English

Equilibrium Value Method for the Proof of QIP=PSPACE

Quantum Physics 2011-03-15 v4 Computational Complexity

Abstract

We provide an alternative proof of \class{QIP}=\class{PSPACE} to the recent breakthrough result. Unlike solving some semidefinite programs that captures the computational power of quantum interactive proofs, our method starts with one \class{QIP}-Complete problem which computes the diamond norm between two admissible quantum channels. The key observation is that we can convert the computation of the diamond norm into the computation of some equilibrium value. The later problem, different from the former semidefinite programs, is of better form, easier to solve and could be interesting for its own sake. The multiplicative weight update method is also applied to solve the equilibrium value problem, however, in a relatively simpler way than the one in the original proof. As a direct byproduct, we also provide a NC algorithm to compute the diamond norm of a class of quantum channels. Furthermore, we provide a generalized form of equilibrium value problems that can be solved in the same way as well as comparisons to semidefinite programs.

Cite

@article{arxiv.1004.0264,
  title  = {Equilibrium Value Method for the Proof of QIP=PSPACE},
  author = {Xiaodi Wu},
  journal= {arXiv preprint arXiv:1004.0264},
  year   = {2011}
}

Comments

21 pages; introduction rewritten, new results about computing the diamond norm added

R2 v1 2026-06-21T15:05:46.303Z