Add to ORKGAbstract: Transfinite ordinal numbers enter mathematical practice mainly via the method of definition by transfinite recursion. Outside of axiomatic set theory, there is a significant mathematical tradition in works recasting proofs by transfinite recursion in other terms, mostly with the intention of eliminating the ordinals from the proofs. Leaving aside the different motivations which lead each specific case, we investigate the mathematics of this action of proof transforming and we address the problem of formalising the philosophical notion of elimination which characterises this move
Transfinite recursion is an essential component of set theory. In this paper, we seek intrinsically ...
Abstract. We describe a model-theoretic approach to ordinal analysis via the finite com-binatorial n...
This thesis presents a syntactic development of the arithmetic of ordinal numbers less than This is ...
Transfinite ordinal numbers enter mathematical practice mainly via the method of definition by trans...
Transfinite ordinal numbers enter mathematical practice mainly via the method of definition by trans...
Transfinite ordinal numbers enter mathematical practice mainly via the method of definition by trans...
Transfinite ordinal numbers enter mathematical practice mainly via the method of definition by trans...
Transfinite ordinal numbers enter mathematical practice mainly via the method of definition by trans...
Following the literature from the origin of Set Theory in the late 19th century to more current time...
An approach to ordinal analysis is presented which is finitary, but highlights the semantic content ...
Summary. In the beginning of the article we show some consequences of the regularity axiom. In the s...
Summary. In the beginning of the article we show some consequences of the regularity axiom. In the s...
We have still to consider the extension of the methods of number theory to infinite ordinals—or to t...
Contemporary ordinal-theoretic proof theory (i.e., the part of proof theory concerned with ordinal a...
This thesis presents a syntactic development of the arithmetic of ordinal numbers less than This is ...
Transfinite recursion is an essential component of set theory. In this paper, we seek intrinsically ...
Abstract. We describe a model-theoretic approach to ordinal analysis via the finite com-binatorial n...
This thesis presents a syntactic development of the arithmetic of ordinal numbers less than This is ...
Transfinite ordinal numbers enter mathematical practice mainly via the method of definition by trans...
Transfinite ordinal numbers enter mathematical practice mainly via the method of definition by trans...
Transfinite ordinal numbers enter mathematical practice mainly via the method of definition by trans...
Transfinite ordinal numbers enter mathematical practice mainly via the method of definition by trans...
Transfinite ordinal numbers enter mathematical practice mainly via the method of definition by trans...
Following the literature from the origin of Set Theory in the late 19th century to more current time...
An approach to ordinal analysis is presented which is finitary, but highlights the semantic content ...
Summary. In the beginning of the article we show some consequences of the regularity axiom. In the s...
Summary. In the beginning of the article we show some consequences of the regularity axiom. In the s...
We have still to consider the extension of the methods of number theory to infinite ordinals—or to t...
Contemporary ordinal-theoretic proof theory (i.e., the part of proof theory concerned with ordinal a...
This thesis presents a syntactic development of the arithmetic of ordinal numbers less than This is ...
Transfinite recursion is an essential component of set theory. In this paper, we seek intrinsically ...
Abstract. We describe a model-theoretic approach to ordinal analysis via the finite com-binatorial n...
This thesis presents a syntactic development of the arithmetic of ordinal numbers less than This is ...