Add to ORKGQuantum complexity of CFT states can be computed holographically from the dual gravitational solutions. In this paper, we have studied the late time growth of holographic complexity of a charged black hole in five-dimensional, Anti-de Sitter spacetime in the presence of quartic derivative interaction terms using the Complexity = Action conjecture. These interaction terms in the gravitational action can lead to the violation of Llyod's bound. The dual CFT is known to admit a hydrodynamic description where the KSS bound is also violated due to the presence of higher derivative terms in the bulk action. The origin of terms which violate both the bounds are the same for the gravitational action of consideration. We have also discussed the late ...
In the presence of a scalar hair perturbation, the Cauchy horizon of a Reissner-Nordström black hole...
Abstract We study the holographic complexity of Einstein-Maxwell-Dilaton gravity using the recently ...
In this paper, we use the “complexity equals action” (CA) conjecture to evaluate the holographic com...
Abstract We revisit the complexity = action proposal for charged black holes. We investigate the com...
The Einstein-Maxwell-Axion-Dilaton (EMAD) theories, based on the Gubser-Rocha (GR) model, are very i...
Abstract We evaluate the full time dependence of holographic complexity in various eternal black hol...
Abstract The “complexity = action” duality states that the quantum complexity is equal to the action...
In the presence of a scalar hair perturbation, the Cauchy horizon of a Reissner-Nordstr\"om black ho...
The Einstein–Maxwell–Axion–Dilaton (EMAD) theories, based on the Gubser–Rocha (GR) model, are very i...
Our earlier paper “Complexity Equals Action” conjectured that the quantum computational complexity o...
In this paper, we use Born–Infeld black holes to test two recent holographic conjectures of complexi...
International audienceWe analyze different holographic complexity proposals for black holes that inc...
International audienceWe analyze different holographic complexity proposals for black holes that inc...
Abstract In this paper, we use Born–Infeld black holes to test two recent holographic conjectures of...
Abstract We study the holographic “complexity = action” (CA) and “complexity = volume” (CV) proposal...
In the presence of a scalar hair perturbation, the Cauchy horizon of a Reissner-Nordström black hole...
Abstract We study the holographic complexity of Einstein-Maxwell-Dilaton gravity using the recently ...
In this paper, we use the “complexity equals action” (CA) conjecture to evaluate the holographic com...
Abstract We revisit the complexity = action proposal for charged black holes. We investigate the com...
The Einstein-Maxwell-Axion-Dilaton (EMAD) theories, based on the Gubser-Rocha (GR) model, are very i...
Abstract We evaluate the full time dependence of holographic complexity in various eternal black hol...
Abstract The “complexity = action” duality states that the quantum complexity is equal to the action...
In the presence of a scalar hair perturbation, the Cauchy horizon of a Reissner-Nordstr\"om black ho...
The Einstein–Maxwell–Axion–Dilaton (EMAD) theories, based on the Gubser–Rocha (GR) model, are very i...
Our earlier paper “Complexity Equals Action” conjectured that the quantum computational complexity o...
In this paper, we use Born–Infeld black holes to test two recent holographic conjectures of complexi...
International audienceWe analyze different holographic complexity proposals for black holes that inc...
International audienceWe analyze different holographic complexity proposals for black holes that inc...
Abstract In this paper, we use Born–Infeld black holes to test two recent holographic conjectures of...
Abstract We study the holographic “complexity = action” (CA) and “complexity = volume” (CV) proposal...
In the presence of a scalar hair perturbation, the Cauchy horizon of a Reissner-Nordström black hole...
Abstract We study the holographic complexity of Einstein-Maxwell-Dilaton gravity using the recently ...
In this paper, we use the “complexity equals action” (CA) conjecture to evaluate the holographic com...