Deformation and the Complexity=Volume Conjecture
Hao Geng
Abstract
Abstract Complexity in quantum physics measures how difficult a state can be reached from a reference state and more precisely it is the number of fundamental unitary gates we have to operate to transform the reference state to the state we are considering. In the holographic context, based on several explicit calculations and arguments, it is conjectured that certain bulk volume calculates the boundary field theory subregion complexity. In this paper, we will show that the deformation shows a strong signal of the correctness of this complexity equals volume conjecture. A bonus is a way to look at the deformation, by its reversibility, as operating a unitary quantum circuit which prepares states in quantum field theory.
Topics & Concepts
Unitary stateState (computer science)CorrectnessMathematicsConjectureBoundary (topology)Quantum stateDeformation (meteorology)Field (mathematics)QuantumPhysicsQuantum operationQuantum field theoryQuantum mechanicsQuantum informationBoundary value problemQuantum circuitVolume (thermodynamics)Theoretical physicsQuantum channelQuantum gateQuantum error correctionMathematical analysisHolographyQuantum computerQuantum Computing Algorithms and ArchitectureQuantum many-body systemsMarkov Chains and Monte Carlo Methods