Austin Fearnley wrote:theta = 35.1 deg (i.e. the angle whose -cos equals -0.818)
I hadn't bothered to work out the angle before as the 'proof' will work with any angle.
One can look at the table in two ways.
1. Assume that the original data are from genuine matched pairs of particles in a Bell experiment, relying on entanglement only.
My randomisation shows that the correl results would not change if we no longer bothered to match up the pairs. One needs to randomise as I previously wrote. That is we randomise B values within A values. Or randomise A values within B values. It may possibly be argued that this is a spurious effect as all the original data are from exactly matched pairs, and we do not know what would have been measured in the real experiment if the pairs had not been matched.
Second way. 2. Assume that the original data are from unmatched pairs in a Bell experiment, based on my method relying on polarisation (which does not need exact matches.)
The randomisation here also does not change the correlation and shows that you can get the correlation from any such ordering of the data. That is what you would expect from a method not relying on exactly matched pairs.
This second way has not been tested by a real experiment so there is no proof that we will get -a.b. It is doubtful that any real experiment historically took any measurements from unmatched pairs?
Suppose you have an n x 2 spreadsheet filled with 0s and 1s. Columns are called “A” and “B”. If you reorder the rows for which A = 0, and reorder the rows for which A = 1, you’ll end up with the same 2x2 table with rows labelled by a =0 and a =1, and columns labelled by b = 0 and b = 1, and such that the cell (a, b) contains the number of rows with (A,B) = (a,b).
Real experiments define paired time slots in the two wings of the experiment. At the start of each time slot, a setting is introduced into some device. By the end of the time slot, some data has been received and, by some computation or other fast electronics, a binary outcome is computed. I don’t know what you mean by “matched pairs”. The experimenter defines the time slots. The experimenter tends to believe in quantum mechanics and is so good at quantum engineering that mostly, the two photons within just one photon pair trigger the detection physics. The experimenter is generally aiming to make something happen which can’t be explained by non-conspiratorial local realistic theories. Nowadays, lots of people are studying theories which can be called conspiratorial. Do not take that in a derogatory sense. The idea is that the experimenter is deluded in thinking they can input arbitrary settings. Instead, the settings he or she “chooses” are determined either by events in the far future, or by events in the deep past.
See
https://arxiv.org/abs/1912.06462.
Rethinking Superdeterminism
S. Hossenfelder, T.N. Palmer
Quantum mechanics has irked physicists ever since its conception more than 100 years ago. While some of the misgivings, such as it being unintuitive, are merely aesthetic, quantum mechanics has one serious shortcoming: it lacks a physical description of the measurement process. This "measurement problem" indicates that quantum mechanics is at least an incomplete theory -- good as far as it goes, but missing a piece -- or, more radically, is in need of complete overhaul.
Here we describe an approach which may provide this sought-for completion or replacement: Superdeterminism. A superdeterministic theory is one which violates the assumption of Statistical Independence (that distributions of hidden variables are independent of measurement settings). Intuition suggests that Statistical Independence is an essential ingredient of any theory of science (never mind physics), and for this reason Superdeterminism is typically discarded swiftly in any discussion of quantum foundations.
The purpose of this paper is to explain why the existing objections to Superdeterminism are based on experience with classical physics and linear systems, but that this experience misleads us. Superdeterminism is a promising approach not only to solve the measurement problem, but also to understand the apparent nonlocality of quantum physics. Most importantly, we will discuss how it may be possible to test this hypothesis in an (almost) model independent way.
