9,328 research outputs found
On Dirac's incomplete analysis of gauge transformations
Dirac's approach to gauge symmetries is discussed. We follow closely the
steps that led him from his conjecture concerning the generators of gauge
transformations {\it at a given time} --to be contrasted with the common view
of gauge transformations as maps from solutions of the equations of motion into
other solutions-- to his decision to artificially modify the dynamics,
substituting the extended Hamiltonian (including all first-class constraints)
for the total Hamiltonian (including only the primary first-class constraints).
We show in detail that Dirac's analysis was incomplete and, in completing it,
we prove that the fulfilment of Dirac's conjecture --in the "non-pathological"
cases-- does not imply any need to modify the dynamics. We give a couple of
simple but significant examples.Comment: 36 pages. Additional references and a new paragraph in the
introduction. Version to be published in Studies in History and Philosophy of
Modern Physic
Fluctuations around classical solutions for gauge theories in Lagrangian and Hamiltonian approach
We analyze the dynamics of gauge theories and constrained systems in general
under small perturbations around a classical solution (background) in both
Lagrangian and Hamiltonian formalisms. We prove that a fluctuations theory,
described by a quadratic Lagrangian, has the same constraint structure and
number of physical degrees of freedom as the original non-perturbed theory,
assuming the non-degenerate solution has been chosen. We show that the number
of Noether gauge symmetries is the same in both theories, but that the gauge
algebra in the fluctuations theory becomes Abelianized. We also show that the
fluctuations theory inherits all functionally independent rigid symmetries from
the original theory, and that these symmetries are generated by linear or
quadratic generators according to whether the original symmetry is preserved by
the background, or is broken by it. We illustrate these results with the
examples.Comment: 27 pages; non-essential but clarifying changes in Introduction, Sec.
3 and Conclusions; the version to appear in J.Phys.
Equivalence of Faddeev-Jackiw and Dirac approaches for gauge theories
The equivalence between the Dirac method and Faddeev-Jackiw analysis for
gauge theories is proved. In particular we trace out, in a stage by stage
procedure, the standard classification of first and second class constraints of
Dirac's method in the F-J approach. We also find that the Darboux
transformation implied in the F-J reduction process can be viewed as a
canonical transformation in Dirac approach. Unlike Dirac's method the F-J
analysis is a classical reduction procedure, then the quantization can be
achieved only in the framework of reduce and then quantize approach with all
the know problems that this type of procedures presents. Finally we illustrate
the equivalence by means of a particular example.Comment: Latex v2.09, 15 pages, to appear in Int. J. Mod. Phys.
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