AbstractIn this paper we introduce a new notion of traversal sequences that we call exploration sequences. Exploration sequences share many properties with the traversal sequences defined in Aleliunas et al. (Proceedings on the 20th Annual Symposium of Foundations of Computer Science, 1979, pp. 218–223), but they also exhibit some new properties. In particular, they have an ability to backtrack, and their random properties are robust under choice of the probability distribution on labels.Further, we present simple constructions of polynomial-length universal exploration sequences for some previously studied classes of graphs (e.g., 2-regular graphs, cliques, expanders), and we also present universal exploration sequences for trees. These co...
We survey the recent work on phase transition and distances in various random graph models with gene...
We show that counting Euler tours in undirected bounded tree-width graphs is tractable even in paral...
We prove a general large sieve statement in the context of random walks on subgraphs of a given grap...
AbstractIn this paper we introduce a new notion of traversal sequences that we call exploration sequ...
AbstractUniversal traversal sequences for d-regular n-vertex graphs require length Ω(d2n2 + dn2 log(...
AbstractUniversal traversal sequences for cycles require length Ω(n1.43), improving the previous bou...
The paper presents a simple construction of polynomial length universal traversal sequences for cycl...
AbstractThe paper presents a simple construction of polynomial length universal traversal sequences ...
We introduce the concept of adjacency labeling schemes and recent results in the area. These schemes...
We introduce and study analogues of expander and hyperfinite graph sequences in the context of direc...
AbstractThis paper introduces a new complexity measure for binary sequences, the tree complexity. Th...
A limit of a sequence of graphs is an object that encodes approximate combinatorial information of t...
Ascent sequences are sequences of nonnegative integers with restrictions on the size of each letter,...
This paper discusses several classes of restricted traveling salesman tours and polynomial time algo...
Kruskal's theorem on trees is a classical result of combinatorics with important applications in com...
We survey the recent work on phase transition and distances in various random graph models with gene...
We show that counting Euler tours in undirected bounded tree-width graphs is tractable even in paral...
We prove a general large sieve statement in the context of random walks on subgraphs of a given grap...
AbstractIn this paper we introduce a new notion of traversal sequences that we call exploration sequ...
AbstractUniversal traversal sequences for d-regular n-vertex graphs require length Ω(d2n2 + dn2 log(...
AbstractUniversal traversal sequences for cycles require length Ω(n1.43), improving the previous bou...
The paper presents a simple construction of polynomial length universal traversal sequences for cycl...
AbstractThe paper presents a simple construction of polynomial length universal traversal sequences ...
We introduce the concept of adjacency labeling schemes and recent results in the area. These schemes...
We introduce and study analogues of expander and hyperfinite graph sequences in the context of direc...
AbstractThis paper introduces a new complexity measure for binary sequences, the tree complexity. Th...
A limit of a sequence of graphs is an object that encodes approximate combinatorial information of t...
Ascent sequences are sequences of nonnegative integers with restrictions on the size of each letter,...
This paper discusses several classes of restricted traveling salesman tours and polynomial time algo...
Kruskal's theorem on trees is a classical result of combinatorics with important applications in com...
We survey the recent work on phase transition and distances in various random graph models with gene...
We show that counting Euler tours in undirected bounded tree-width graphs is tractable even in paral...
We prove a general large sieve statement in the context of random walks on subgraphs of a given grap...