Properties of Solutions in 2+1 Dimensions

M. Hortacsu; H. T. Ozcelik; B. Yapiskan

arXiv:gr-qc/0302005·gr-qc·June 25, 2015

Properties of Solutions in 2+1 Dimensions

M. Hortacsu, H. T. Ozcelik, B. Yapiskan

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TL;DR

This paper analyzes solutions to Einstein's equations in 2+1 dimensions, calculating thermodynamic properties and Newman-Penrose coefficients for various cases with and without scalar fields.

Contribution

It provides new solutions and detailed thermodynamic and geometric analyses in 2+1 dimensional gravity with scalar fields.

Findings

01

Calculated entropy and Hawking temperature for different solutions.

02

Compared Newman-Penrose coefficients across solutions.

03

Analyzed emission probabilities in 2+1 dimensional spacetimes.

Abstract

We solve the Einstein equations for the 2+1 dimensions with and without scalar fields. We calculate the entropy, Hawking temperature and the emission probabilities for these cases. We also compute the Newman-Penrose coefficients for different solutions and compare them.

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