6,165 research outputs found
Summary of investigations of light scattering in highly reflecting pigmented coatings
Light scattering in highly reflecting pigmented coatings - silver bromide and particle suspensions and paint film
Generating realistic scaled complex networks
Research on generative models is a central project in the emerging field of
network science, and it studies how statistical patterns found in real networks
could be generated by formal rules. Output from these generative models is then
the basis for designing and evaluating computational methods on networks, and
for verification and simulation studies. During the last two decades, a variety
of models has been proposed with an ultimate goal of achieving comprehensive
realism for the generated networks. In this study, we (a) introduce a new
generator, termed ReCoN; (b) explore how ReCoN and some existing models can be
fitted to an original network to produce a structurally similar replica, (c)
use ReCoN to produce networks much larger than the original exemplar, and
finally (d) discuss open problems and promising research directions. In a
comparative experimental study, we find that ReCoN is often superior to many
other state-of-the-art network generation methods. We argue that ReCoN is a
scalable and effective tool for modeling a given network while preserving
important properties at both micro- and macroscopic scales, and for scaling the
exemplar data by orders of magnitude in size.Comment: 26 pages, 13 figures, extended version, a preliminary version of the
paper was presented at the 5th International Workshop on Complex Networks and
their Application
Efficient computation of the Weighted Clustering Coefficient
The clustering coefficient of an unweighted network has been extensively used to quantify how tightly connected is the neighbor around a node and it has been widely adopted for assessing the quality of nodes in a social network. The computation of the clustering coefficient is challenging since it requires to count the number of triangles in the graph. Several recent works proposed efficient sampling, streaming and MapReduce algorithms that allow to overcome this computational bottleneck. As a matter of fact, the intensity of the interaction between nodes, that is usually represented with weights on the edges of the graph, is also an important measure of the statistical cohesiveness of a network. Recently various notions of weighted clustering coefficient have been proposed but all those techniques are hard to implement on large-scale graphs. In this work we show how standard sampling techniques can be used to obtain efficient estimators for the most commonly used measures of weighted clustering coefficient. Furthermore we also propose a novel graph-theoretic notion of clustering coefficient in weighted networks. © 2016, Copyright © Taylor & Francis Group, LL
Investigation of light scattering in highly reflecting pigmented coatings. Volume 3 - Monte Carlo and other statistical investigations Final report, 1 May 1963 - 30 Sep. 1966
Monte Carlo methods, Mie theory, and random walk and screen models for predicting reflective properties of paint film
Scalable Facility Location for Massive Graphs on Pregel-like Systems
We propose a new scalable algorithm for facility location. Facility location
is a classic problem, where the goal is to select a subset of facilities to
open, from a set of candidate facilities F , in order to serve a set of clients
C. The objective is to minimize the total cost of opening facilities plus the
cost of serving each client from the facility it is assigned to. In this work,
we are interested in the graph setting, where the cost of serving a client from
a facility is represented by the shortest-path distance on the graph. This
setting allows to model natural problems arising in the Web and in social media
applications. It also allows to leverage the inherent sparsity of such graphs,
as the input is much smaller than the full pairwise distances between all
vertices.
To obtain truly scalable performance, we design a parallel algorithm that
operates on clusters of shared-nothing machines. In particular, we target
modern Pregel-like architectures, and we implement our algorithm on Apache
Giraph. Our solution makes use of a recent result to build sketches for massive
graphs, and of a fast parallel algorithm to find maximal independent sets, as
building blocks. In so doing, we show how these problems can be solved on a
Pregel-like architecture, and we investigate the properties of these
algorithms. Extensive experimental results show that our algorithm scales
gracefully to graphs with billions of edges, while obtaining values of the
objective function that are competitive with a state-of-the-art sequential
algorithm
Kronecker Graphs: An Approach to Modeling Networks
How can we model networks with a mathematically tractable model that allows
for rigorous analysis of network properties? Networks exhibit a long list of
surprising properties: heavy tails for the degree distribution; small
diameters; and densification and shrinking diameters over time. Most present
network models either fail to match several of the above properties, are
complicated to analyze mathematically, or both. In this paper we propose a
generative model for networks that is both mathematically tractable and can
generate networks that have the above mentioned properties. Our main idea is to
use the Kronecker product to generate graphs that we refer to as "Kronecker
graphs".
First, we prove that Kronecker graphs naturally obey common network
properties. We also provide empirical evidence showing that Kronecker graphs
can effectively model the structure of real networks.
We then present KronFit, a fast and scalable algorithm for fitting the
Kronecker graph generation model to large real networks. A naive approach to
fitting would take super- exponential time. In contrast, KronFit takes linear
time, by exploiting the structure of Kronecker matrix multiplication and by
using statistical simulation techniques.
Experiments on large real and synthetic networks show that KronFit finds
accurate parameters that indeed very well mimic the properties of target
networks. Once fitted, the model parameters can be used to gain insights about
the network structure, and the resulting synthetic graphs can be used for null-
models, anonymization, extrapolations, and graph summarization
- …