Distributed average consensus with bounded quantization

This paper considers distributed average consensus using bounded quantizers with potentially unbounded input data. We develop a quantized consensus algorithm based on a distributed alternating direction methods of multipliers (ADMM) algorithm. It is shown that, within finite iterations, all the agent variables either converge to the same quantization point or cycle with a finite period. In the convergent case, we derive a consensus error bound which also applies to that of the unbounded rounding quantizer provided that the desired average lies within quantizer output range. Simulations show that the proposed algorithm almost always converge when the network becomes large and dense.

[1]  John N. Tsitsiklis,et al.  Problems in decentralized decision making and computation , 1984 .

[2]  Stephen P. Boyd,et al.  Distributed Optimization and Statistical Learning via the Alternating Direction Method of Multipliers , 2011, Found. Trends Mach. Learn..

[3]  Wenwu Yu,et al.  An Overview of Recent Progress in the Study of Distributed Multi-Agent Coordination , 2012, IEEE Transactions on Industrial Informatics.

[4]  Anand D. Sarwate,et al.  Broadcast Gossip Algorithms for Consensus , 2009, IEEE Transactions on Signal Processing.

[5]  Biao Chen,et al.  Quantized Consensus by the ADMM: Probabilistic Versus Deterministic Quantizers , 2015, IEEE Transactions on Signal Processing.

[6]  Biao Chen,et al.  Distributed detection over connected networks via one-bit quantizer , 2016, 2016 IEEE International Symposium on Information Theory (ISIT).

[7]  Alejandro Ribeiro,et al.  Consensus in Ad Hoc WSNs With Noisy Links—Part I: Distributed Estimation of Deterministic Signals , 2008, IEEE Transactions on Signal Processing.

[8]  Biao Chen,et al.  Distributed Average Consensus using Quantized ADMM: Bounded Quantizers with Unbounded Inputs , 2016 .

[9]  Lihua Xie,et al.  Distributed Consensus With Limited Communication Data Rate , 2011, IEEE Transactions on Automatic Control.

[10]  John N. Tsitsiklis,et al.  On distributed averaging algorithms and quantization effects , 2007, 2008 47th IEEE Conference on Decision and Control.

[11]  T. C. Aysal,et al.  Distributed Average Consensus With Dithered Quantization , 2008, IEEE Transactions on Signal Processing.

[12]  Soummya Kar,et al.  Distributed Consensus Algorithms in Sensor Networks: Quantized Data and Random Link Failures , 2007, IEEE Transactions on Signal Processing.

[13]  Qing Ling,et al.  On the Linear Convergence of the ADMM in Decentralized Consensus Optimization , 2013, IEEE Transactions on Signal Processing.

[14]  L. Elsner,et al.  On the convergence of asynchronous paracontractions with application to tomographic reconstruction from incomplete data , 1990 .

[15]  John N. Tsitsiklis,et al.  Distributed Asynchronous Deterministic and Stochastic Gradient Optimization Algorithms , 1984, 1984 American Control Conference.

[16]  Ruggero Carli,et al.  Gossip consensus algorithms via quantized communication , 2009, Autom..

[17]  L. Schuchman Dither Signals and Their Effect on Quantization Noise , 1964 .

[18]  R. Srikant,et al.  Quantized Consensus , 2006, 2006 IEEE International Symposium on Information Theory.

[19]  Randal W. Beard,et al.  Consensus seeking in multiagent systems under dynamically changing interaction topologies , 2005, IEEE Transactions on Automatic Control.

[20]  Stephen P. Boyd,et al.  Fast linear iterations for distributed averaging , 2003, 42nd IEEE International Conference on Decision and Control (IEEE Cat. No.03CH37475).

[21]  Francis C. M. Lau,et al.  Load balancing in parallel computers - theory and practice , 1996, The Kluwer international series in engineering and computer science.

[22]  Soummya Kar,et al.  Topology for Distributed Inference on Graphs , 2006, IEEE Transactions on Signal Processing.

[23]  Georgios B. Giannakis,et al.  Distributed In-Network Channel Decoding , 2009, IEEE Transactions on Signal Processing.

[24]  Andreas Spanias,et al.  Non-Linear Distributed Average Consensus Using Bounded Transmissions , 2013, IEEE Transactions on Signal Processing.