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arxiv: 2402.07809 · v1 · pith:7G4ZVQEPnew · submitted 2024-02-12 · 🪐 quant-ph · cs.DS· math.PR

Quantum walks, the discrete wave equation and Chebyshev polynomials

classification 🪐 quant-ph cs.DSmath.PR
keywords quantumwalkwalksrandomchebyshevdiscretedynamicsequation
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A quantum walk is the quantum analogue of a random walk. While it is relatively well understood how quantum walks can speed up random walk hitting times, it is a long-standing open question to what extent quantum walks can speed up the spreading or mixing rate of random walks on graphs. In this expository paper, inspired by a blog post by Terence Tao, we describe a particular perspective on this question that derives quantum walks from the discrete wave equation on graphs. This yields a description of the quantum walk dynamics as simply applying a Chebyshev polynomial to the random walk transition matrix. This perspective decouples the problem from its quantum origin, and highlights connections to earlier (non-quantum) work and the use of Chebyshev polynomials in random walk theory as in the Varopoulos-Carne bound. We illustrate the approach by proving a weak limit of the quantum walk dynamics on the lattice. This gives a different proof of the quadratically improved spreading behavior of quantum walks on lattices.

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Cited by 2 Pith papers

Reviewed papers in the Pith corpus that reference this work. Sorted by Pith novelty score.

  1. Quantum Fast-Forwarding Beyond Reversibility: The $\alpha$-Perturbed $n$-Cycle

    quant-ph 2026-06 unverdicted novelty 6.0

    Exact Chebyshev QFF does not extend to the α-perturbed n-cycle for α ≠ 0 due to eigenvalues outside [-1,1], but a truncated-Chebyshev LCU approximation achieves degree O(|α|t + √(t log(t/η))) that recovers the reversi...

  2. Quantum Fast-Forwarding Beyond Reversibility: The $\alpha$-Perturbed $n$-Cycle

    quant-ph 2026-06 unverdicted novelty 5.0

    Exact Chebyshev-based quantum fast-forwarding does not extend beyond reversible Markov chains, but a truncated Chebyshev plus LCU approximation works for the α-perturbed n-cycle with degree O(|α|t + sqrt(t log(t/η))).