S. Habib Mazharimousavi scite author profile

Ordering ambiguity associated with the von Roos position dependent mass (PDM) Hamiltonian is considered. An affine locally scaled first order differential introduced, in Eq. (9), as a PDM-pseudo-momentum operator. Upon intertwining our Hamiltonian, which is the sum of the square of this operator and the potential function, with the von Roos d-dimensional PDM-Hamiltonian, we observed that the so-called von Roos ambiguity parameters are strictly determined, but not necessarily unique. Our new ambiguity parameters' setting is subjected to Dutra's and Almeida's [11] reliability test and classified as good ordering.

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5D black hole solution in Einstein-Yang-Mills-Gauss-Bonnet theory

Mazharimousavi

Halilsoy

2007

Phys. Rev. D

111

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2+1-dimensional electrically charged black holes in Einstein-power-Maxwell theory

2012

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A large family of new black hole solutions in 2 þ 1-dimensional Einstein-power-Maxwell gravity with prescribed physical properties is derived. We show with particular examples that according to the power parameter k of the Maxwell field, the obtained solutions may be asymptotically flat for 1=2 < k < 1 or nonflat for k > 1 in the vanishing cosmological constant limit. We study the thermodynamic properties of the solution with two different models, and it is shown that thermodynamic quantities satisfy the first law. The behavior of the heat capacity indicates that by employing the 1 þ 1-dimensional dilaton analogy the local thermodynamic stability is satisfied.

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Lovelock black holes with a power-Yang–Mills source

Mazharimousavi

Halilsoy

2009

Physics Letters B

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We consider the standard Yang-Mills (YM) invariant raised to the power q, i.e., (F (a) µν F (a)µν ) q as the source of our geometry and investigate the possible black hole solutions. How does this parameter q modify the black holes in Einstein-Yang-Mills (EYM) and its extensions such as Gauss-Bonnet (GB) and the third order Lovelock theories? The advantage of such a power q (or a set of superposed members of the YM hierarchies) if any, may be tested even in a free YM theory in flat spacetime. Our choice of the YM field is purely magnetic in any higher dimensions so that duality makes no sense. In analogy with the Einstein-power-Maxwell theory, the conformal invariance provides further reduction, albeit in a spacetime for dimensions of multiples of 4.

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