On a product dimension of bipartite graphs

In this article, we consider the following problem: Given a bipartite graph G and a positive integer k, when does G have a 2-factor with exactly k components? We will prove that if , then, for any bipartite graph H = (U 1 , U 2 ; F ) with |U 1 | ≤ n, |U 2 | ≤ n and ∆(H) ≤ 2, G contains a subgraph i

## Abstract Surgical techniques are often effective in constructing genus embeddings of cartesian products of bipartite graphs. In this paper we present a general construction that is “close” to a genus embedding for cartesian products, where each factor is “close” to being bipartite. In specializi

The pagenumber p(G) of a graph G is defined as the smallest n such that G can be embedded in a book with n pages. We give an upper bound for the pagenumber of the complete bipartite graph K m, n . Among other things, we prove p(K n, n ) w2nÂ3x+1 and p(K wn 2 Â4x, n ) n&1. We also give an asymptotic

It was conjectured in [Wang, to appear in The Australasian Journal of Combinatorics] that, for each integer k ≥ 2, there exists . This conjecture is also verified for k = 2, 3 in [Wang, to appear; Wang, manuscript]. In this article, we prove this conjecture to be true if n ≥ 3k, i.e., M (k) ≤ 3k. W

We show new lower and upper bounds on the maximum number of maximal induced bipartite subgraphs of graphs with n vertices. We present an infinite family of graphs having 105 n=10 % 1:5926 n ; such subgraphs show an upper bound of O(12 n=4 ) ¼ O(1:8613 n ) and give an algorithm that finds all maximal

## Abstract Lower bounds on the size of a maximum bipartite subgraph of a triangle‐free __r__‐regular graph are presented.