# Born rule

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Not to be confused with the Cauchy–Born rule in crystal mechanics.

The Born rule (also called the Born law, Born's rule, or Born's law) is a law of quantum mechanics which gives the probability that a measurement on a quantum system will yield a given result. It is named after its originator, the physicist Max Born. The Born rule is one of the key principles of quantum mechanics. There have been many attempts to derive the Born rule from the other assumptions of quantum mechanics, with inconclusive results; the Many Worlds Interpretation for example cannot derive the Born rule.[1] However, within the Quantum Bayesianism interpretation of quantum theory, it has been shown to be an extension of the standard Law of Total Probability, which takes into account the Hilbert space dimension of the physical system involved.[2] The Born rule can however be derived in the ambit of so-called Hidden-Measurements Interpretation of quantum mechanics, by averaging over all possible measurement-interactions that can take place between the quantum entity and the measuring system.[3][4]

## The rule

The Born rule states that if an observable corresponding to a Hermitian operator $A$ with discrete spectrum is measured in a system with normalized wave function $\scriptstyle|\psi\rang$ (see bra–ket notation), then

• the measured result will be one of the eigenvalues $\lambda$ of $A$, and
• the probability of measuring a given eigenvalue $\lambda_i$ will equal $\scriptstyle\lang\psi|P_i|\psi\rang$, where $P_i$ is the projection onto the eigenspace of $A$ corresponding to $\lambda_i$.
(In the case where the eigenspace of $A$ corresponding to $\lambda_i$ is one-dimensional and spanned by the normalized eigenvector $\scriptstyle|\lambda_i\rang$, $P_i$ is equal to $\scriptstyle|\lambda_i\rang\lang\lambda_i|$, so the probability $\scriptstyle\lang\psi|P_i|\psi\rang$ is equal to $\scriptstyle\lang\psi|\lambda_i\rang\lang\lambda_i|\psi\rang$. Since the complex number $\scriptstyle\lang\lambda_i|\psi\rang$ is known as the probability amplitude that the state vector $\scriptstyle|\psi\rang$ assigns to the eigenvector $\scriptstyle|\lambda_i\rang$, it is common to describe the Born rule as telling us that probability is equal to the amplitude-squared (really the amplitude times its own complex conjugate). Equivalently, the probability can be written as $\scriptstyle|\lang\lambda_i|\psi\rang|^2$.)

In the case where the spectrum of $A$ is not wholly discrete, the spectral theorem proves the existence of a certain projection-valued measure $Q$, the spectral measure of $A$. In this case,

• the probability that the result of the measurement lies in a measurable set $M$ will be given by $\scriptstyle\lang\psi|Q(M)|\psi\rang$.

If we are given a wave function $\scriptstyle\psi$ for a single structureless particle in position space, this reduces to saying that the probability density function $p(x,y,z)$ for a measurement of the position at time $t_0$ will be given by $p(x,y,z)=$$\scriptstyle|\psi(x,y,z,t_0)|^2.$

## History

The Born rule was formulated by Born in a 1926 paper.[5] In this paper, Born solves the Schrödinger equation for a scattering problem and, inspired by Einstein's work on the photoelectric effect,[6] concluded, in a footnote, that the Born rule gives the only possible interpretation of the solution. In 1954, together with Walther Bothe, Born was awarded the Nobel Prize in Physics for this and other work.[7] John von Neumann discussed the application of spectral theory to Born's rule in his 1932 book.[8]

## References

1. ^ N.P. Landsman, "The conclusion seems to be that no generally accepted derivation of the Born rule has been given to date, but this does not imply that such a derivation is impossible in principle.", in Compendium of Quantum Physics (eds.) F.Weinert, K. Hentschel, D.Greenberger and B. Falkenburg (Springer, 2008), ISBN 3-540-70622-4
2. ^ Fuchs, C. A. QBism: the Perimeter of Quantum Bayesianism 2010
3. ^ Aerts, D. (1986). A possible explanation for the probabilities of quantum mechanics, Journal of Mathematical Physics, 27, pp. 202-210.
4. ^ Aerts, D. and Sassoli de Bianchi, M. (2014). The extended Poincare-Bloch representation of quantum mechanics and the hidden-measurement solution to the measurement problem. arXiv:1404.2429.
5. ^ Zur Quantenmechanik der Stoßvorgänge, Max Born, Zeitschrift für Physik, 37, #12 (Dec. 1926), pp. 863–867 (German); English translation, On the quantum mechanics of collisions, in Quantum theory and measurement, section I.2, J. A. Wheeler and W. H. Zurek, eds., Princeton, New Jersey: Princeton University Press, 1983, ISBN 0-691-08316-9.
6. ^
7. ^ Born's Nobel Lecture on the statistical interpretation of quantum mechanics
8. ^ Mathematische Grundlagen der Quantenmechanik, John von Neumann, Berlin: Springer, 1932 (German); English translation Mathematical Foundations of Quantum Mechanics, transl. Robert T. Beyer, Princeton, New Jersey: Princeton University Press, 1955.