[1] G. B. Folland, Weyl manifolds, J. Differential Geometry 4 (1970),
145-153.
[2] L. Kadosh, Topics in Weyl Geometry, Dissertationial, University of
California, 1996.
[3] K. Sluka, Properties of the Weyl conformal curvature of
Kähler-Norden manifolds, Steps in Differential Geometry, Proceedings
of the Colloquium on Differential Geometry (2000), 25-30.
[4] I. Antoniou and G. P. Pronko, On the Hamiltonian description of
fluid mechanics, (2001), 1-24.
[5] P. Gilkey and S. Nikčević, Kähler-Weyl manifolds of dimension
4, http://arxiv.org/pdf/1109.4532.pdf, (2011), 1-10.
[6] P. Gilkey and S. Nikčević, 4-dimensional (para)-Kähler-Weyl
structures, http://arxiv.org/abs/1210.6769, (2012), 1-8.
[7] M. Brozos-Vázquez, E. Garia-Rio, P. Gilkey and R.
Vázquez-Lorenzo, Homogeneous 4-dimensional Kähler-Weyl structures,
Results. Math. 64 (2013), 357-369.
[8] W. Jelonek, Compact conformally Kähler Einstein-Weyl manifolds,
Ann. Glob. Anal. Geom. 43 (2013), 19-29.
[9] Z. Kasap and M. Tekkoyun, Mechanical systems on almost
para/pseudo-Kähler-Weyl manifolds, IJGMMP 10(5) (2013), 1-8.
[10] Z. Kasap, Weyl-mechanical systems on tangent manifolds of
constant W-sectional curvature, IJGMMP 10(10) (2013), 1-13.
[11] Z. Kasap, Weyl-Euler-Lagrange equations of motion on flat
manifold, Advances in Mathematical Physics (2015), 1-11.
[12] H. Weyl, Space-Time-Mattee, Dover Publ., 1922.
[13] P. Gilkey, S. Nikcević and U. Simon, Geometric realizations,
curvature decompositions and Weyl manifolds, J. Geom. Phys. 61 (2011),
270-275.
[14] http://en.wikipedia.org/wiki/Conformal_class.
[15] W. Ballmann, Lectures on Kähler Manifolds, ESI Lectures in
Mathematics and Physics, 2006.
[16] P. Gilkey and S. Nikčević, Kähler and para-Kähler, curvature
Weyl manifolds, arXiv:1011.4844v1, (2010).
[17] R. Miron, D. Hrimiuc, H. Shimada and S. V. Sabau, The Geometry of
Hamilton and Lagrange Spaces, FTPH 118, Kluwer Acad. Publ., 2001.
[18] P. Gilkey and S. Nikčević, Kähler and para-Kähler curvature
Weyl manifolds, arXiv:1011.4844v1. 2010.
[19] J. Klein, Escapes variationnels et mécanique, Ann. Inst.
Fourier, Grenoble 12 (1962), 1-124.
[20] M. de Leon and P. R. Rodrigues, Methods of differential geometry
in analytical mechanics, Elsevier Sc. Pub. Com. Inc., Amsterdam,
(1989), 263-397.
[21] B. Thidé, Electromagnetic field theory, (2012).
[22] R. G. Martín, Electromagnetic Field Theory for Physicists and
Engineers: Fundamentals and Applications, Asignatura:
Electrodinámica, Físicas, Granada, 2007.