English

Exponential Separation between Quantum and Classical Ordered Binary Decision Diagrams, Reordering Method and Hierarchies

Quantum Physics 2022-04-25 v1 Computational Complexity Formal Languages and Automata Theory

Abstract

In this paper, we study quantum Ordered Binary Decision Diagrams(OBDDOBDD) model; it is a restricted version of read-once quantum branching programs, with respect to "width" complexity. It is known that the maximal gap between deterministic and quantum complexities is exponential. But there are few examples of functions with such a gap. We present a new technique ("reordering") for proving lower bounds and upper bounds for OBDD with an arbitrary order of input variables if we have similar bounds for the natural order. Using this transformation, we construct a total function REQREQ such that the deterministic OBDDOBDD complexity of it is at least 2Ω(n/logn)2^{\Omega(n / \log n)}, and the quantum OBDDOBDD complexity of it is at most O(n2/logn)O(n^2/\log n). It is the biggest known gap for explicit functions not representable by OBDDOBDDs of a linear width. Another function(shifted equality function) allows us to obtain a gap 2Ω(n)2^{\Omega(n)} vs O(n2)O(n^2). Moreover, we prove the bounded error quantum and probabilistic OBDDOBDD width hierarchies for complexity classes of Boolean functions. Additionally, using "reordering" method we extend a hierarchy for read-kk-times Ordered Binary Decision Diagrams (kk-OBDDOBDD) of polynomial width, for k=o(n/log3n)k = o(n / \log^3 n). We prove a similar hierarchy for bounded error probabilistic kk-OBDDOBDDs of polynomial, superpolynomial and subexponential width. The extended abstract of this work was presented on International Computer Science Symposium in Russia, CSR 2017, Kazan, Russia, June 8 -- 12, 2017

Keywords

Cite

@article{arxiv.2204.10671,
  title  = {Exponential Separation between Quantum and Classical Ordered Binary Decision Diagrams, Reordering Method and Hierarchies},
  author = {Kamil Khadiev and Aliya Khadieva and Alexander Knop},
  journal= {arXiv preprint arXiv:2204.10671},
  year   = {2022}
}
R2 v1 2026-06-24T10:55:51.132Z