Wikipedia has an article on: <span class="searchmatch">Bell's</span> <span class="searchmatch">theorem</span> Wikipedia Named after John Stewart <span class="searchmatch">Bell</span>. <span class="searchmatch">Bell's</span> <span class="searchmatch">theorem</span> (physics) A no-go <span class="searchmatch">theorem</span> stating that no physical theory...
teorema di <span class="searchmatch">Bell</span> m (uncountable) (physics) <span class="searchmatch">Bell's</span> <span class="searchmatch">theorem</span>...
<span class="searchmatch">Bell's</span> <span class="searchmatch">theorem</span>, that an experimenter can make measurements that are independent of each other and of any hidden variables. In the context of <span class="searchmatch">Bell's</span> theorem...
Ax-Grothendieck <span class="searchmatch">theorem</span> Ax-Kochen <span class="searchmatch">theorem</span> bathtub <span class="searchmatch">theorem</span> Bayes' <span class="searchmatch">theorem</span> <span class="searchmatch">Bell</span>-Kochen-Specker <span class="searchmatch">theorem</span> <span class="searchmatch">Bell's</span> <span class="searchmatch">theorem</span> Belyi's <span class="searchmatch">theorem</span> Bertrand-Chebyshev <span class="searchmatch">theorem</span> Bézout's...
<span class="searchmatch">Bell</span>-Kochen-Specker <span class="searchmatch">theorem</span> Synonym of Kochen-Specker <span class="searchmatch">theorem</span>....
Kochen-Specker <span class="searchmatch">theorem</span> Wikipedia Proved by John S. <span class="searchmatch">Bell</span> in 1966 and by Simon B. Kochen and Ernst Specker in 1967. Kochen-Specker <span class="searchmatch">theorem</span> (quantum mechanics)...
article on: central limit <span class="searchmatch">theorem</span> Wikipedia (the <span class="searchmatch">theorem</span>): Central Limit <span class="searchmatch">Theorem</span> central limit <span class="searchmatch">theorem</span> (plural central limit <span class="searchmatch">theorems</span>) (statistics and mathematics...
structure of <span class="searchmatch">Bell's</span> <span class="searchmatch">theorems</span>”, in arXiv[1]: In Part I, I introduce the multideviation framework and then use it to prove an important <span class="searchmatch">theorem</span>: the <span class="searchmatch">Bell</span> distributions...
“Multideviations: The hidden structure of <span class="searchmatch">Bell's</span> <span class="searchmatch">theorems</span>”, in arXiv[1]: I then specify a set of new tight <span class="searchmatch">Bell</span> inequalities for arbitrary event spaces...
curve typical of the normal distribution central limit <span class="searchmatch">theorem</span> Gaussian distribution Laplacean, Laplacian “<span class="searchmatch">bell</span> curve”, in OneLook Dictionary Search....