The properties and relations that perform a role in mathematical reasoning arise from the basic relations that obtain among mathematical objects. It is in terms of these basic relations that mathematicians identify the objects they intend to study. The way in which mathematicians identify these objects has led some philosophers to draw metaphysical conclusions about their nature. These philosophers have been led to claim that mathematical objects are positions in structures or akin to positions in patterns. This article retraces their route from (relatively uncontroversial) facts about the identification of mathematical objects to high metaphysical conclusions. Beginning with the natural numbers, how are they identified? The mathematically ...
The aim of this paper is to analyze structuralism as an alternative view to platonism in the philoso...
Du Châtelet holds that mathematical representations play an explanatory role in natural science. Mor...
In this paper, I describe and motivate a new species of mathematical structuralism, which I call Ins...
The properties and relations that perform a role in mathematical reasoning arise from the basic rela...
The primary justification for mathematical structuralism is its ca-pacity to explain two observation...
The primary justification for mathematical structuralism is its capacity to explain two observations...
(1991), and elsewhere offers the most plausible philosophy of mathematics: Mathematics is about stru...
The paper proposes to amend structuralism in mathematics by saying what places in a structure and th...
The aim of this paper is to reveal the tacit assumptions of the logicist and structuralist theories ...
Realists often suggest that scientific knowledge is grounded in the mathematical representation of n...
Informally, structural properties of mathematical objects are usually characterized in one of two wa...
In this paper I argue for the view that structuralism offers the best perspective for an acceptable ...
A prominent version of mathematical structuralism holds that mathematical objects are at bottom noth...
Informally, structural properties of mathematical objects are usually characterized in one of two wa...
What exactly is a number? The ontological status of mathematical entities is a question that has con...
The aim of this paper is to analyze structuralism as an alternative view to platonism in the philoso...
Du Châtelet holds that mathematical representations play an explanatory role in natural science. Mor...
In this paper, I describe and motivate a new species of mathematical structuralism, which I call Ins...
The properties and relations that perform a role in mathematical reasoning arise from the basic rela...
The primary justification for mathematical structuralism is its ca-pacity to explain two observation...
The primary justification for mathematical structuralism is its capacity to explain two observations...
(1991), and elsewhere offers the most plausible philosophy of mathematics: Mathematics is about stru...
The paper proposes to amend structuralism in mathematics by saying what places in a structure and th...
The aim of this paper is to reveal the tacit assumptions of the logicist and structuralist theories ...
Realists often suggest that scientific knowledge is grounded in the mathematical representation of n...
Informally, structural properties of mathematical objects are usually characterized in one of two wa...
In this paper I argue for the view that structuralism offers the best perspective for an acceptable ...
A prominent version of mathematical structuralism holds that mathematical objects are at bottom noth...
Informally, structural properties of mathematical objects are usually characterized in one of two wa...
What exactly is a number? The ontological status of mathematical entities is a question that has con...
The aim of this paper is to analyze structuralism as an alternative view to platonism in the philoso...
Du Châtelet holds that mathematical representations play an explanatory role in natural science. Mor...
In this paper, I describe and motivate a new species of mathematical structuralism, which I call Ins...