Effective resistances are ubiquitous in graph algorithms and network analysis. In this work, we study sublinear time algorithms to approximate the effective resistance of an adjacent pair $s$ and $t$. We consider the classical adjacency list model for local algorithms. While recent works have provided sublinear time algorithms for expander graphs, we prove several lower bounds for general graphs of $n$ vertices and $m$ edges: 1.It needs $\Omega(n)$ queries to obtain $1.01$-approximations of the effective resistance of an adjacent pair $s$ and $t$, even for graphs of degree at most 3 except $s$ and $t$. 2.For graphs of degree at most $d$ and any parameter $\ell$, it needs $\Omega(m/\ell)$ queries to obtain $c \cdot \min\{d, \ell\}$-appro...
König’s theorem states that on bipartite graphs the size of a maximum matching equals the size of a...
AbstractWe study the problem of testing the expansion of graphs with bounded degree d in sublinear t...
AbstractFor a given graph G over n vertices, let OPTG denote the size of an optimal solution in G of...
We consider the problem of dynamically maintaining (approximate) all-pairs effective resistances in ...
Effective resistance is an important metric that measures the similarity of two vertices in a graph....
Effective resistance is an important metric that measures the similarity of two vertices in a graph....
AbstractThis paper studies an interesting graph measure that we call the effective graph resistance....
We demonstrate that for expander graphs, for all $\epsilon > 0,$ there exists a data structure of si...
We prove a bound on the effective resistance R(x,y) between two vertices x, y of a connected graph ...
This paper studies an interesting graph measure that we call the effective graph resistance. The not...
In this work, we consider the following problem: given a graph, the addition of which single edge mi...
Disclaimer: These notes have not been subjected to the usual scrutiny reserved for formal publicatio...
Thesis (Ph. D.)--Massachusetts Institute of Technology, Dept. of Electrical Engineering and Computer...
The theory of electrical network has many applications in algorithm design and analysis. It is an im...
A dynamic graph algorithm is a data structure that answers queries about a property of the current g...
König’s theorem states that on bipartite graphs the size of a maximum matching equals the size of a...
AbstractWe study the problem of testing the expansion of graphs with bounded degree d in sublinear t...
AbstractFor a given graph G over n vertices, let OPTG denote the size of an optimal solution in G of...
We consider the problem of dynamically maintaining (approximate) all-pairs effective resistances in ...
Effective resistance is an important metric that measures the similarity of two vertices in a graph....
Effective resistance is an important metric that measures the similarity of two vertices in a graph....
AbstractThis paper studies an interesting graph measure that we call the effective graph resistance....
We demonstrate that for expander graphs, for all $\epsilon > 0,$ there exists a data structure of si...
We prove a bound on the effective resistance R(x,y) between two vertices x, y of a connected graph ...
This paper studies an interesting graph measure that we call the effective graph resistance. The not...
In this work, we consider the following problem: given a graph, the addition of which single edge mi...
Disclaimer: These notes have not been subjected to the usual scrutiny reserved for formal publicatio...
Thesis (Ph. D.)--Massachusetts Institute of Technology, Dept. of Electrical Engineering and Computer...
The theory of electrical network has many applications in algorithm design and analysis. It is an im...
A dynamic graph algorithm is a data structure that answers queries about a property of the current g...
König’s theorem states that on bipartite graphs the size of a maximum matching equals the size of a...
AbstractWe study the problem of testing the expansion of graphs with bounded degree d in sublinear t...
AbstractFor a given graph G over n vertices, let OPTG denote the size of an optimal solution in G of...