English

Limitations of some simple adiabatic quantum algorithms

Quantum Physics 2008-06-02 v2

Abstract

Let H(t)=(1t/T)H0+(t/T)H1H(t)=(1-t/T)H_0 + (t/T)H_1, t[0,T]t\in [0,T], be the Hamiltonian governing an adiabatic quantum algorithm, where H0H_0 is diagonal in the Hadamard basis and H1H_1 is diagonal in the computational basis. We prove that H0H_0 and H1H_1 must each have at least two large mutually-orthogonal eigenspaces if the algorithm's running time is to be subexponential in the number of qubits. We also reproduce the optimality proof of Farhi and Gutmann's search algorithm in the context of this adiabatic scheme; because we only consider initial Hamiltonians that are diagonal in the Hadamard basis, our result is slightly stronger than the original.

Keywords

Cite

@article{arxiv.quant-ph/0702241,
  title  = {Limitations of some simple adiabatic quantum algorithms},
  author = {Lawrence M. Ioannou and Michele Mosca},
  journal= {arXiv preprint arXiv:quant-ph/0702241},
  year   = {2008}
}

Comments

This work originally appeared in L. Ioannou's Master's thesis, submitted to the University of Waterloo, in 2002 (available at http://etheses.uwaterloo.ca/)