Randomized Algorithms and Lower Bounds for Quantum Simulation

Abstract

We consider deterministic and randomized quantum algorithms simulating e-iHt by a product of unitary operators e-iAjtj, j=1,...,N, where Aj∈\H1,...,Hm\, H=Σi=1m Hi and tj > 0 for every j. Randomized algorithms are algorithms approximating the final state of the system by a mixed quantum state. First, we provide a scheme to bound the trace distance of the final quantum states of randomized algorithms. Then, we show some randomized algorithms, which have the same efficiency as certain deterministic algorithms, but are less complicated than their opponentes. Moreover, we prove that both deterministic and randomized algorithms simulating e-iHt with error at least have (t3/2-1/2) exponentials.