Periodically, Quasi-periodically, and Randomly Driven Conformal Field Theories: Part I

TL;DR

This paper develops a framework for analyzing non-equilibrium dynamics in 1+1D conformal field theories under periodic, quasi-periodic, and random driving, revealing complex phase structures, self-similar behaviors, and connections to quasi-crystals.

Contribution

It introduces a unified approach to study driven CFTs with various types of modulation, extending previous work and uncovering novel phenomena like Cantor set phases and Fibonacci time structures.

Findings

Non-heating phases form a measure-zero Cantor set.

Lyapunov exponents show self-similarity and can be arbitrarily small.

Heating phases exhibit Fibonacci-time periodicity and logarithmic growth.

Abstract

In this paper and its sequel, we study non-equilibrium dynamics in driven 1+1D conformal field theories (CFTs) with periodic, quasi-periodic, and random driving. We study a soluble family of drives in which the Hamiltonian only involves the energy-momentum density spatially modulated at a single wavelength. The resulting time evolution is then captured by a M\"obius coordinate transformation. In this Part I, we establish the general framework and focus on the first two classes. In periodically driven CFTs, we generalize earlier work and study the generic features of entanglement/energy evolution in different phases, i.e. the heating, non-heating phases and the phase transition between them. In quasi-periodically driven CFTs, we mainly focus on the case of driving with a Fibonacci sequence. We find that (i) the non-heating phases form a Cantor set of measure zero; (ii) in the heating phase, the Lyapunov exponents (which characterize the growth rate of the entanglement entropy and energy) exhibit self-similarity, and can be arbitrarily small; (iii) the heating phase exhibits periodicity in the location of spatial structures at the Fibonacci times; (iv) one can find exactly the non-heating fixed point, where the entanglement entropy/energy oscillate at the Fibonacci numbers, but grow logarithmically/polynomially at the non-Fibonacci numbers; (v) for certain choices of driving Hamiltonians, the non-heating phases of the Fibonacci driving CFT can be mapped to the energy spectrum of electrons propagating in a Fibonacci quasi-crystal. In addition, another quasi-periodically driven CFT with an Aubry-Andr\'e like sequence is also studied. We compare the CFT results to lattice calculations and find remarkable agreement.