Forthcoming events in this series


Tue, 01 May 2018

16:00 - 17:00
L3

“The World Is Round. Or, Is It, Really?” A Global History of Mathematics in the 17th Century

Tomoko L. Kitagawa
(UC Berkeley & Oxford Centre for Global History)
Abstract

Part of the series 'What do historians of mathematics do?'

In this talk, we will survey the movement of mathematical ideas in the 17th century. We will explore, in particular, the mathematical cultures of Paris, Amsterdam, Rome, Cape Town, Goa, Kyoto, Beijing, and London, as well as the journey of mathematical knowledge on a global scale. As it will be an ambitious task to complete a round-the-world history tour in an hour, the focus will be on East Asia. By employing the digital humanities technique, this presentation will use digital media to effectively show historical sources and help the audience imagine the world as a “round” entity when we discuss a global history of mathematics.

Thu, 25 Jan 2018

17:00 - 18:00
L5

Was James Clerk Maxwell’s mathematics as good as his poetry?

Mark McCartney
(University of Ulster)
Abstract

James Clerk Maxwell (1831–1879) was, by any measure, a natural philosopher of the first rank who made wide-ranging contributions to science. He also, however, wrote poetry.

In this talk examples of Maxwell’s poetry will be discussed in the context of a biographical sketch. It will be  argued that not only was Maxwell a good poet, but that his poetry enriches our view of his life and its intellectual context.

Tue, 14 Nov 2017

16:00 - 17:00
L3

Spinning, stalling, and falling apart

Tony Royle
(The Open University)
Abstract

The birth of fixed-wing, powered flight in the first decade of the twentieth century brought with it significant potential for pilots to return to Earth by unintended, often fatal, means. I will discuss the nature of the contemporary mathematical and engineering debates associated with these facets of flight, and the practical steps taken to facilitate safer aircraft and more robust operating procedures.

Fri, 16 Jun 2017

14:00 - 15:00
C2

Cooperating around a theory: the example of lattice theory in the 1930s

Simon Decaens
(Université Paris Diderot)
Abstract

In 1933, lattice theory was a new subject, put forth by Garrett Birkhoff. In contrast, in 1940, it was already a mature subject, worth publishing a book on. Indeed, the first monograph, written by the same G. Birkhoff, was the result of these 7 years of working on a lattice theory. In my talk, I would like to focus on this fast development. I will present the notion of a theory not only as an actors' category but as an historical category. Relying on that definition, I would like to focus on some collaborations around the notion of lattices. In particular, we will study lattice theory as a meeting point between the works of G. Birkhoff and two other mathematicians: John von Neumann and Marshall Stone.

Mon, 22 May 2017
17:00
L3

The Struggle for Algebra: English mathematics around 1660

Philip Beeley
(History Faculty)
Abstract

Part of the series "What do historians of mathematics do?"

The talk will set out the key debate in England at the Restoration, the need for a new orientation in mathematics towards algebra and the new "analysis". It will focus on efforts by three central players in England's mathematical community, John Pell, John Collins, and the Oxford mathematician John Wallis to produce an English language algebra text which would play a pioneering role in promoting this change. What was the background to the work we now call Pell's Algebra and why was it so significant?

Mon, 15 May 2017
17:00
L3

Ars sine Scientia Nihil Est: Architecture and Mathematics through history

Snezana Lawrence
(Anglia Ruskin University)
Abstract

Part of the series "What do historians of mathematics do?"  
In the last year of 14th century, a French mathematician/geometer Jean Mignot, was called from Paris to help with the construction of the Cathedral of Milan. Thus was created one of the most famous stories about how mathematics literally supports great works of art, helping them stand the test of time. This talk will look at some patterns that begin to become apparent in the investigations of the relationship between architecture and mathematics and the creativity that is common to the pursuit of both. I will present the case on how this may matter to someone who is interested in the history of mathematics. To make this more intelligible, I will partly talk also of my personal journey in investigating this relationship and the issues I have researched and written about, and how these in turn changed my view of the nature of mathematics education. 

Mon, 08 May 2017
17:00
L3

What is algebra?

Christopher Hollings
(Mathematical Institute)
Abstract

Part of the series "What do historians of mathematics do?"  

I will address this question by turning to another: "What is algebra?"  In answering this second question, and surveying the way that the answer changes as we move through the centuries, I will highlight some of the problems that face historians of mathematics when it comes to interpreting historical mathematics, and give a flavour of what it means to study the history of mathematics.

Mon, 14 Nov 2016
17:00
C1

“Knowledge gained by experience”: Olaus Henrici – engineer, geometer, and maker of mathematical models

June Barrow-Green
(The Open University)
Abstract

The (Danish-born) German mathematician Olaus Henrici (1840–1918) studied in Karlsruhe, Heidelberg and Berlin before making his career in London, first at University College and then, from 1884, at the newly formed Central Technical College where he established a Laboratory of Mechanics.  Although Henrici’s original training was as an engineer, he became known as a promoter of projective geometry and as an advocate for the use of mathematical models.  In my talk, I shall discuss the different aspects of Henrici's work and explore connections between them.