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arxiv: 2009.09096 · v1 · pith:64PZXORA · submitted 2020-09-18 · quant-ph · cs.NA· math.NA

Entanglement Properties of Quantum Superpositions of Smooth, Differentiable Functions

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classification quant-ph cs.NAmath.NA
keywords functionslargelow-rankquantumapproximationsdifferentiableentanglementmatrix
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We present an entanglement analysis of quantum superpositions corresponding to smooth, differentiable, real-valued (SDR) univariate functions. SDR functions are shown to be scalably approximated by low-rank matrix product states, for large system discretizations. We show that the maximum von-Neumann bipartite entropy of these functions grows logarithmically with the system size. This implies that efficient low-rank approximations to these functions exist in a matrix product state (MPS) for large systems. As a corollary, we show an upper bound on trace-distance approximation accuracy for a rank-2 MPS as $\Omega(\log N/N)$, implying that these low-rank approximations can scale accurately for large quantum systems.

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  1. Entanglement scaling in matrix product state representation of smooth functions and their shallow quantum circuit approximations

    quant-ph 2024-12 unverdicted novelty 6.0

    Derives rigorous entanglement scaling laws in MPS for smooth real or complex functions and applies them via tensor cross interpolation to construct and test shallow quantum encoding circuits on up to 156 qubits.