Concurrent π-vector fields and energy β-change
Int. J. Geom. Meth. Mod. Phys. • 2009
Publication Information
Authors
Nabil L. Youssef, S. H. Abed and A. Soleiman
Keywords
Special Finsler space; Pullback bundle; Energy β-change; Concurrent π- vector field; Canonical spray; Barthel connection; Cartan connection; Berwald connection; Chern connection; Hashiguchi connection.
Journal
Int. J. Geom. Meth. Mod. Phys.
Publisher
Not Available
Volume
6
Issue
6
Pages
1003–1031
publication.type
International
Paper Link
Not Available
Supplementary Materials
Not Available
Abstract
The present paper deals with an intrinsic investigation of the notion of a concurrent π-vector field on the pullback bundle of a Finsler manifold (M, L). The effect of the existence of a concurrent π-vector field on some important special Finsler spaces is studied. An intrinsic investigation of a particular β-change, namely the energy β-change is established. The relation between the two Barthel connections Γ and ~Γ, corresponding to this change, is found. This relation, together with the fact that the Cartan and the Barthel connections have the same horizontal and vertical projectors, enable us to study the energy β-change of the fundamental linear connection in Finsler geometry: the Cartan connection, the Berwald connection, the Chern connection and the Hashiguchi connection. Moreover, the change of their curvature tensors is concluded. It should be pointed out that the present work is formulated in a prospective modern coordinate-free form.
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