Sh-Lie algebras Induced by Gauge Transformations
The physics of ``particles of spin $\leq 2$'' leads to representations of a Lie algebra $\Xi$ of gauge parameters on a vector space $\Phi$ of fields. Attempts to develop an analogous theory for spin $>2$ have failed; in fact, there are claims that such a theory is impossible (though we...
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| Zusammenfassung: | The physics of ``particles of spin $\leq 2$'' leads to representations of a
Lie algebra $\Xi$ of gauge parameters on a vector space $\Phi$ of fields.
Attempts to develop an analogous theory for spin $>2$ have failed; in fact,
there are claims that such a theory is impossible (though we have been unable
to determine the hypotheses for such a `no-go' theorem). This led BBvD
[burgers:diss,BBvd:three,BBvD:probs] to generalize to `field dependent
parameters' in a setting where some analysis in terms of smooth functions is
possible. Having recognized the resulting structure as that of an sh-lie
algebra ($L_\infty$-algebra), we have now reproduced their structure entirely
algebraically, hopefully shedding some light on what is going on. |
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| DOI: | 10.48550/arxiv.math/0012106 |