I. P. Costa e Silva scite author profile

I. P. Costa e Silva

4Publications

22Citation Statements Received

157Citation Statements Given

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157

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Universidade Federal de Santa Catarina

Publications

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A novel notion of null infinity for c-boundaries and generalized black holes

Silva

Flores

Herrera

2018

J. High Energ. Phys.

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We give new definitions of null infinity and black hole in terms of causal boundaries, applicable to any strongly causal spacetime (M, g). These are meant to extend the standard ones given in terms of conformal boundaries, and use the new definitions to prove a classic result in black hole theory for this more general context: if the null infinity is regular (i.e. well behaved in a suitable sense) and (M, g) obeys the null convergence condition, then any closed trapped surface in (M, g) has to be inside the black hole region. As an illustration of this general construction, we apply it to the class of generalized plane waves, where the conformal null infinity is not always welldefined. In particular, it is shown that (generalized) black hole regions do not exist in a large family of these spacetimes.

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Rigidity of geodesic completeness in the Brinkmann class of gravitational wave spacetimes

Silva

Flores

Herrera

2018

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We consider restrictions placed by geodesic completeness on spacetimes possessing a null parallel vector field, the so-called Brinkmann spacetimes. This class of spacetimes includes important idealized gravitational wave models in General Relativity, namely the plane-fronted waves with parallel rays, or pp-waves, which in turn have been intensely and fruitfully studied in the mathematical and physical literatures for over half a century. More concretely, we prove a restricted version of a conjectural analogue for Brinkmann spacetimes of a rigidity result obtained by M.T. Anderson for stationary spacetimes. We also highlight its relation with a longstanding 1962 conjecture by Ehlers and Kundt. Indeed, it turns out that the subclass of Brinkmann spacetimes we consider in our main theorem is enough to settle an important special case of the Ehlers-Kundt conjecture in terms of the well known class of Cahen-Wallach spaces.

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Some Remarks on Conformal Symmetries and Bartnik’s Splitting Conjecture

2019

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Inspired by the results in a recent paper by G. Galloway and C. Vega [11], we investigate a number of geometric consequences of the existence of a timelike conformal Killing vector field on a globally hyperbolic spacetime with compact Cauchy hypersurfaces, especially in connection with the so-called Bartnik's splitting conjecture. In particular we give a complementary result to the main theorem in [11].

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A Study in Stationary: Geometric Properties of Stationary Regions and Regularity of Their Horizons

Silva

2017

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I. P. Costa e Silva

A novel notion of null infinity for c-boundaries and generalized black holes

Rigidity of geodesic completeness in the Brinkmann class of gravitational wave spacetimes

Some Remarks on Conformal Symmetries and Bartnik’s Splitting Conjecture

A Study in Stationary: Geometric Properties of Stationary Regions and Regularity of Their Horizons

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