English

Minimum Trotterization Formulas for a Time-Dependent Hamiltonian

Quantum Physics 2023-11-08 v4 Mathematical Physics math.MP

Abstract

When a time propagator eδtAe^{\delta t A} for duration δt\delta t consists of two noncommuting parts A=X+YA=X+Y, Trotterization approximately decomposes the propagator into a product of exponentials of XX and YY. Various Trotterization formulas have been utilized in quantum and classical computers, but much less is known for the Trotterization with the time-dependent generator A(t)A(t). Here, for A(t)A(t) given by the sum of two operators XX and YY with time-dependent coefficients A(t)=x(t)X+y(t)YA(t) = x(t) X + y(t) Y, we develop a systematic approach to derive high-order Trotterization formulas with minimum possible exponentials. In particular, we obtain fourth-order and sixth-order Trotterization formulas involving seven and fifteen exponentials, respectively, which are no more than those for time-independent generators. We also construct another fourth-order formula consisting of nine exponentials having a smaller error coefficient. Finally, we numerically benchmark the fourth-order formulas in a Hamiltonian simulation for a quantum Ising chain, showing that the 9-exponential formula accompanies smaller errors per local quantum gate than the well-known Suzuki formula.

Cite

@article{arxiv.2212.06788,
  title  = {Minimum Trotterization Formulas for a Time-Dependent Hamiltonian},
  author = {Tatsuhiko N. Ikeda and Asir Abrar and Isaac L. Chuang and Sho Sugiura},
  journal= {arXiv preprint arXiv:2212.06788},
  year   = {2023}
}

Comments

15 pages, 5 figure

R2 v1 2026-06-28T07:32:52.845Z