Scaling Laws of Quantum Information Lifetime in Monitored Quantum Dynamics

Abstract: Quantum information is typically fragile under measurement and environmental coupling. Remarkably, we find that its lifetime can scale exponentially with system size when the environment is continuously monitored via mid-circuit measurements -- regardless of bath size. Starting from a maximally entangled state with a reference, we analytically prove this exponential scaling for typical Haar random unitaries and confirm it through numerical simulations in both Haar-random and chaotic Hamiltonian systems. In the absence of bath monitoring, the lifetime exhibits a markedly different scaling: it grows at most linearly -- or remains constant -- with system size and decays inversely with bath size. We further extend our findings numerically to a broad class of initial states. We discuss implications for monitored quantum circuits in the weak measurement limit, quantum algorithms such as quantum diffusion models and quantum reservoir computing, and quantum communication. Finally, we evaluate the feasibility of resolving the predicted scaling regimes experimentally via noisy simulations of IBM Quantum hardwares.