AbstractAlmost all set theorists pay at least lip service to Cantor’s definition of a set as a collection of many things into one whole; but empty and singleton sets do not fit with it. Adapting Dana Scott’s axiomatization of the cumulative theory of types, we present a ‘Cantorian’ system which excludes these anomalous sets. We investigate the consequences of their omission, examining their claim to a place on grounds of convenience, and asking whether their absence is an obstacle to the theory’s ability to represent ordered pairs or to support the arithmetization of analysis or the development of the theory of cardinals and ordinals.Non
The Kinds of Mathematical Objects is an exploration of the taxonomy of the mathematical realm and th...
zAbstract Cantor's theory of cardinality violates common sense. It says. for example. that all ...
Set theory is the field of study surrounding sets, and in this particular development, the study of ...
On the first page of “What is Cantor’s Continuum Problem?”, Gödel argues that Cantor’s theory of car...
Cantor thought of the principles of set theory or intuitive principles as universal forms that can a...
at one is isomorphic to an initial segment of the other, and that the wellorderings can be canonical...
The Cantor set Ω is a rather remarkable subset of [0, 1]. It provides us with a wealth of interestin...
Cantor's abstractionist account of cardinal numbers has been criticized by Frege as a psychological ...
In this elementary paper we establish a few novel results in set theory; their interest is wholly fo...
It is a commonplace of set theory to say that there is no set of all well-orderings nor a set of all...
This thesis covers the Cantor Ternary Set and generalizations of the Cantor Set, and gives a complet...
Set-theoretic and category-theoretic foundations represent different perspectives on mathematical su...
This paper traces the main philososophic issues and the foundations of Cantorian set theory and the ...
An analysis of the well known paradoxes found in intuitive set theory has led to the reconstruction ...
Abstract: This work proposes set-theory in which the concept of a set depends on it's cons...
The Kinds of Mathematical Objects is an exploration of the taxonomy of the mathematical realm and th...
zAbstract Cantor's theory of cardinality violates common sense. It says. for example. that all ...
Set theory is the field of study surrounding sets, and in this particular development, the study of ...
On the first page of “What is Cantor’s Continuum Problem?”, Gödel argues that Cantor’s theory of car...
Cantor thought of the principles of set theory or intuitive principles as universal forms that can a...
at one is isomorphic to an initial segment of the other, and that the wellorderings can be canonical...
The Cantor set Ω is a rather remarkable subset of [0, 1]. It provides us with a wealth of interestin...
Cantor's abstractionist account of cardinal numbers has been criticized by Frege as a psychological ...
In this elementary paper we establish a few novel results in set theory; their interest is wholly fo...
It is a commonplace of set theory to say that there is no set of all well-orderings nor a set of all...
This thesis covers the Cantor Ternary Set and generalizations of the Cantor Set, and gives a complet...
Set-theoretic and category-theoretic foundations represent different perspectives on mathematical su...
This paper traces the main philososophic issues and the foundations of Cantorian set theory and the ...
An analysis of the well known paradoxes found in intuitive set theory has led to the reconstruction ...
Abstract: This work proposes set-theory in which the concept of a set depends on it's cons...
The Kinds of Mathematical Objects is an exploration of the taxonomy of the mathematical realm and th...
zAbstract Cantor's theory of cardinality violates common sense. It says. for example. that all ...
Set theory is the field of study surrounding sets, and in this particular development, the study of ...