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### Recent blog posts

- Prikry forcing may add a Souslin tree June 12, 2016
- The reflection principle $R_2$ May 20, 2016
- Prolific Souslin trees March 17, 2016
- Generalizations of Martin’s Axiom and the well-met condition January 11, 2015
- Many diamonds from just one January 6, 2015
- Happy new jewish year! September 24, 2014
- Square principles April 19, 2014
- Partitioning the club guessing January 22, 2014

### Keywords

reflection principles Fodor-type reflection Fat stationary set Rock n' Roll tensor product graph Hedetniemi's conjecture Fast club Weakly compact cardinal Martin's Axiom 11P99 Partition Relations Aronszajn tree 05D10 Dushnik-Miller Selective Ultrafilter Successor of Regular Cardinal P-Ideal Dichotomy Constructible Universe PFA Almost Souslin b-scale Small forcing Generalized Clubs Erdos Cardinal projective Boolean algebra Chang's conjecture Successor of Singular Cardinal OCA Club Guessing Forcing Axioms sap Stevo Todorcevic approachability ideal Axiom R Postprocessing function Minimal Walks free Boolean algebra Non-saturation Hindman's Theorem Rado's conjecture weak diamond Cardinal function Reduced Power Slim tree Sakurai's Bell inequality Universal Sequences Distributive tree Prevalent singular cardinals Erdos-Hajnal graphs Diamond Knaster S-Space xbox Chromatic number Cohen real polarized partition relation L-space incompactness Kurepa Hypothesis Cardinal Invariants Ostaszewski square Jonsson cardinal diamond star Luzin set square principles square Souslin Tree Nonspecial tree Prikry-type forcing Whitehead Problem Square-Brackets Partition Relations Almost-disjoint famiy Commutative cancellative semigroups Uniformization Uniformly coherent stationary hitting Forcing weak square Mandelbrot set Parameterized proxy principle ccc Coherent tree Rainbow sets Foundations Almost countably chromatic Singular cardinals combinatorics PFA(S)[S] Shelah's Strong Hypothesis HOD middle diamond Absoluteness 20M14 Singular coﬁnality stationary reflection Singular Density Ascent Path coloring number Large Cardinals Hereditarily Lindelöf space Poset very good scale Microscopic Approach Antichain 05A17

# Tag Archives: Sakurai’s Bell inequality

## Review: Is classical set theory compatible with quantum experiments?

Yesterday, I attended a talk at the Quantum Foundations seminar at the beautiful Perimeter Institute for Theoretical Physics (Waterloo, Ontario). The (somewhat provocative) title of the talk was “Is Classical Set Theory Compatible with Quantum Experiments?”, and the speaker was Radu … Continue reading