Litcius/Paper detail

Quantum complexity as hydrodynamics

Pablo Basteiro, Johanna Erdmenger, Pascal H. Fries, Florian Goth, Ioannis Matthaiakakis, René Meyer

2022Physical review. D/Physical review. D.27 citationsDOIOpen Access PDF

Abstract

As a new step toward defining complexity for quantum field theories, we map Nielsen operator complexity for $SU(N)$ gates to two-dimensional hydrodynamics. We develop a tractable large $N$ limit that leads to regular geometries on the manifold of unitaries as $N$ is taken to infinity. To achieve this, we introduce a basis of noncommutative plane waves for the $\mathfrak{su}(N)$ algebra and define a metric with polynomial penalty factors. Through the Euler-Arnold approach we identify incompressible inviscid hydrodynamics on the two-torus as a novel effective theory of large-qudit operator complexity. For large $N$, our cost function captures two essential properties of holographic complexity measures: ergodicity and conjugate points.

Topics & Concepts

PhysicsQuantumQuantum mechanicsTheoretical physicsClassical mechanicsStatistical physicsQuantum Mechanics and ApplicationsQuantum Information and CryptographyQuantum Computing Algorithms and Architecture