor: University of TorontoWe study the influence of the fundamental forcing notions, C...
Abstract. Assuming the P-ideal dichotomy, we attempt to isolate those car-dinal characteristics of t...
This thesis examines the interactions between the continuum function and large cardinals. It is know...
This bachelor thesis studies properties of Cohen Forcing and its relation to the unprovability of Co...
Abstract. I present a forcing indestructibility theorem for the large cardinal ax-iom Vopenka‘s Prin...
One of the basic results in set theory is that the cardinality of the power set of the natural numbe...
In this survey paper, we will summarise some of the more and less known results on the generalisatio...
This paper investigates the relations K+--t (a): and its variants for uncountable cardinals K. First...
summary:We prove several results on some cardinal invariants of the continuum which are closely rela...
The independence of the continuum hypothesis is a result of broad impact: it settles a basic questio...
AbstractI use generic embeddings induced by generic normal measures on Pκ(λ) that can be forced to e...