Lyapunov Exponent Approach to Phase Structure of Schwarzschild AdS Black Holes Surrounded by a Cloud of Strings

Abstract

We investigate Schwarzschild black holes in anti-de Sitter (AdS) spacetimes surrounded by a cloud of strings (BH-AdS-CoS), incorporating both electric- and magnetic-like components of the string bi-vector. Thermodynamically, these systems exhibit small/intermediate/large black hole phases with first- and second-order transitions governed by the string parameter c0. Dynamically, we probe the phase structure using Lyapunov exponents λ from unstable circular geodesics. For massless particles (δ = 0), analytical expressions λ reveal multivalued behavior in first-order transition regimes (c0 < ccri), with branches mapping to thermodynamic phases (λSBH, λIBH, λLBH). The discontinuity λ = λSBH - λLBH at Tp follows mean-field scaling: λ / λcri (Tcri - T)1/2 (β = 1/2). For massive particles (δ = 1), numerical computation of timelike geodesics confirms λ as an order parameter, with critical exponent β = 1/2 universally. Key distinctions emerge: λ 1 asymptotically for photons, while λ 0 in the significant black hole phase for massive particles due to vanishing unstable orbits. The transition of λ from multivalued to single-valued at c0 = ccri establishes it as a universal dynamical probe of black hole criticality. The universal critical exponent of 1/2 for \(λ\) further reinforces the analogy with conventional thermodynamic systems. Our results confirm a direct connection between the thermodynamic phase structure of BH-AdS-CoS and the dynamics of test particles, with the Lyapunov exponent emerging as a sensitive diagnostic of black hole criticality.