After a short preface, the first of the three sections of this paper is devoted to historical and philosophic aspects of categoricity. The second section is a self-contained exposition, including detailed definitions, of a proof that every mathematical system whose domain is the closure of its set of distinguished individuals under its distinguished functions is categorically characterized by its induction principle together with its true atoms (atomic sentences and negations of atomic sentences). The third section deals with applications especially those involving the distinction between characterizing a system and axiomatizing the truths of a syste
We discuss ways in which category theory might be useful in philosophy of science, in particular for...
Educação Superior::Ciências Exatas e da Terra::MatemáticaAristotelian logic, or the traditional stud...
Syllogism reasoning is a common and important form of reasoning in human thinking from Aristotle onw...
After a short preface, the first of the three sections of this paper is devoted to historical and ph...
This article surveys recent literature by Parsons, McGee, Shapiro and others on the significance of ...
This article surveys recent literature by Parsons, McGee, Shapiro and others on the significance of ...
This article surveys recent literature by Parsons, McGee, Shapiro and others on the significance of ...
The purpose of this paper is to investigate categoricity arguments conducted in second order logic a...
Higher-dimensional algebra, also known as higher-dimensional category theory, is a large-scale conte...
Informally speaking, the categoricity of an axiom system means that its non-logical symbols have onl...
Logical inferentialism maintains that the formal rules of inference fix the meanings of the logical ...
The paper is a review article comparing a number of approaches to natural language syntax and semant...
One of the philosophical uses of Dedekind’s categoricity theorem for Peano Arithmetic is to provide ...
The fundamental aim of the paper is to correct an harmful way to interpret a Goedel's erroneous rema...
We discuss ways in which category theory might be useful in philosophy of science, in particular for...
Educação Superior::Ciências Exatas e da Terra::MatemáticaAristotelian logic, or the traditional stud...
Syllogism reasoning is a common and important form of reasoning in human thinking from Aristotle onw...
After a short preface, the first of the three sections of this paper is devoted to historical and ph...
This article surveys recent literature by Parsons, McGee, Shapiro and others on the significance of ...
This article surveys recent literature by Parsons, McGee, Shapiro and others on the significance of ...
This article surveys recent literature by Parsons, McGee, Shapiro and others on the significance of ...
The purpose of this paper is to investigate categoricity arguments conducted in second order logic a...
Higher-dimensional algebra, also known as higher-dimensional category theory, is a large-scale conte...
Informally speaking, the categoricity of an axiom system means that its non-logical symbols have onl...
Logical inferentialism maintains that the formal rules of inference fix the meanings of the logical ...
The paper is a review article comparing a number of approaches to natural language syntax and semant...
One of the philosophical uses of Dedekind’s categoricity theorem for Peano Arithmetic is to provide ...
The fundamental aim of the paper is to correct an harmful way to interpret a Goedel's erroneous rema...
We discuss ways in which category theory might be useful in philosophy of science, in particular for...
Educação Superior::Ciências Exatas e da Terra::MatemáticaAristotelian logic, or the traditional stud...
Syllogism reasoning is a common and important form of reasoning in human thinking from Aristotle onw...