We study the question as to when a random graph with n vertices and m edges contains a copy of almost all graphs with n vertices and cn/2 edges, c constant. We identify a ”phase transition ” at c = 1. For c < 1, m needs to grow slightly faster than n, and we prove that m = O(n log log n/log log log n) is sufficient. When c> 1, m needs to grow at a rate m = n1+a, where a = a(c)> 0 for every c> 1, and a(c) is between 1
A graph G is said to be ℋ(n, Δ)-universal if it contains every graph on n vertices with maximum degr...
AbstractWe consider cop-win graphs in the binomial random graph G(n,1/2). We prove that almost all c...
Random graph processes are basic mathematical models for large-scale networks evolving over time. Th...
We study the question as to when a random graph with n vertices and m edges contains a copy of almos...
A graph G is said to be ℋ(n, Δ)-universal if it contains every graph on n vertices with maximum degr...
We prove that asymptotically (as n -> infinity) almost all graphs with n vertices and C(d)n(2-1/2...
AbstractIn this paper we partially answer the question: how slowly must p(n) converge to 0 so that a...
We consider first passage percolation on the conguration model with n vertices, and general independ...
We deal with a random graph model evolving in discrete time steps by duplicating and deleting the ed...
AbstractFor 0 < γ ≤ 1 and graphs G and H, we write G[formula]H if any γ-proportion of the edges of G...
We survey the recent work on phase transition and distances in various random graph models with gene...
Let Q be a monotone decreasing property of graphs G on n vertices. Erdos, Suen and Winkler [5] intro...
be a random Qn”‐process, that is let Q0 be the empty spanning subgraph of the cube Qn and, for 1 ⩽ t...
AbstractWe study the following min–min random graph process G=(G0,G1,…): the initial state G0 is an ...
Abstract. This paper proves limit theorems for the number of monochromatic edges in uniform random c...
A graph G is said to be ℋ(n, Δ)-universal if it contains every graph on n vertices with maximum degr...
AbstractWe consider cop-win graphs in the binomial random graph G(n,1/2). We prove that almost all c...
Random graph processes are basic mathematical models for large-scale networks evolving over time. Th...
We study the question as to when a random graph with n vertices and m edges contains a copy of almos...
A graph G is said to be ℋ(n, Δ)-universal if it contains every graph on n vertices with maximum degr...
We prove that asymptotically (as n -> infinity) almost all graphs with n vertices and C(d)n(2-1/2...
AbstractIn this paper we partially answer the question: how slowly must p(n) converge to 0 so that a...
We consider first passage percolation on the conguration model with n vertices, and general independ...
We deal with a random graph model evolving in discrete time steps by duplicating and deleting the ed...
AbstractFor 0 < γ ≤ 1 and graphs G and H, we write G[formula]H if any γ-proportion of the edges of G...
We survey the recent work on phase transition and distances in various random graph models with gene...
Let Q be a monotone decreasing property of graphs G on n vertices. Erdos, Suen and Winkler [5] intro...
be a random Qn”‐process, that is let Q0 be the empty spanning subgraph of the cube Qn and, for 1 ⩽ t...
AbstractWe study the following min–min random graph process G=(G0,G1,…): the initial state G0 is an ...
Abstract. This paper proves limit theorems for the number of monochromatic edges in uniform random c...
A graph G is said to be ℋ(n, Δ)-universal if it contains every graph on n vertices with maximum degr...
AbstractWe consider cop-win graphs in the binomial random graph G(n,1/2). We prove that almost all c...
Random graph processes are basic mathematical models for large-scale networks evolving over time. Th...