Abstract
It has been suggested that a possible classical remnant of the phenomenon of target-space duality (T-duality) would be the equivalence of the classical string Hamiltonian systems. Given a simple compact Lie groupG with a bi-invariant metric and a generating function Γ suggested in the physics literature, we follow the above line of thought and work out the canonical transformation Φ generated by Γ together with an Ad-invariant metric and a B-field on the associated Lie algebra\(\mathfrak{g}\) ofG so thatG and\(\mathfrak{g}\) form a string target-space dual pair at the classical level under the Hamiltonian formalism. In this article, some general features of this Hamiltonian setting are discussed. We study properties of the canonical transformation Φ including a careful analysis of its domain and image. The geometry of the T-dual structure on\(\mathfrak{g}\) is lightly touched. We leave the task of tracing back the Hamiltonian formalism at the quantum level to the sequel of this paper.
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[A-AG-B-L] Alvarez, E., Alvarez-Gaumé, L., Barbón, J., Lozano, Y.: Some global aspects of duality in string theory. Nucl. Phys.B415, 71–100 (1994), hep-th/9309039
[A-AG-L1] Alvarez, E., Alvarez-Gaumé, L., Lozano, Y.: On Non-abelian Duality. Nucl. Phys.B424, 155–183 (1994), hep-th/9403155
[A-AG-L2] Alvarez, E., Alvarez-Gaumé, L., Lozano, Y.: A canonical approach to duality transformations. Phys. Lett.B336, 183–189 (1994), hep-th/9406206
[A-G-M] Aspinwall, P.S., Greene, B.R., Morrison, D.: Space-time topology change and stringy geometry. J. Math. Phys.35, 5321–5337 (1994)
[A-M] Abraham, R., Marsden, J.E.: Foundations of mechanics. 2nd ed., Benjamin/Cummings Publ., 1978
[Ar] Arnold, V.I.: Mathematical methods of classical mechanics. 2nd ed., GTM 60, Berlin, Heidelberg, New York: Springer, 1989
[B1] Buscher, T.H.: A symmetry of the string background field equations. Phys. Lett.194B, 59 (1987)
[B2] Buscher, T.H.: Path integral derivation of quantum duality in nonlinear sigma models. Phys. Lett.201B, 466 (1988)
[C-E] Cheeger, J., Ebin, D.: Comparison theorems in Riemannian geometry. Amsterdam: North-Holland, 1975
[C-Z] Curtright, T., Zachos, C.: Currents, charges, and canonical structure of pseudodual chiral models. Phys. Rev.D49, 5408–5421 (1994)
[dlO-Q] de la Ossa, X., Quevedo, F.: Duality symmetries from nonabelian isometries in string theory. Nucl. Phys.B403, 377 (1993), hep-th/9210021
[E-G-R-S-V] Elitzur, S., Giveon, A., Rabinovici, E., Schwimmer, A., Veneziano, G.: Remarks on nonabelian duality. Nucl. Phys.B435, 147–171 (1995), hep-th/9409011
[F-J] Fridling, B.E., Jevicki, A.: Dual representations and ultraviolet divergences in nonlinear sigma models. Phys. Lett.134B, 70 (1984)
[G-R-V] Gasperini, M., Ricci R., Veneziano, G.: A problem with nonabelian duality? Phys. Lett.B319, 43 (1993), hep-th/9308112
[G-K] Giveon, A., Kiritsis, E.: Axial vector duality as a gauge symmetry and topology change in string theory. Nucl. Phys.B411, 487 (1994), hep-th/9303016
[G-P-K] Giveon, A., Porrati, M., Rabinovici, E.: Target space duality in string theory. Phys. Reports244, 77–202 (1994), hep-th/9401139
[G-R-V] Giveon, A., Rabinovici, E., Veneziano, G.: Duality in string background space. Nucl. Phys.B322, 167 (1989)
[G-R1] Giveon, A., Roček, M.: Generalized duality in curved string backgrounds. Nucl. Phys.B380, 128 (1992), hep-th/9112070
[G-R2] Giveon, A., Roček, M.: On Nonabelian Duality. Nucl. Phys.B421, 173 (1994), hep-th/9308154
[G-R3] Giveon A., Roček, M.: Introduction to duality. hep-th/9406178
[Gr] Gromov, M.: Structures métrique pour les variétés riemanniennes. rédigé par J. Lafontaine et P. Pansu, Text Math. no. 1, Paris: Cedic/Fernand-Nathan, 1980.
[He] Helgason, S.: Differential geometry, Lie groups and symmetric spaces. New York: Academic Press 1978
[K-S1] Klimčík, C., Ševera, P.: Strings in spacetime cotangent bundle and T-duality. hep-th/9411003
[K-S2] Klimčík, C., Ševera, P.: Dual and non-abelina duality and the Drinfeld double. hep-th/9502122
[Lo] Lozano, Y.: Non-abelian duality and canonical transformation. hep-th/9503045
[M-V] Meissner K.A., Veneziano, G.: Symmetries of cosmological superstring vacua. Phys. Lett.B267, 33 (1991)
[Mi] Mickelsson, J.: Current algebras and groups. London: Plenum Press, 1989
[P-S] Pressley, A., Segal, G.: Loop groups. Oxford: Clarendon Press, 1990
[R-V] Roček, M., Verlinde, E.: Duality, quotients, and currents. Nucl. Phys.B373, 630 (1992) hep-th/9110053
[Sa] Samelson, H.: Notes an Lie algebras. Berlin, Heidelberg, New York: Springer, 1990
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Communicated by R.H. Dijkgraaf
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Alvarez, O., Liu, CH. Target-space duality between simple compact Lie groups and Lie algebras under the Hamiltonian formalism: I. Remnants of duality at the classical level. Commun.Math. Phys. 179, 185–213 (1996). https://doi.org/10.1007/BF02103719
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DOI: https://doi.org/10.1007/BF02103719