Difference between revisions of "Greiffenhagen2014"
SaulAlbert (talk | contribs) (BibTeX auto import 2015-06-08 09:13:14) |
SaulAlbert (talk | contribs) m (SaulAlbert moved page Greiffenhagen2014a to Greiffenhagen2014) |
(No difference)
|
Revision as of 00:18, 8 June 2015
Greiffenhagen2014 | |
---|---|
BibType | ARTICLE |
Key | Greiffenhagen2014a |
Author(s) | Christian Greiffenhagen |
Title | The materiality of mathematics: Presenting mathematics at the blackboard |
Editor(s) | |
Tag(s) | Materiality, mathematics, inscriptions, workplace studies, EMCA |
Publisher | |
Year | 2014 |
Language | |
City | |
Month | |
Journal | The British Journal of Sociology |
Volume | 65 |
Number | 3 |
Pages | 502–528 |
URL | Link |
DOI | 10.1111/1468-4446.12037 |
ISBN | |
Organization | |
Institution | |
School | |
Type | |
Edition | |
Series | |
Howpublished | |
Book title | |
Chapter |
Abstract
Sociology has been accused of neglecting the importance of material things in human life and the material aspects of social practices. Efforts to correct this have recently been made, with a growing concern to demonstrate the materiality of social organization, not least through attention to objects and the body. As a result, there have been a plethora of studies reporting the social construction and effects of a variety of material objects as well as studies that have explored the material dimensions of a diversity of practices. In different ways these studies have questioned the Cartesian dualism of a strict separation of 'mind' and 'body'. However, it could be argued that the idea of the mind as immaterial has not been entirely banished and lingers when it comes to discussing abstract thinking and reasoning. The aim of this article is to extend the material turn to abstract thought, using mathematics as a paradigmatic example.This paper explores how writing mathematics (on paper, blackboards, or even in the air) is indispensable for doing and thinking mathematics. The paper is based on video recordings of lectures in formal logic and investigates how mathematics is presented at the blackboard. The paper discusses the iconic character of blackboards in mathematics and describes in detail a number of inscription practices of presenting mathematics at the blackboard (such as the use of lines and boxes, the designation of particular regions for specific mathematical purposes, as well as creating an 'architecture' visualizing the overall structure of the proof). The paper argues that doing mathematics really is 'thinking with eyes and hands' (Latour 1986). Thinking in mathematics is inextricably interwoven with writing mathematics.
Notes