The behaviour of random discrete structures at criticality

Objective

Our primary research focus will be the behaviour of random discrete structures, with an emphasis on random graphs and percolation clusters. We will investigate the internal behaviour of such structures in the critical case - the moment when a large cluster emerges.

In particular, we will investigate such questions as the cluster sizes, robustness of connectivity, and shortest paths between vertices in the same cluster. Such questions have been well-studied in both sub- and supercritical settings, but detailed information about them in the critical case remains elusive.

We also aim to unify work on the heights of random trees with existing knowledge for the diameters of first-passage percolation clusters, and thereby to fully understand the moments of the diameter of first-passage percolation clusters in a wide class of infinite deterministic and random trees. We will also pursue similar questions to those listed above in random geometric graphs such as the Voronoi diagram, k-nearest-neighbour graphs, and the like.

We will pursue this research using tools from combinatorics, notably random graph theory, recent developments in percolation theory such as the use of the percolation-theoretic triangle inequality in finite settings, and probabilistic tools, particularly concentration of measure inequalities. Our research is aimed at answering certain key questions that arise random discrete structures in many settings.

The precise questions turn out to be slightly different depending on the setting but there is an underlying and unifying question which is driving our pursuit: what do random discrete structures look like at the moment they change from being small to being large?

This research aims to be a step in elucidating that question and making some progress towards its solution.

Fields of science (EuroSciVoc)

CORDIS classifies projects with EuroSciVoc, a multilingual taxonomy of fields of science, through a semi-automatic process based on NLP techniques. See: The European Science Vocabulary.

• natural sciences mathematics pure mathematics discrete mathematics graph theory
• natural sciences mathematics pure mathematics discrete mathematics combinatorics

Keywords

Project’s keywords as indicated by the project coordinator. Not to be confused with the EuroSciVoc taxonomy (Fields of science)

• Critical Phenomena
• Graph Theory
• Percolation Theory
• Phase Transitions
• Random Graphs

Programme(s)

Multi-annual funding programmes that define the EU’s priorities for research and innovation.

• FP6-MOBILITY - Human resources and Mobility in the specific programme for research, technological development and demonstration "Structuring the European Research Area" under the Sixth Framework Programme 2002-2006

Topic(s)

Calls for proposals are divided into topics. A topic defines a specific subject or area for which applicants can submit proposals. The description of a topic comprises its specific scope and the expected impact of the funded project.

• MOBILITY-2.1 - Marie Curie Intra-European Fellowships (EIF)

Call for proposal

Procedure for inviting applicants to submit project proposals, with the aim of receiving EU funding.

FP6-2005-MOBILITY-5
See other projects for this call

Funding Scheme

Funding scheme (or “Type of Action”) inside a programme with common features. It specifies: the scope of what is funded; the reimbursement rate; specific evaluation criteria to qualify for funding; and the use of simplified forms of costs like lump sums.

EIF - Marie Curie actions-Intra-European Fellowships

Coordinator