000			02168nam a22003135i 4500
001			65968
005			20200529145015.0
010			_a978-3-319-09477-9 _dcompra
090			_a65968
100			_a20150401d2014 k||y0pory50 ba
101			_aeng
102			_aDE
200			_aGeometric aspects of functional analysis _bDocumento electrónico _eIsrael seminar (GAFA) 2011-2013 _fedited by Bo'az Klartag, Emanuel Milman
210			_aCham _cSpringer International Publishing _d2014
215			_aIX, 463 p. _cil.
225			_aLecture Notes in Mathematics
300			_aColocação: Online
303			_aAs in the previous Seminar Notes, the current volume reflects general trends in the study of Geometric Aspects of Functional Analysis. Most of the papers deal with different aspects of Asymptotic Geometric Analysis, understood in a broad sense; many continue the study of geometric and volumetric properties of convex bodies and log-concave measures in high-dimensions and in particular the mean-norm, mean-width, metric entropy, spectral-gap, thin-shell and slicing parameters, with applications to Dvoretzky and Central-Limit-type results. The study of spectral properties of various systems, matrices, operators and potentials is another central theme in this volume. As expected, probabilistic tools play a significant role and probabilistic questions regarding Gaussian noise stability, the Gaussian Free Field and First Passage Percolation are also addressed. The historical connection to the field of Classical Convexity is also well represented with new properties and applications of mixed-volumes. The interplay between the real convex and complex pluri-subharmonic settings continues to manifest itself in several additional articles. All contributions are original research papers and were subject to the usual refereeing standards.
606			_94913 _aAnálise funcional
606			_953 _aGeometria
680			_aQA320
702			_aKlartag _bBo'az _4340 _925708
702			_aMilman _bEmanuel _4340 _925709
801			_aPT _gRPC
856			_uhttp://dx.doi.org/10.1007/978-3-319-09477-9
942			_2lcc _cF _n0