https://seminars.math.toronto.edu/seminars/list/events.py/process?action=display&file=5cea3e304997ed9e47a58d3796574317-submission-pkl-1674681271.5403731The next talk (and likely the last one this term) at our seminar by Boris Khesin (U Toronto) and Sergei Tabachnikov (Penn State) -- "Closed problems session" -- is on Tuesday, March 28, 2023 at 12:30PM EST (19:30 in Moscow, 18:30 in Europe, 9:30am in Arizona and California).
ATTENTION: Note the time change: this term the seminar meets 30min later than usual.
Abstract: In 1991 in the paper “A Mathematical Trivium” V. Arnold formulated a list of 100 problems which, in his opinion, any graduate with a Math Bachelor degree should be able to solve. This talk is the opposite of an “Open problems session”, as all the problems to be discussed do have solutions, hence its title. Those Arnold problems are very diverse in subject and in difficulty: few of them are standard exercises that every mathematician should do once in a lifetime, some would be easy to those who have mastered a particular subject, and some are ingeniously constructed, akin to sophisticated chess problems. Regardless, all of them are fundamental and beautiful, and we will try to comment on and give hints to a number of them.
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修改:vinbo FROM 211.161.243.*
FROM 211.161.243.*