Kate Owens of the College of Charleston talks about mastery grading, innovative teaching in a historic institution, and more.
A biologist at Harvard was chatting with a colleague about a mentor who pushed him to do harder math problems. It turns out the colleague had the same mentor — and so did many others.
George Berzsenyi is a retired math professor living in Milwaukee County. Most people have never heard of him.
But Berzsenyi has had a remarkable impact on American science and mathematics. He has mentored thousands of high school students, including some who became among the best mathematicians and scientists in the country.
What a great little story…
I also find myself thinking, yet again, what was it about the early 1900’s in Hungary that they turned out, not even so many great scientists, but so many fantastic mathematicians? What were they doing right that we seem to be missing now? Can it be replicated? Was it cultural? Was it a certain type of teaching method? Simple expectations?
New research explains how the shapes of neurons can be classified using mathematical methods from the field of algebraic topology. Neuroscientists can now start building a formal catalogue for all the types of cells in the brain. Onto this catalogue of cells, they can systematically map the function and role in disease of each type of neuron in the brain.
A while back I answered a question on Quora: Can people actually keep up with note-taking in Mathematics lectures with LaTeX . There, I explained…
This is awesome though I’ve also heard of cases in which students use shared Google docs to collaboratively take notes like this as well.
Last night saw the wrap up of Dr. Michael Miller’s excellent Winter quarter class Introduction to Category Theory. As usual he passed out a short survey to accept ideas for the Fall and Winter quarters this coming year at UCLA Extension.
If you didn’t get a chance to weigh in, feel free to email him directly, or respond here with your suggestions (in order of preference) and I’ll pass them along.
I keep a list of his past offerings (going back to 2006, but he’s been doing this since 1973) on my site for reference. He’s often willing to repeat courses that have been previously offered, particularly if there’s keen interest in those topics.
Some of the suggestions on last night’s list included:
combinatorial group theory
point set topology
Feel free to vote for any of these or suggest your own topics. Keep in mind that many of the topics in the past decade have come about specifically because of lobbying on behalf of students.
Dr. Uhlenbeck helped pioneer geometric analysis, developing techniques now commonly used by many mathematicians.
📖 Read pages 21-28 of Abstract and Concrete Categories: The Joy of Cats by Jirí Adámek, Horst Herrlich, George E. Strecker
Read while having dinner at UCLA before class. Covered categories, examples, and duality.
Are there examples of originally widely accepted proofs that were later discovered to be wrong by attempting to formalize them using a proof assistant (e.g. Coq, Agda, Lean, Isabelle, HOL, Metamath,
Mathematical minds love a problem that's easy to pose but tough to solve
Quick note of a factual and temporal error: the article indicates:
After all, it had been Wiener who discovered a precise mathematical definition of information: The higher the probability, the higher the entropy and the lower the information content.
In fact, it was Claude E. Shannon, one of Wiener’s colleagues, who wrote the influential A Mathematical Theory of Communication published in Bell System Technical Journal in 1948, almost 5 years after the 1943 part of the timeline the article is indicating. Not only did Wiener not write the paper, but it wouldn’t have existed yet to have been a factor in Pitts deciding to choose a school or adviser at the time. While Wiener may have been a tremendous polymath, I suspect that his mathematical area of expertise during those years would have been closer to analysis and not probability theory.
To put Pitts & McCulloch’s work into additional context, Claude Shannon’s stunning MIT master’s thesis A symbolic analysis of relay and switching circuits in 1940 applied Boolean algebra to electronic circuits for the first time and as a result largely allowed the digital age to blossom. It would be nice to know if Pitts & McCulloch were aware of it when they published their work three years later.
I will post regular updates about data publication plans for the 2020 Census. I won't be shy about statistics, include some history and, ultimately, address the implications of technical decisions on politics, planning, research... and journalism.
Added this to my subscription list as well.
Oxford Mathematics' Heather Harrington is the joint winner of the 2019 Adams Prize. The prize is one of the University of Cambridge's oldest and most prestigious prizes. Named after the mathematician John Couch Adams and endowed by members of St John's College, it commemorates Adams's role in the discovery of the planet Neptune. Previous prize-winners include James Clerk Maxwell, Roger Penrose and Stephen Hawking.
This year's Prize has been awarded for achievements in the field of The Mathematics of Networks. Heather's work uses mathematical and statistical techniques including numerical algebraic geometry, Bayesian statistics, network science and optimisation, in order to solve interdisciplinary problems. She is the Co-Director of the recently established Centre for Topological Data Analysis.
By law, the Census Bureau is required to keep our responses to its questionnaires confidential. And so, over decades, it has applied several “disclosure avoidance” techniques when it publishes data — these have been meticulously catalogued by Laura McKenna
Arriving from Europe with diamonds in his shoes (hidden there), he found renown in his field with real-world applications, like charting a stock market.
How many references to “Diamonds hidden in the soles of shoes” can there be? Suppose this story may have somehow influenced Paul Simon?
A nice overview of some of Stein’s work.