A 4D spacetime embedded in a 5D pseudo-Euclidean space describing interior of compact stars

dc.contributor.authorSingh, Ksh Newton
dc.contributor.authorMurad, Mohammad Hassan
dc.contributor.authorPant, Neeraj
dc.date.accessioned2018-02-14T07:13:46Z
dc.date.available2018-02-14T07:13:46Z
dc.date.issued2/1/2017
dc.descriptionThis article was published in the European Physical Journal A [ © 2017, SIF, Springer-Verlag Berlin Heidelberg. ] and the definite version is available at :http://doi.org/10.1140/epja/i2017-12210-1. The Journal's website is at: https://link.springer.com/article/10.1140%2Fepja%2Fi2017-12210-1
dc.description.abstractThe present paper provides a new model of compact stars satisfying the Karmarkar condition. The model is obtained by assuming a new type of metric potential for gr r from the condition of embedding class I. The model parameters are obtained accordingly by employing the metric potentials to Einstein's field equations. Our model is free from geometric singularity and satisfies all the physical conditions. The obtained mass and radius of the compact stars Cen X-3, EXO 1785-248 and SAX 1808.4-3658 obtained from the model are consistent with the observational data of T. Gangopadhyay et al. Detailed analyses of these neutron stars (Cen X-3, EXO 1785-248 and SAX 1808.4-3658) are also given with the help of graphical representations.
dc.identifier.citationSingh, K. N., Murad, M. H., & Pant, N. (2017). A 4D spacetime embedded in a 5D pseudo-euclidean space describing interior of compact stars. European Physical Journal A, 53(2)10.1140/epja/i2017-12210-1
dc.identifier.otherhttps://dspace.bracu.ac.bd/server/api/core/items/2b4546da-d9ab-44a8-bb9a-c8248ab1b1b4
dc.identifier.urihttp://hdl.handle.net/10361/9462
dc.language.isoen
dc.publisher© 2017, Springer New York LLC
dc.sourceBRAC University Institutional Repository
dc.subjectCompact stars
dc.subject4D spacetime
dc.subject5D pseudo-euclidean space
dc.titleA 4D spacetime embedded in a 5D pseudo-Euclidean space describing interior of compact stars
dc.typeArticle

Files

Collections