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比利时vs摩洛哥足彩 ,
university of california san diego

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food for thought seminar

evangelos ``vaki'' nikitopoulos

ucsd

algebratizing differential geometry: linear differential operators

abstract:

it is frequently the case that certain objects in differential topology/geometry can be described in purely algebraic terms, where the algebraic structures involved are constructed using the smooth structure(s) of the underlying manifold(s). for example, a common equivalent characterization of a smooth vector field on a smooth manifold $m$ is a derivation of the $\mathbb{r}$-algebra of smooth real-valued functions on $m$. i shall discuss this example and describe how it led me to a considerably more involved one: linear differential operators on $m$. this talk should be of interest to anyone who likes differential topology/geometry, algebraic geometry, or algebra.

november 6, 2018

12:00 pm

ap&m 7321

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