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Are there applications of supersymmetry in other branches of physics other than high energy/particle physics?

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4 Answers 4

There are interesting applications in nuclear physics: http://arxiv.org/abs/nucl-th/0402058

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Alan Kostelecky at Indiana Univ. has done research on supersymmetry in atomic physics.

Here's a paper with background info on atomic supersymmetry, and application of supersymmetry to Penning traps.

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In 1980, Hermann Nicolai proved that the existence of a supersymmetry is equivalent to the statement that there exists a change of variables to turn the time evolution in the path integral into a stochastic equation. This change of variables is explicity known only for a handful of relativistic models, but it is known explicitly for all stochastic equations, because they are already stochastic equations--- there is nothing to transform.

Stochastic equations are the domain of condensed matter physics, and supersymmetry in these systems was discovered by Parisi and Sourlas in the early 1970's, almost simultaneously with the high energy discoveries. The stochastic applications are enormous, including SUSY QM, supersymmetric disorder averaging, supersymmetric phase transitions, etc. The applications are arguably more varied and interesting than those in high energy, because there is no necessary requirement of quantum unitarity, and you're allowed to play in swampland.

In nuclear physics, there is also an experimentally confirmed approximate supersymmetry between large nuclei with total spin differing by half.

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+1 because now I know what this relationship is called - the "Nicolai map". Would be interesting to know its meaning for local supersymmetry and extended supersymmetry. –  Mitchell Porter Oct 31 '11 at 7:30
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@Mitchell Porter: You said it. This is the question in SUSY. There are no-go theorems that I don't trust here, but I never got further than others. –  Ron Maimon Oct 31 '11 at 8:02

Besides supersymmetric quantum mechanics and supersymmetric integrable systems, there is, e.g., supersymmetric fluid dynamics. Of course, nowadays, it seems that almost any kind of system may be derived as some limit of String Theory, so whether it is outside or inside of high energy/particle physics is a matter of definition.

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What, supersymmetric fluid dynamics ...?! Ha ha cool, I`ll have to examine this paper more closely as soon as I find time for it LOL :-) . And +1 –  Dilaton Oct 30 '11 at 20:08

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