Emergent statistical mechanics of entanglement in random unitary circuits (1804.09737v2)

Abstract: We map the dynamics of entanglement in random unitary circuits, with finite on-site Hilbert space dimension $q$, to an effective classical statistical mechanics, and develop general diagrammatic tools for calculations in random unitary circuits. We demonstrate explicitly the emergence of a minimal membrane' governing entanglement growth, which in 1+1D is a directed random walk in spacetime (or a variant thereof). Using the replica trick to handle the logarithm in the definition of the $n$th R\'enyi entropy $S_n$, we map the calculation of the entanglement after a quench to a problem of interacting random walks. A key role is played by effective classical spins (taking values in a permutation group) which distinguish between different ways of pairing spacetime histories in the replicated system. For the second R\'enyi entropy, $S_2$, we are able to take the replica limit explicitly. This gives a mapping between entanglement growth and a directed polymer in a random medium at finite temperature (confirming Kardar-Parisi-Zhang (KPZ) scaling for entanglement growth in generic noisy systems). We find that the entanglement growth rate (speed') $v_n$ depends on the R\'enyi index $n$, and we calculate $v_2$ and $v_3$ in an expansion in the inverse local Hilbert space dimension, $1/q$. These rates are determined by the free energy of a random walk, and of a bound state of two random walks, respectively, and include contributions of energetic' andentropic' origin. We give a combinatorial interpretation of the Page-like subleading corrections to the entanglement at late times and discuss the dynamics of the entanglement close to and after saturation. We briefly discuss the application of these insights to time-independent Hamiltonian dynamics.

• The paper establishes a mapping between quantum entanglement dynamics in random unitary circuits and classical statistical mechanics models using permutation groups as effective spins.
• The study identifies a directed polymer in a random medium analogy, supporting that entanglement growth in noisy quantum systems follows KPZ scaling theory and can be computed via classical models.
• The research employs a replica trick to average quantities like Renyi entropy, decoding system randomness into a classical replica problem to analyze entropic and energetic contributions to entanglement growth.

Emergent Statistical Mechanics of Entanglement in Random Unitary Circuits

The paper "Emergent statistical mechanics of entanglement in random unitary circuits" provides a comprehensive examination of the dynamics of entanglement within random unitary circuits. It elucidates how the entanglement can be mapped to classical statistical mechanics models, offering a robust framework for understanding quantum many-body systems in non-equilibrium contexts. The analysis leverages classical spin configurations and replica tricks to handle complex entanglement measures, notably the R\'enyi entropy.

Key Insights

1. Mapping Quantum Dynamics to Classical Models: The paper establishes a mapping between quantum entanglement dynamics and effective classical statistical mechanics models through the use of permutation groups as effective spins. This mapping allows the derivation of essential quantities, such as the entanglement speed and line tension, which dictate the entanglement growth.
2. Directed Polymer Analogy: The paper identifies a directed polymer in a random medium analogy, corroborating that entanglement growth in noisy quantum systems follows the KPZ scaling theory. This analogy further enables the computation of entanglement growth rates through classical models, revealing universal behaviors across various system configurations.
3. Replica Trick: The research employs a replica trick to average quantities like the R\'enyi entropy, thereby decoding the system's randomness into a coherent classical replica problem. This methodology elucidates the entropic and energetic contributions to entanglement growth.
4. Entanglement Speed Calculation: Through expansions in the inverse of the local Hilbert space dimension (1/q), the paper computes the entanglement speeds $v_2$ and $v_3$. These speeds reflect the entanglement growth rate for distinct R\'enyi indices, showcasing the intricacies of entanglement dynamics beyond leading-order results.
5. Line Tension and Phase Transitions: The paper reveals the occurrence of a phase transition for entanglement membrane structures, illustrating how entanglement line tension varies with spatial constraints. Combinatorial mechanisms associated with domain wall labels are significant for understanding these transitions and their effects.

Implications and Future Directions

The research paves the way for future explorations into AI and computational physics, offering a clear parallel between quantum entanglement phenomena and classical statistical mechanics frameworks. The presented mappings provide a potent toolkit for simulating entanglement dynamics in complex systems. Potential developments include:

• Von Neumann Entropy Analysis: Extending the replica methodology to real-time analysis of von Neumann entropy, which could uncover additional quantum properties and behaviors specific to dynamical systems.
• Generalization Across Systems: Applying these findings to non-random systems with spatial randomness, which may reveal deeper insights into many-body entanglement beyond typical noise models.
• Exploration of Large R\'enyi Indices: A more detailed exploration of high R\'enyi indices could enrich our understanding of entanglement spectrum dynamics and its implications on quantum information theory.

In summary, this paper offers a solid step toward understanding the universal structures within quantum entanglement, using classical analogs for tractable analysis and insights into complex quantum systems.