Design boosters: from constant-time quantum chaos to $\infty$-designs and beyond

TL;DR

This paper demonstrates that conditioning on measurements in quantum systems can enhance the randomness quality of quantum designs, especially in chaotic dynamics, revealing new mechanisms for generating high-quality quantum designs.

Contribution

It provides the first rigorous example of early-time chaos-induced boosting of quantum design quality and improves understanding of deep thermalization in quantum systems.

Findings

Early-time measurements can turn low-order designs into Haar-random ensembles.

Chaotic Hamiltonian dynamics can generate infinite-design states from constant-time evolution.

Design quality can degrade by half without specific initial state assumptions.

Abstract

We study a counterintuitive property of 'conditioning' on the result of measuring a subsystem of a quantum state: such conditioning can boost design quality, at the cost of increased system size. We work in the setting of deep thermalization from many-body physics: starting from a bipartite state on a global system $(A,B)$ drawn from a $k$-design, we measure system $B$ in the computational basis, keep the outcome and examine the state that remains in system $A$, approximating the overall ensemble (the 'projected ensemble') by a $k'$-design. We ask: how does the design quality change due to this procedure, or how does $k'$ compare to $k$? We give the first rigorous example of unitary dynamics generating a state such that, projection at very early (constant) times can boost design randomness. These dynamics are those of quantum chaos, modeled by the evolution of a Hamiltonian drawn from the Gaussian Unitary Ensemble (GUE). We show that, even though a state generated by such dynamics at constant time only forms a $k=\mathcal{O}(1)$ design, the projected ensemble is Haar-random (or a $k'=\infty$ design) in the thermodynamic limit (i.e. when $N_B=\infty$). This phenomenon persists even with weaker and more physically realistic assumptions; our results can be appropriately applied to non-GUE Hamiltonians that nevertheless show likely chaotic signatures in their eigenbases. Moreover, we show that with no assumption on how the global state was generated, a $k$-design experiences a degradation in design quality to $k' = \lfloor k/2 \rfloor$. This improves upon best prior results on the deep thermalization of designs. Together, our contributions argue for design boosting as a result of chaos and showcase a novel mechanism to generate good designs.