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@ARTICLE{Gozzi:390841,
      author       = {Gozzi, E. and Reuter, M.},
      title        = {{L}yapunov exponents, path-integrals and forms},
      journal      = {Chaos, solitons $\&$ fractals},
      volume       = {4},
      number       = {7},
      issn         = {0960-0779},
      address      = {Amsterdam [u.a.]},
      publisher    = {Elsevier Science},
      reportid     = {PUBDB-2017-09896},
      pages        = {1117 - 1139},
      year         = {1994},
      note         = {Theorie},
      abstract     = {In this paper we use a path-integral approach to represent
                      the Lyapunov exponents of both deterministic and stochastic
                      dynamical systems. In both cases the relevant correlation
                      functions are obtained from a (one-dimensional)
                      supersymmetric field theory whose Hamiltonian, in the
                      deterministic case, coincides with the Lie derivative of the
                      associated Hamiltonian flow. The generalized Lyapunov
                      exponents turn out to be related to the partition functions
                      of the respective super-Hamiltonian restricted to the spaces
                      of fixed form-degree.},
      cin          = {DESY(-2012)},
      ddc          = {510},
      cid          = {$I:(DE-H253)DESY_-2012_-20170516$},
      pnm          = {899 - ohne Topic (POF3-899)},
      pid          = {G:(DE-HGF)POF3-899},
      experiment   = {EXP:(DE-MLZ)NOSPEC-20140101},
      typ          = {PUB:(DE-HGF)16},
      UT           = {WOS:A1994PK89600001},
      doi          = {10.1016/0960-0779(94)90026-4},
      url          = {https://bib-pubdb1.desy.de/record/390841},
}