Yazar "Delice, Özgür" için listeleme
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Brans-Dicke-Maxwell solutions for higher dimensional static cylindrical symmetric spacetime
Çiftçi, Dilek K.; Delice, Özgür (Amer Inst Physics, 2015)In this paper, Brans-Dicke-Maxwell type vacuum solutions are considered for a static cylindrically symmetric spacetime in arbitrary dimensions. Exact solutions are obtained by directly solving the field equations for the ... -
Cylindrically symmetric vacuum solutions in higher dimensional Brans-Dicke theory
Baykal, Ahmet; Çiftçi, Dilek K.; Delice, Özgür (Amer Inst Physics, 2010)Higher dimensional, static, cylindrically symmetric vacuum solutions with and without a cosmological constant in the Brans-Dicke theory are presented. We show that for a negative cosmological constant and for specific ... -
Higher dimensional cylindrical or Kasner type electrovacuum solutions
Delice, Özgür; Kirezli, Pınar; Çiftçi, Dilek K. (Springer/Plenum Publishers, 2013)We consider a dimensional Kasner type diagonal spacetime where metric functions depend only on a single coordinate and electromagnetic field shares the symmetries of spacetime. These solutions can describe static cylindrical ... -
Some Properties of Magnetized Bonnor-Dihole Solution in Brans-Dicke Theory
Kirezli, Pınar; Delice, Özgür (Amer Inst Physics, 2017)Soule properties of magnetized Bonnor-dihole solution in Brans Dicke(BD) theory is discussed. Conical deficit angle and equatiorial geodesics of (jawlike and null particles are investigated in detail for different values ... -
Static Weyl type solutions of the Brans-Dicke theory
Kirezli, Pınar; Delice, Özgür (American Institute of Physics Inc., 2016)Static, axially symmetric Weyl type solutions and their properties are studied in the Brans-Dicke (BD) theory. The new solutions are obtained for the general Weyl solutions, two particle Chazy-Curzon solution and ... -
Stationary axially symmetric solutions in Brans-Dicke theory
Kirezli, Pınar; Delice, Özgür (Amer Physical Soc, 2015)Stationary, axially symmetric Brans-Dicke-Maxwell solutions are reexamined in the framework of the Brans-Dicke (BD) theory. We see that, employing a particular parametrization of the standard axially symmetric metric ...