Publications [#378599] of Yu Tong

Papers Published

1. Lin, L; Tong, Y, Optimal polynomial based quantum eigenstate filtering with application to solving quantum linear systems, Quantum, vol. 4 (November, 2020), pp. 361-361, Verein zur Forderung des Open Access Publizierens in den Quantenwissenschaften [doi]
   (last updated on 2024/10/18)

   Abstract:
   We present a quantum eigenstate filtering algorithm based on quantum signal processing (QSP) and minimax polynomials. The algorithm allows us to efficiently prepare a target eigenstate of a given Hamiltonian, if we have access to an initial state with non-trivial overlap with the target eigenstate and have a reasonable lower bound for the spectral gap. We apply this algorithm to the quantum linear system problem (QLSP), and present two algorithms based on quantum adiabatic computing (AQC) and quantum Zeno effect respectively. Both algorithms prepare the final solution as a pure state, and achieves the near optimal??O~(dκlog⁡(1/ϵ))query complexity for a??d-sparse matrix, where??κis the condition number, and??ϵis the desired precision. Neither algorithm uses phase estimation or amplitude amplification.