Yunus Emre Demirci, Ümit Işlak, Alperen Yaşar Özdemir
Published 2022-01-10, updated 2022-09-06Version 2
The edge flipping is a non-reversible Markov chain on a given connected graph, which is defined by Chung and Graham in [CG12]. In the same paper, its eigenvalues and stationary distributions for some classes of graphs are identified. We further study its spectral properties to show a lower bound for the rate of convergence in the case of regular graphs. Moreover, we show that a cutoff occurs at \frac{1}{4} n \log n for the edge flipping on the complete graph by a coupling argument.
Comments: 16 pages. An error in the proof of Theorem 1.1 is corrected. The section on vertex flipping is removed. Presentation is revised. Note the change in the title
Mixing time bounds for edge flipping on regular graphs
Stein's Method and Non-Reversible Markov Chains
Critical threshold for regular graphs
![QR code for arXiv:2201.03315 [math.PR]](http://oss.arxitics.com/images/favicon.svg)