Einstein warped product spaces on Lie groups
Abstract We consider a compact Lie group with bi-invariant metric, coming from the Killing form. In this paper, we study Einstein warped product space, M = M1× f1 M2 for the cases, (i) M1 is a Lie group (ii) M2 is a Lie group and (iii) both M1 and M2 are Lie groups. Moreover, we obtain the conditions for an Einstein warped product of Lie groups to become a simple product manifold. Then, we characterize the warping function for generalized Robertson-Walker spacetime, (M = I ×f 1 G2, −dt 2 + f 1 2 g2 whose fiber G2, being semi-simple compact Lie group of dim G2 > 2, having bi-invariant metric, coming from the Killing form.
Main Authors: | , , |
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Format: | Digital revista |
Language: | English |
Published: |
Universidad de La Frontera. Departamento de Matemática y Estadística.
2022
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Online Access: | http://www.scielo.cl/scielo.php?script=sci_arttext&pid=S0719-06462022000300485 |
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Summary: | Abstract We consider a compact Lie group with bi-invariant metric, coming from the Killing form. In this paper, we study Einstein warped product space, M = M1× f1 M2 for the cases, (i) M1 is a Lie group (ii) M2 is a Lie group and (iii) both M1 and M2 are Lie groups. Moreover, we obtain the conditions for an Einstein warped product of Lie groups to become a simple product manifold. Then, we characterize the warping function for generalized Robertson-Walker spacetime, (M = I ×f 1 G2, −dt 2 + f 1 2 g2 whose fiber G2, being semi-simple compact Lie group of dim G2 > 2, having bi-invariant metric, coming from the Killing form. |
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