Abstract:
A complex variety has two intrinsic metric space structures in neighborhood of any point (“inner” and “outer” metric) which are uniquely determined from the complex structure up to bilipschitz change of the metric (changing distances by at most a constant factor). In dimension 1 the inner metric (given by minimal
arclength within the variety) carries no interesting information, and it is only very recently, starting with a 2008 paper [1] of Birbrair and Fernandes, that it has become clear how rich metric information is in higher dimensions. Inner metric in dimension 2 is now very well understood through work of Birbrair, Pichon and the speaker [2]. The talk will give an overview of this work, and, given time, describe some results of the speaker and Pichon about outer metric [3].
Language: English
References
Birbrair L., Fernandes A., “Inner metric geometry of complex algebraic surfaces with isolated singularities”, Comm. Pure Appl. Math., 2008, no. 61, 1483–1494
Birbrair L., Neumann W.D. and Pichon A. The thick-thin decomposition and bilipschitz classification of normal surface singularities, 2011, arXiv: 1105.3327
Neumann W.D., Pichon A., “Lipschitz geometry of complex surfaces: analytic invariants and equisingularity”, 2012, arXiv: 1211.4897
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