Wireless Expanders

TL;DR

This paper extends the concept of graph expansion to wireless networks, establishing bounds on how ordinary expanders translate into wireless expanders, and applying these findings to improve broadcasting efficiency in radio networks.

Contribution

It introduces the notion of wireless expanders, relates them to ordinary expanders, and applies these insights to improve bounds in radio network broadcasting.

Findings

Wireless expansion is at most logarithmically smaller than ordinary expansion.

Constructed a 'bad' expander with significantly smaller wireless expansion.

Improved bounds for the spokesmen election problem in radio networks.

Abstract

This paper introduces an extended notion of expansion suitable for radio networks. A graph $G=(V,E)$ is called an $(\alpha_w, \beta_w)$-{wireless expander} if for every subset $S \subseteq V$ s.t. $|S|\leq \alpha_w \cdot |V|$, there exists a subset $S'\subseteq S$ s.t. there are at least $\beta_w \cdot |S|$ vertices in $V\backslash S$ adjacent in $G$ to exactly one vertex in $S'$. The main question we ask is the following: to what extent are ordinary expanders also good {wireless} expanders? We answer this question in a nearly tight manner. On the positive side, we show that any $(\alpha, \beta)$-expander with maximum degree $\Delta$ and $\beta\geq 1/\Delta$ is also a $(\alpha_w, \beta_w)$ wireless expander for $\beta_w = \Omega(\beta / \log (2 \cdot \min\{\Delta / \beta, \Delta \cdot \beta\}))$. Thus the wireless expansion is smaller than the ordinary expansion by at most a factor logarithmic in $\min\{\Delta / \beta, \Delta \cdot \beta\}$, which depends on the graph \emph{average degree} rather than maximum degree; e.g., for low arboricity graphs, the wireless expansion matches the ordinary expansion up to a constant. We complement this positive result by presenting an explicit construction of a "bad" $(\alpha, \beta)$-expander for which the wireless expansion is $\beta_w = O(\beta / \log (2 \cdot \min\{\Delta / \beta, \Delta \cdot \beta\})$. We also analyze the theoretical properties of wireless expanders and their connection to unique neighbor expanders, and demonstrate their applicability: Our results yield improved bounds for the {spokesmen election problem} that was introduced in the seminal paper of Chlamtac and Weinstein (1991) to devise efficient broadcasting for multihop radio networks. Our negative result yields a significantly simpler proof than that from the seminal paper of Kushilevitz and Mansour (1998) for a lower bound on the broadcast time in radio networks.