Talk:Grothendieck inequality

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any chance someone rewrites this article in ENGLISH ?—Preceding unsigned comment added by 192.118.45.2 (talk) 11:10, 2 August 2009 (UTC)[reply]

It's gone way over my head... But I've tagged the main page for you.  Ronhjones  ^(Talk) 22:14, 27 August 2009 (UTC)[reply]

IMHO the cited article (arXiv:1103.6161) counts as a current event, of which the outcome may not be clear. I don't know how to write that into the article, but I think that until it is published in a peer reviewed journal this should be noted somewhere. --Rubik's Cube (talk) 11:57, 16 May 2011 (UTC)[reply]

It was published in a peer-reviewed conference later in the same year. I've updated our article to include that information. —David Eppstein (talk) 18:44, 5 November 2013 (UTC)[reply]

Terry Tao writes the below:

https://plus.google.com/u/0/114134834346472219368/posts/NqTkJb6Ns6m

Grothendieck's inequality asserts that a certain discrete optimisation problem (optimising a bilinear form over inputs that are +1 or -1) is equivalent up to constants to a continuous optimisation problem (optimising the same bilinear form over unit vectors in a Hilbert space). This is important for theoretical computer science, because the former problem essentially contains NP-hard problems such as MAX-CUT, whereas the latter can be rephrased as a semidefinite program (by writing the problem in terms of the Gram matrix of the unit vectors) and can be solved in polynomial time by algorithms such as the ellipsoid method. So there are certain NP-hard problems which one can solve "up to constants" in polynomial time: in some sense, the "ratio" between NP and P is bounded! Furthermore, in a certain technical sense, one cannot achieve a better approximation to such problems by any polynomial-time algorithm than through the Grothendieck inequality, at least if one assumes the Unique Games Conjecture (a result of Raghavendra and Steurer).

Grothendieck's inequality also has a very cute connection to Bell's inequality in quantum mechanics, as observed by Tsirelson; roughly speaking, the ability of quantum mechanics to violate Bell's inequality is logically equivalent to the constant in Grothendieck's inequality being greater than one (basically because the discrete optimisation problem describes the envelope of all possible measurement outcomes of a classical hidden-variable system, and the vector-valued optimisation problem describes the envelope of all possible measurement outcomes of a quantum system). Or to put it another way, Grothendieck's inequality asserts (in some sense) that Bell's inequality can only be violated "up to a constant", at least when there are only two measurements made. (For three or more measurements the violation can be much more dramatic, a result of Perez-Garcia, Wolf, Palazuelos, Villenueva, and Junge.)

[All this I learned today from a very nice lecture by Pisier on these topics, largely based on his survey article linked to here.]

arXiv:1101.4195

— Preceding comment added by User:Linas (talk) 18:27, 5 November 2013 (UTC)[reply]