Physics:Negative probability

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The probability of the outcome of an experiment is never negative, although a quasiprobability distribution allows a negative probability, or quasiprobability for some events. These distributions may apply to unobservable events or conditional probabilities.

Physics and mathematics

In 1942, Paul Dirac wrote a paper "The Physical Interpretation of Quantum Mechanics"[1] where he introduced the concept of negative energies and negative probabilities:

Negative energies and probabilities should not be considered as nonsense. They are well-defined concepts mathematically, like a negative of money.

The idea of negative probabilities later received increased attention in physics and particularly in quantum mechanics. Richard Feynman argued[2] that no one objects to using negative numbers in calculations: although "minus three apples" is not a valid concept in real life, negative money is valid. Similarly he argued how negative probabilities as well as probabilities above unity possibly could be useful in probability calculations.

Negative probabilities have later been suggested to solve several problems and paradoxes.[3] Half-coins provide simple examples for negative probabilities. These strange coins were introduced in 2005 by Gábor J. Székely.[4] Half-coins have infinitely many sides numbered with 0,1,2,... and the positive even numbers are taken with negative probabilities. Two half-coins make a complete coin in the sense that if we flip two half-coins then the sum of the outcomes is 0 or 1 with probability 1/2 as if we simply flipped a fair coin.

In Convolution quotients of nonnegative definite functions[5] and Algebraic Probability Theory [6] Imre Z. Ruzsa and Gábor J. Székely proved that if a random variable X has a signed or quasi distribution where some of the probabilities are negative then one can always find two random variables, Y and Z, with ordinary (not signed / not quasi) distributions such that X, Y are independent and X + Y = Z in distribution. Thus X can always be interpreted as the "difference" of two ordinary random variables, Z and Y. If Y is interpreted as a measurement error of X and the observed value is Z then the negative regions of the distribution of X are masked / shielded by the error Y.

Another example known as the Wigner distribution in phase space, introduced by Eugene Wigner in 1932 to study quantum corrections, often leads to negative probabilities.[7] For this reason, it has later been better known as the Wigner quasiprobability distribution. In 1945, M. S. Bartlett worked out the mathematical and logical consistency of such negative valuedness.[8] The Wigner distribution function is routinely used in physics nowadays, and provides the cornerstone of phase-space quantization. Its negative features are an asset to the formalism, and often indicate quantum interference. The negative regions of the distribution are shielded from direct observation by the quantum uncertainty principle: typically, the moments of such a non-positive-semidefinite quasiprobability distribution are highly constrained, and prevent direct measurability of the negative regions of the distribution. Nevertheless, these regions contribute negatively and crucially to the expected values of observable quantities computed through such distributions.

An example: the double slit experiment

Consider a double slit experiment with photons. The two waves exiting each slit can be written as: [math]\displaystyle{ f_1(x) = \sqrt{\frac{dN/dt}{2\pi/d}}\frac{1}{\sqrt{d^2+(x+a/2)^2}}\exp\left[i(h/\lambda)\sqrt{d^2+(x+a/2)^2}\right], }[/math] and [math]\displaystyle{ f_2(x) = \sqrt{\frac{dN/dt}{2\pi/d}}\frac{1}{\sqrt{d^2+(x-a/2)^2}}\exp\left[i(h/\lambda)\sqrt{d^2+(x-a/2)^2}\right], }[/math]

where d is the distance to the detection screen, a is the separation between the two slits, x the distance to the center of the screen, λ the wavelength and dN/dt is the number of photons emitted per unit time at the source. The amplitude of measuring a photon at distance x from the center of the screen is the sum of these two amplitudes coming out of each hole, and therefore the probability that a photon is detected at position x will be given by the square of this sum: [math]\displaystyle{ I(x) = \left\vert f_1(x)+f_2(x) \right\vert^2 = \left\vert f_1(x) \right\vert^2 + \left\vert f_2(x) \right\vert^2 + \left[f_1^*(x)f_2(x)+f_1(x)f_2^*(x)\right], }[/math]

One can interpret this as the well-known probability rule:

[math]\displaystyle{ \begin{align} P(\mathtt{photon\,\,reaches\,\,x\,\,going\,\,through\,\,either\,\,slit}) = \,&P(\mathtt{photon\,\,reaches\,\,x\,\,going\,\,through\,\,slit\,\,1}) \\ & + P(\mathtt{photon\,\,reaches\,\,x}\,\,\mathtt{going\,\,through\,\,slit\,\,2}) \\ & - P(\mathtt{photon\,\,reaches\,\,x}\,\,\mathtt{going\,\,through\,\,both\,\,slits}) \\ \\ =\,&P(\mathtt{photon\,\,reaches\,\,x}\,|\,\mathtt{went\,\,through\,\,slit\,\,1})\,P(\mathtt{going\,\,through\,\,slit\,\,1}) \\ & + P(\mathtt{photon\,\,reaches\,\,x}\,|\,\mathtt{went\,\,through\,\,slit\,\,2})\,P(\mathtt{going\,\,through\,\,slit\,\,2}) \\ & - P(\mathtt{photon\,\,reaches\,\,x}\,\,\mathtt{going\,\,through\,\,both\,\,slits}) \\ \\ =\,&P(\mathtt{photon\,\,reaches\,\,x}\,|\,\mathtt{went\,\,through\,\,slit\,\,1})\,\frac{1}{2} \\ & + P(\mathtt{photon\,\,reaches\,\,x}\,|\,\mathtt{went\,\,through\,\,slit\,\,2})\,\frac{1}{2} \\ & - P(\mathtt{photon\,\,reaches\,\,x}\,\,\mathtt{going\,\,through\,\,both\,\,slits}) \end{align} }[/math]

In blue, the sum of the probabilities of going through holes 1 and 2; in red, minus the joint probability of going through "both holes". The interference pattern is obtained by adding the two curves.

whatever the last term means. Indeed, if one closes either one of the holes forcing the photon to go through the other slit, the two corresponding intensities are

[math]\displaystyle{ I_1(x) = \left\vert f_1(x) \right\vert^2 = \frac{1}{2}\frac{dN}{dt}\frac{d/\pi}{d^2+(x+a/2)^2} }[/math] and [math]\displaystyle{ I_2(x) = \left\vert f_2(x) \right\vert^2 = \frac{1}{2}\frac{dN}{dt}\frac{d/\pi}{d^2+(x-a/2)^2}. }[/math]

But now, if one does interpret each of these terms in this way, the joint probability takes negative values roughly every [math]\displaystyle{ \lambda\frac{d}{a} }[/math]: [math]\displaystyle{ \begin{align} I_{12}(x) & = \left[f_1^*(x)f_2(x)+f_1(x)f_2^*(x)\right] \\ & = \frac{1}{2} \frac{dN}{dt} \frac{d/\pi}{\sqrt{d^2+(x-a/2)^2}\sqrt{d^2+(x+a/2)^2}}2\cos\left[(h/\lambda)(\sqrt{d^2+(x+a/2)^2}-\sqrt{d^2+(x-a/2)^2})\right] \\ \end{align} }[/math]

However, these negative probabilities are never observed as one cannot isolate the cases in which the photon "goes through both slits", but can hint at the existence of anti-particles.

Finance

Negative probabilities have more recently been applied to mathematical finance. In quantitative finance most probabilities are not real probabilities but pseudo probabilities, often what is known as risk neutral probabilities.[9] These are not real probabilities, but theoretical "probabilities" under a series of assumptions that help simplify calculations by allowing such pseudo probabilities to be negative in certain cases as first pointed out by Espen Gaarder Haug in 2004.[10]

A rigorous mathematical definition of negative probabilities and their properties was recently derived by Mark Burgin and Gunter Meissner (2011). The authors also show how negative probabilities can be applied to financial option pricing.[9]

Engineering

The concept of negative probabilities has also been proposed for reliable facility location models where facilities are subject to negatively correlated disruption risks when facility locations, customer allocation, and backup service plans are determined simultaneously.[11][12] Li et al.[13] proposed a virtual station structure that transforms a facility network with positively correlated disruptions into an equivalent one with added virtual supporting stations, and these virtual stations were subject to independent disruptions. This approach reduces a problem from one with correlated disruptions to one without. Xie et al.[14] later showed how negatively correlated disruptions can also be addressed by the same modeling framework, except that a virtual supporting station now may be disrupted with a “failure propensity” which

... inherits all mathematical characteristics and properties of a failure probability except that we allow it to be larger than 1...

This finding paves ways for using compact mixed-integer mathematical programs to optimally design reliable location of service facilities under site-dependent and positive/negative/mixed facility disruption correlations.[15]

The proposed “propensity” concept in Xie et al.[14] turns out to be what Feynman and others referred to as “quasi-probability.” Note that when a quasi-probability is larger than 1, then 1 minus this value gives a negative probability. In the reliable facility location context, the truly physically verifiable observation is the facility disruption states (whose probabilities are ensured to be within the conventional range [0,1]), but there is no direct information on the station disruption states or their corresponding probabilities. Hence the disruption "probabilities" of the stations, interpreted as “probabilities of imagined intermediary states,” could exceed unity, and thus are referred to as quasi-probabilities.

See also

References

  1. Dirac, P. A. M. (1942). "Bakerian Lecture. The Physical Interpretation of Quantum Mechanics". Proceedings of the Royal Society A: Mathematical, Physical and Engineering Sciences 180 (980): 1–39. doi:10.1098/rspa.1942.0023. Bibcode1942RSPSA.180....1D. 
  2. Feynman, Richard P. (1987). "Negative Probability". in Peat, F. David; Hiley, Basil. Quantum Implications: Essays in Honour of David Bohm. Routledge & Kegan Paul Ltd. pp. 235–248. ISBN 978-0415069601. https://cds.cern.ch/record/154856/files/pre-27827.pdf. 
  3. Khrennikov, Andrei Y. (March 7, 2013). Non-Archimedean Analysis: Quantum Paradoxes, Dynamical Systems and Biological Models. Springer Science & Business Media. ISBN 978-94-009-1483-4. https://books.google.com/books?id=HdzqCAAAQBAJ. 
  4. Székely, G.J. (July 2005). "Half of a Coin: Negative Probabilities". Wilmott Magazine: 66–68. http://www.wilmott.com/pdfs/100609_gjs.pdf. 
  5. Ruzsa, Imre Z.; SzéKely, Gábor J. (1983). "Convolution quotients of nonnegative functions". Monatshefte für Mathematik 95 (3): 235–239. doi:10.1007/BF01352002. 
  6. Ruzsa, I.Z.; Székely, G.J. (1988). Algebraic Probability Theory. New York: Wiley. ISBN 0-471-91803-2. 
  7. Wigner, E. (1932). "On the Quantum Correction for Thermodynamic Equilibrium". Physical Review 40 (5): 749–759. doi:10.1103/PhysRev.40.749. Bibcode1932PhRv...40..749W. 
  8. Bartlett, M. S. (1945). "Negative Probability". Mathematical Proceedings of the Cambridge Philosophical Society 41 (1): 71–73. doi:10.1017/S0305004100022398. Bibcode1945PCPS...41...71B. 
  9. 9.0 9.1 Meissner, Gunter A.; Burgin, Dr. Mark (2011). "Negative Probabilities in Financial Modeling". SSRN Electronic Journal (Elsevier BV). doi:10.2139/ssrn.1773077. ISSN 1556-5068. 
  10. Haug, E. G. (2004). "Why so Negative to Negative Probabilities?". Wilmott Magazine: 34–38. http://www.espenhaug.com/NegativeProbabilitiesHaug.pdf. 
  11. Snyder, L.V.; Daskin, M.S. (2005). "Reliability Models for Facility Location: The Expected Failure Cost Case". Transportation Science 39 (3): 400–416. doi:10.1287/trsc.1040.0107. 
  12. Cui, T.; Ouyang, Y.; Shen, Z-J. M. (2010). "Reliable Facility Location Design Under the Risk of Disruptions". Operations Research 58 (4): 998–1011. doi:10.1287/opre.1090.0801. 
  13. Li, X.; Ouyang, Y.; Peng, F. (2013). "A supporting station model for reliable infrastructure location design under interdependent disruptions". Transportation Research Part E 60: 80–93. doi:10.1016/j.tre.2013.06.005. 
  14. 14.0 14.1 Xie, S.; Li, X.; Ouyang, Y. (2015). "Decomposition of general facility disruption correlations via augmentation of virtual supporting stations". Transportation Research Part B 80: 64–81. doi:10.1016/j.trb.2015.06.006. 
  15. Xie, Siyang; An, Kun; Ouyang, Yanfeng (2019). "Planning facility location under generally correlated facility disruptions: Use of supporting stations and quasi-probabilities". Transportation Research Part B: Methodological (Elsevier BV) 122: 115–139. doi:10.1016/j.trb.2019.02.001. ISSN 0191-2615.