Research Papers in Conference Proceedings:
22. L. Fehér and I.
Marshall, On the bi-Hamiltonian structure of the trigonometric spin Ruijsenaars--Sutherland hierarchy, a pp. 75-87 in: Geometric Methods
in Physics XXXVIII,
eds.
P. Kielanowski et al (Birkhauser,
2020).
21. L.Fehér, An application of the
reduction method to Sutherland type many-body systems, pp. 109-117 in:
Geometric Methods in Physics XXXI, eds. P. Kielanowski
et al (Birkhauser, 2013).
20. L.Fehér and C. Klimcik, The Ruijsenaars self-duality map as a mapping class symplectomorphism, pp. 423-437 in: Lie Theory and Its
Applications in Physics, IX International Workshop, ed. V. Dobrev (Springer,
2013).
19. L. Fehér, Dynamical
r-matrices and Poisson-Lie symmetries in the chiral WZNW model, JHEP
Proceedings, PoS(unesp2002)012 (2002).
18. L. Fehér and A. Gábor, Interpretations and constructions of dynamical
r-matrices, pp. 331-336, in: Quantum Theory and
Symmetries, eds. E. Kapuscik et al (World
Scientific, 2002).
17. L. Fehér, Dynamical
r-matrices and the chiral WZNW phase space, Phys. Atomic Nuclei 65, no. 6,
1023-1027 (2002).
16. L. Fehér and B.G. Pusztai, Dynamical r-matrices on the affinizations of
arbitrary self-dual Lie algebras, Czech. J. Phys. 51, 1318-1324 (2001).
15. J. Balog, L. Fehér and
L. Palla, On the chiral WZNW phase space, exchange
r-matrices and Poisson-Lie groupoids, pp. 1-19, in: CRM Proceedings and
Lectures Notes, 26, eds. J. Harnad et al (AMS, 2000).
14. L. Fehér and B.G. Pusztai, On the classical r-matrix of the degenerate Calogero-Moser models, Czech. J. Phys. 50, 59-65 (2000).
13. L. Fehér, Wakimoto realizations of current and exchange algebras,
Czech. J. Phys. 48, 1325-1330 (1998).
12. F. Delduc,
L. Fehér and L. Gallot, Integrable hierarchies in the
Drinfeld-Sokolov approach, pp. 251-253, in: Proc. of
the 5th Wigner Symposium, eds. P. Kasperkovitz et al
(World Scientific, 1998).
11. L. Fehér, KdV type systems and W-algebras in the Drinfeld-Sokolov
approach, in: Proc. of the Marseille 1995 Conference on W-Symmetry, hep-th/9510001.
10. L. Fehér and I.
Tsutsui, Global aspects of the WZNW reduction to Toda theories, Prog. Theor. Phys. Supplement 118, 173-190 (1995).
9. L. Fehér and I. Tsutsui,
Global aspects of the WZNW reduction to Liouville theory, pp. 483-486, in:
Group Theoretical Methods in Physics, eds. A. Arima et al (World Scientific,
1995).
8. L. Fehér, Generalized Drinfeld-Sokolov hierarchies and W-algebras, pp. 71-82, in:
Quantum Groups, Integrable Models and Statistical Systems, eds. J. LeTourneux et al (World Scientific, 1993).
7. L. Fehér, W-Algebras of
generalized Toda theories, pp. 255-272, in: A.D. Sakharov Memorial Lectures in
Physics, eds. L.V. Keldysh et al (Nova Science
Publishers, 1992).
6. J. Balog, L. Dabrowski and L. Fehér, Nonstandard Quantum group in Toda
and WZNW theories, pp. 279-293, in: Nonperturbative Methods in Low Dimensional
Quantum Field Theories, eds. G. Domokos et al (World Scientific, 1991).
5. L. Fehér and P. A. Horváthy, Particle in a self-dual monopole field, pp.
130-137, in: Differential Geometric Methods in Theoretical Physics, ed. A. I.
Solomon (World Scientific, 1989).
4. L. Fehér, P. A. Horváthy and L. O'Raifeartaigh,
Dynamical (super-) symmetries of a self-dual monopole, pp. 525-529, in:
Symmetries in Science III, eds. B. Gruber et al (Plenum, 1989).
3. L. Fehér and P. A. Horváthy, Dynamical symmetry of the Kaluza-Klein
monopole, pp. 399-417, in: Symmetries in Science III, eds. B. Gruber et al
(Plenum, 1989).
2. L. Fehér, Dynamical
symmetries of the Kaluza-Klein monopole, pp. 215-224,
in: Relativity Today, ed. Z. Perjés (World
Scientific, 1988).
1. L. Fehér, Dynamical O(4) symmetry in long range monopole-test particle and
monopole-monopole interactions, pp. 15-38, in: Nonperturbative Methods in
Quantum Field Theory, eds. Z. Horváth et al (World
Scientific, 1987).