Archives
Keywords
Rainbow sets Ineffable cardinal weak square approachability ideal Well-behaved magma transformations free Souslin tree Lipschitz reduction full tree Nonspecial tree Successor of Singular Cardinal Kurepa Hypothesis PFA(S)[S] Sierpinski's onto mapping principle Subtle tree property Whitehead Problem Subadditive Diamond-sharp L-space C-sequence Successor of Regular Cardinal Small forcing nonmeager set Square-Brackets Partition Relations Generalized Clubs Antichain P-Ideal Dichotomy Foundations Absoluteness Coherent tree Ramsey theory over partitions Microscopic Approach AIM forcing regressive Souslin tree very good scale Precaliber Singular cofinality Uniformly coherent Almost-disjoint family Club Guessing Parameterized proxy principle Local Club Condensation. stick Fast club Hereditarily Lindelöf space Cohen real Dushnik-Miller Partition Relations Selective Ultrafilter Amenable C-sequence Was Ulam right Almost Souslin tensor product graph Universal Sequences Shelah's Strong Hypothesis Prikry-type forcing stationary reflection Analytic sets b-scale Generalized descriptive set theory xbox Forcing OCA unbounded function club_AD sap coloring number Weakly compact cardinal O-space Reduced Power reflection principles indecomposable ultrafilter Mandelbrot set Rado's conjecture S-Space Ascent Path projective Boolean algebra Poset Ostaszewski square polarized partition relation strongly bounded groups Distributive tree incompactness Closed coloring Large Cardinals Uniformly homogeneous Strongly Luzin set Rock n' Roll HOD Commutative cancellative semigroups diamond star Dowker space Luzin set GMA middle diamond Constructible Universe Iterated forcing Reflecting stationary set Postprocessing function Chang's conjecture free Boolean algebra Singular Density Sakurai's Bell inequality Axiom R Souslin Tree specializable Souslin tree Fodor-type reflection Forcing Axioms Aronszajn tree Vanishing levels Non-saturation positive partition relation higher Baire space Uniformization Ulam matrix 54G20 Strong coloring super-Souslin tree square Erdos-Hajnal graphs Slim tree SNR Singular cardinals combinatorics Subtle cardinal PFA ZFC construction Filter reflection Erdos Cardinal Subnormal ideal Hindman's Theorem Jonsson cardinal Open Access Prevalent singular cardinals Chromatic number Greatly Mahlo Martin's Axiom countably metacompact Knaster Knaster and friends Diamond Cardinal function Sigma-Prikry weak Kurepa tree ccc Hedetniemi's conjecture Almost countably chromatic stationary hitting Fat stationary set Cardinal Invariants square principles weak diamond Diamond for trees Minimal Walks
Tag Archives: Foundations
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
