Past Events — Lent 2017
Unless otherwise stated, the talks are held at 7pm in MR2 at the Centre for Mathematical Sciences (the CMS), Wilberforce Road.
16th January 2017 — Dr Piers Bursill-Hall
How Cambridge produced the most unpleasant mathmo of all time.
Most Cambridge mathematicians are fairly pleasant people, if a little socially ... ah ... awkward. But by and large Mathmos, as a tribe, are fairly reasonable people with sort of middling tastes in most normal things, and reasonably easy to get on with, mod. minor quirks. But there are some outliers, and this lecture will be about a strong candidate for the the most appalling and unpleasant mathematician of all time. It was a 'he', of course, and a Trinmo ... of course. And you know him all too well.
26th January 2017 — Dr Julian Holstein
Bezout’s theorem as a pathway to algebraic geometry
In how many points do two curves in the plane intersect? This question has a very nice answer that is unfortunately not entirely true. But sometimes in mathematics the answer to a question is so good that it is worth keeping, even if it is not correct. The new challenge is then to ask the question in a better way.
To find the right question in this case we will take a brief tour of algebraic geometry, meting both classical and modern ideas. If time permits we will even catch a brief glimpse of the cutting edge of theory in algebraic geometry.
31st January 2017 — Prof. Ciprian Manolescu (UCLA)
Manifolds (spaces that look locally like R^n) are the basic objects of study in topology. In this talk I will describe what is known about their classification. I will mention the different versions of the Poincare conjecture, and also strange phenomena that appear in high dimensions: exotic smooth structures on the same manifold, and manifolds that cannot be triangulated.
7th February 2017 — Film Night (X + Y)
This event was held at 7:30pm at Pembroke NCR.
24th February 2017 — Dr Julia Goedecke (DPMMS)
Universal Properties: a categorical look at undergraduate algebra and topology
Mostly without knowing, you have all already met lots of objects with universal properties throughout your undergraduate courses. Working with the universal property of an object rather than its concrete implementation can have huge benefits: it gives an implementation-independent definition, which can therefore be used in many different mathematical areas at once. It also gives much greater conceptual clarity about the object in question and what role it plays within its area. In general, the concept of universal property is a very important one and crops up in nearly all areas of pure mathematics. My own field of category theory is the natural setting to investigate this concept. After a short introduction to the ideas of category theory I will spend most of the talk highlighting the universal properties of objects you are very familiar with, such as cartesian products and quotients, as well as giving you insight into a few you may not yet have met.
5th March 2017 — Archimedeans Annual Dinner
This event was held at 6pm at Doubletree by Hilton Hotel.
9th March 2017 — Annual General Meeting
This event was held at 7pm at Pembroke NCR.
10th March 2017 — Prof. James Norris (Stats Lab)
Aggregation and coalescence
I will show how a simple model for random planar aggregation leads via some complex analysis to a continuum of coalescing random walks.
11th March 2017 — Annual Problems Drive
This event was held at 2pm to 4pm at MR4, CMS.