From Black Strings to Fundamental Strings: Non-uniformity and Phase Transitions

Abstract

We discuss the transition between black strings and fundamental strings in the presence of a compact dimension, S1z. In particular, we study the Horowitz-Polchinski effective field theory in Rd×S1z, with a reduction on the Euclidean time circle Sτ1. The classical solution of this theory describes a bound state of self-gravitating strings, known as a ``string star'', in Lorentzian spacetime. By analyzing non-uniform perturbations to the uniform solution, we identify the critical mass at which the string star becomes unstable towards non-uniformity along the spatial circle (i.e., Gregory-Laflamme instability) and determine the order of the associated phase transition. For 3 d<4, we argue that at the critical mass, the uniform string star can transition into a localized black hole. More generally, we describe the sequence of transitions from a large uniform black string as its mass decreases, depending on the value of d. Additionally, using the SL(2)k/U(1) model in string theory, we show that for sufficiently large d, the uniform black string is stable against non-uniformity before transitioning into fundamental strings. We also present a novel solution that exhibits double winding symmetry breaking in the asymptotically Rd×S1τ×S1z Euclidean spacetime.

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