Efficient ancilla-free reversible and quantum circuits for the Hidden Weighted Bit function
Abstract
The Hidden Weighted Bit function plays an important role in the study of classical models of computation. A common belief is that this function is exponentially hard for the implementation by reversible ancilla-free circuits, even though introducing a small number of ancillae allows a very efficient implementation. In this paper, we refute the exponential hardness conjecture by developing a polynomial-size reversible ancilla-free circuit computing the Hidden Weighted Bit function. Our circuit has size , where is the number of input bits. We also show that the Hidden Weighted Bit function can be computed by a quantum ancilla-free circuit of size . The technical tools employed come from a combination of Theoretical Computer Science (Barrington's theorem) and Physics (simulation of fermionic Hamiltonians) techniques.
Keywords
Cite
@article{arxiv.2007.05469,
title = {Efficient ancilla-free reversible and quantum circuits for the Hidden Weighted Bit function},
author = {Sergey Bravyi and Theodore J. Yoder and Dmitri Maslov},
journal= {arXiv preprint arXiv:2007.05469},
year = {2022}
}
Comments
20 pages, 4 figures