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Logarithmic reduction of the level of randomness in some probabilistic geometric constructions |
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| Authors: | S Artstein-Avidan VD Milman |
| Institution: | a Department of Mathematics, Princeton University, Fine Hall, Washington Road, Princeton, NJ 08544-1000, USA b School of Mathematics, Institute for Advanced Study, 1 Einstein Drive, Princeton, NJ 08540, USA c School of Mathematical Science, Tel Aviv University, Ramat Aviv, Tel Aviv 69978, Israel |
| Abstract: | Many of the surprising phenomena occurring in high dimensions are proved by use of probabilistic arguments, which show the existence of organized and regular structures but do not hint as to where exactly do these structures lie. It is an intriguing question whether some of them could be realized explicitly. In this paper we show that the amount of randomness used can be reduced significantly in many of these questions from asymptotic convex geometry, and most of the random steps can be substituted by completely explicit algorithmic steps. The main tool we use is random walks on expander graphs. |
| Keywords: | Randomness reduction Explicit constructions Sections of _method=retrieve& _eid=1-s2 0-S0022123605004039& _mathId=si1 gif& _pii=S0022123605004039& _issn=00221236& _acct=C000051805& _version=1& _userid=1154080& md5=9ca4f394365a56075e64f2ad6d2b5dfd')" style="cursor:pointer ?1" target="_blank">" alt="Click to view the MathML source" title="Click to view the MathML source">?1 Asymptotic geometric analysis |
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