Logic circuits from zero forcing
TL;DR: The model introduced here provides a potentially new tool in the analysis of Boolean functions, with particular attention to monotonicity, and the link with Boolean functions may suggest a new directions in quantum control theory and in the study of engineered quantum spin systems.
read more
Abstract: We design logic circuits based on the notion of zero forcing on graphs; each gate of the circuits is a gadget in which zero forcing is performed. We show that such circuits can evaluate every monotone Boolean function. By using two vertices to encode each logical bit, we obtain universal computation. We also highlight a phenomenon of "back forcing" as a property of each function. Such a phenomenon occurs in a circuit when the input of gates which have been already used at a given time step is further modified by a computation actually performed at a later stage. Finally, we show that zero forcing can be also used to implement reversible computation. The model introduced here provides a potentially new tool in the analysis of Boolean functions, with particular attention to monotonicity. Moreover, in the light of applications of zero forcing in quantum mechanics, the link with Boolean functions may suggest a new directions in quantum control theory and in the study of engineered quantum spin systems. It is an open technical problem to verify whether there is a link between zero forcing and computation with contact circuits.
read more
Chat with Paper
AI Agents for this Paper
Find similar papers on Google Scholar, PubMed and Arxiv
Write a critical review of this paper
Analyze citations of this paper to find unaddressed research gaps
Citations
On the Universality of the Quantum Approximate Optimization Algorithm
TL;DR: The complete proof of the claim that for one-dimensional local cost Hamiltonians, composed of nearest neighbor ZZ terms, this set-up is quantum computationally universal, i.e., all unitaries can be reached up to arbitrary precision is given.
Ground State Spin Logic
TL;DR: This work examines the embedding of Boolean logic gates into the ground-state subspace of such spin systems using an approach based on group theory and symmetries, and describes parameterized families of diagonal Hamiltonians and symmetry operations which preserve theGround- state subspace encoding the truth tables of Boolean formulas.
58
Some bounds on the zero forcing number of a graph
TL;DR: In this article, it was shown that Z(G ) ≤ n 2 − Ω n log n for a connected graph G of order n and maximum degree Δ at least 3 if and only if G does not belong to { K Δ + 1, K Δ, Δ, K Δ − 1, Δ, G 1, G 2 }, where G 1 and G 2 are two specific graphs of orders 5 and 7, respectively.
44
•Posted Content
Bounds for the Zero-Forcing Number of Graphs with Large Girth
TL;DR: The Graph Complement Conjecture on minimum rank for a large class of graphs is proved and a conjecture that the lower bound for $Z(G)$ increases as a function of the girth, $g$, and $\delta$.
Bounds for the Zero Forcing Number of Graphs with Large Girth
Randy Davila,Franklin H. J. Kenter +1 more
- 07 Jul 2015
TL;DR: In this paper, it was shown that 2 δ − 2 ≤ Z(G) for graphs with girth of at least 5, where δ is the minimum degree.
References
•Book
Handbook of theoretical computer science
J. Van Leeuwen
- 19 Dec 1990
TL;DR: The Handbook of Theoretical Computer Science provides professionals and students with a comprehensive overview of the main results and developments in this rapidly evolving field.
4.3K
•Book
Conservative logic
Edward Fredkin,Tommaso Toffoli +1 more
- 01 Jan 2001
TL;DR: Conservative logic shows that it is ideally possible to build sequential circuits with zero internal power dissipation and proves that universal computing capabilities are compatible with the reversibility and conservation constraints.
1.9K
Zero forcing sets and the minimum rank of graphs
Francesco Barioli,Wayne Barrett,Steve Butler,Sebastian M. Cioabă,Dragoš Cvetković,Shaun M. Fallat,Chris Godsil,Willem H. Haemers,Leslie Hogben,Rana Mikkelson,Sivaram K. Narayan,Olga Pryporova,Irene Sciriha,Wasin So,Dragan Stevanović,Hein van der Holst,Kevin N. Vander Meulen,Amy Wangsness Wehe +17 more
TL;DR: In this article, the minimum rank of a simple graph G is defined to be the smallest possible rank over all symmetric real matrices whose ijth entry (for i 6 j) is nonzero whenever {i,j} is an edge in G and is zero otherwise.
428
Synthesis and optimization of reversible circuits—a survey
Mehdi Saeedi,Igor L. Markov +1 more
TL;DR: This survey reviews algorithmic paradigms—search based, cycle based, transformation based, and BDD based—as well as specific algorithms for reversible synthesis, both exact and heuristic, and outlines key open challenges in synthesis of reversible and quantum logic.
Full control by locally induced relaxation.
TL;DR: A scheme for controlling a large quantum system by acting on a small subsystem only and transferring arbitrary and unknown quantum states from a memory to the large system as well as the inverse ("download access").
269
Related Papers (5)
Francesco Barioli,Wayne Barrett,Steve Butler,Sebastian M. Cioabă,Dragoš Cvetković,Shaun M. Fallat,Chris Godsil,Willem H. Haemers,Leslie Hogben,Rana Mikkelson,Sivaram K. Narayan,Olga Pryporova,Irene Sciriha,Wasin So,Dragan Stevanović,Hein van der Holst,Kevin N. Vander Meulen,Amy Wangsness Wehe +17 more