比利时vs摩洛哥足彩
,
university of california san diego
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math 295 - mathematics colloquium
charlie fefferman
princeton university
whitney's extension problem and its extensions
abstract:
let x be our favorite space of continuous functions on $r^n$, and let f be a real-valued function defined on some awful subset e of $r^n$. how can we decide whether f extends to a function f in x? if f exists, then how small can we take its norm? what can we say about the derivatives of f (if they exist)? can we take f to depend linearly on f? suppose e is finite. can we compute an f with close to least-possible norm? how many computer operations does it take? what if f is required merely to agree approximately with f on e? which points of e should we delete as "outliers"? the subject goes back to whitney. the recent results are joint work with arie israel, bo'az klartag and garving luli.
host: peter ebenfelt
november 13, 2014
3:00 pm
ap&m 6402
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