Tarun Chitra pfp
Tarun Chitra
@pinged
🤓of the day(ish): Michael Atiyah Atiyah is one of the main forces at the intersection of differential geometry and topology of the 20th century. Along with people like Raoul Bott and Nigel Hitchin, he found innovative ways to use smooth manifolds to explore discrete topology https://i.imgur.com/FK3d0HA.jpg
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Tarun Chitra pfp
Tarun Chitra
@pinged
One of his works that impacted me the most when I was in undergrad was the Atiyah-Singer index theorem. It was so counterintuitive (at first) that a smooth, infinite dimensional object (differential operators on a manifold) could somehow give you info about discrete, combinatorial structure in a smooth manifold
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Tarun Chitra pfp
Tarun Chitra
@pinged
But Atiyah did much more than tie functional analysis to topology. He extended classical cohomological theories (de Rham, Dolbeault) to classes of topological (e.g. equivalence classes of Fibre and Vector bundles over a base space) and used spectral sequences to map classical results to the abstract realm
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Tarun Chitra pfp
Tarun Chitra
@pinged
His work in K-Theory (which I mainly ended up reading via Hatcher's excellent introduction to topological K-Theory) is extremely beautiful — one can use K-Theory to construct geometric objects to represent classical algebraic problems such as division algebras and diophantine equations
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