By defining reality as an inherent Platonic realm of thinking with symmetric probability (that is also inherently indeterminate) - then The claim is made that quantum uncertainty is also inherently symmetric
John Skilling and Kevin H. Knuth (2019), entitled Symmetrical foundation of
measure, probability, and quantum theories.
wrongly define uncertainty as based on a "measurement" limit instead of an inherent time-frequency uncertainty that is nonlocal and noncommutative!
More fundamentally, though, a probe is a partner object, not necessarily so small as to to be dominated. But, if our object can perturb a partner object, then by symmetry the partner object can also perturb our object.
No that's not how Bell's Inequality works! There is an inherent noncommutative nonlocality to Bell's Inequality. It's not surprising that they would make this mistake since as Professor Jean Bricmont points out - even Stephen Hawking did not understand Bell's Inequality.
So in terms of pure information we instead have an "active information" of the future changing the past!! At least as defined by external observations limited to the speed of light. As defined by quantum nonlocality there is an instantaneous "spooky" action at a distance but it is also inherently noncommutative!! That's the difference between logical inference and probability induction that these "symmetric" physicists are relying on.
We find that the heat capacity of the squeezed coherent states of boson and fermion on the noncommutative geometry have different values, contrast to that on the commutative geometry.
Wow so Negentropy is inherently noncommutative as well as nonlocal
Is it surprising that Chinese physicists embrace the truth of noncommutativity while Westerners are still confused? Western physicists like to emphasize there is a difference between noncommutative spacetime and noncommutative phase space of quantum physics. But Professor Basil J. Hiley demonstrated there is a deeper noncommutative "active information" of the algebra that is also nonlocal and therefore underlies both the noncommutativity of the uncertainty of an "external measurement" of quantum physics and the noncommutativity of spacetime.
Some interesting results have found are : there exists a finite maximum temperature that the
black hole can reach before cooling down to absolute zero; there is no curvature singularity
at the origin while existence a regular De-Sitter core at short distance.
In this short paper we will report our investigations about the thermal property of ideal
gas on the noncommutative geometry in the coherent state formalism
So just as Professor Shahn Majid realized - in noncommutativity there is an inherent quantum "wormhole" to black holes - without any classical logarithmic singularity. So the negentropic noncommutative nonlocality creates an antigravity active information wormhole from the future - this is also what enables levitation.
As a special result in the noncommutative case, we find that the noncommutative character of the manifold would be equivalent to the temperature of a thermodynamic system.
There's some 20 papers citing that first one.
Along this line, an interesting issue to be investigated is that, as near the final stage of evaporation the backreaction of the black hole on the source will play an important role the black hole source may be deformed into the squeezed coherent state.
this leads to a negative entropy correction in noncommutative super Yang-Mills theory
noncommutativity preserves protoconsciousness "active information" as a quantum wormhole
due to spacetime noncommutativity, information might be preserved by a stable black hole remnant.
More negentropic noncommutative nonlocality
We show that the time evolution of the two dimensional noncommutative harmonic oscillator gives rise to entanglement. This is achieved at the level of the evolution operator by using the algebraic approach. The measure of entropy and the states of maximum entanglement are also considered in this context...a maximally entangled two qubit system possesses negative conditional entropies and excessive mutual entropy.
Within this proposed entropic phase space are positive and negative entropy fields represented thermodynamically in quadratic terms of External-Internal<<>>Energy-Exergy ....generally Quantum dissipative systems can therefore be defined as Rationalistic [composed of fractionals and ratios of value], Monadic [having noncommutative distributed value across singular matrices] and Holographic [demonstrating material and immaterial relations across said matrices]
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