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### Recent blog posts

- A strong form of König’s lemma October 21, 2017
- 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

### Keywords

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

# 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