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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

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

# 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