We study a new algorithmic process of graph growth which starts from a single initial vertex and operates in discrete time-steps, called \emph{slots}. In every slot, the graph grows via two operations (i) vertex generation and (ii) edge activation. The process completes at the last slot where a (possibly empty) subset of the edges of the graph will be removed. Removed edges are called \emph{excess edges}. The main problem investigated in this paper is: Given a target graph $G$, we are asked to design an algorithm that outputs such a process growing $G$, called a \emph{growth schedule}. Additionally, the algorithm should try to minimize the total number of slots $k$ and of excess edges $\ell$ used by the process. We provide both positive and...
AbstractIn this paper we study the Target Set Selection problem proposed by Kempe, Kleinberg, and Ta...
Network propagation is a powerful transformation that amplifies signal-to-noise ratio in biological ...
We investigate a family of algorithms for graph bisection that are based on a simple local connectiv...
We study a new algorithmic process of graph growth. The process starts from a single initial vertex ...
We study a new algorithmic process of graph growth. The process starts from a single initial vertex ...
The parallel computational complexity or depth of growing network models is investigated. The networ...
Temporal graphs abstractly model real-life inherently dynamic networks. Given a graph G, a temporal ...
Spreading processes on graphs are a natural model for a wide variety of real-world phenomena, includ...
Spreading processes on graphs are a natural model for a wide variety of real-world phenomena, includ...
In this work, we investigate novel algorithmic growth processes. In particular, we propose three gro...
Temporal graphs are used to abstractly model real-life networks that are inherently dynamic in natur...
In this work, we investigate novel algorithmic growth processes. Our system runs on a 2-dimensional ...
Spreading processes on graphs are a natural model for a wide variety of real-world phenomena, includ...
This article investigates emergence and complexity in complex systems that can share information on ...
AbstractWe propose dynamic algorithms and data structures for chordal graphs supporting the followin...
AbstractIn this paper we study the Target Set Selection problem proposed by Kempe, Kleinberg, and Ta...
Network propagation is a powerful transformation that amplifies signal-to-noise ratio in biological ...
We investigate a family of algorithms for graph bisection that are based on a simple local connectiv...
We study a new algorithmic process of graph growth. The process starts from a single initial vertex ...
We study a new algorithmic process of graph growth. The process starts from a single initial vertex ...
The parallel computational complexity or depth of growing network models is investigated. The networ...
Temporal graphs abstractly model real-life inherently dynamic networks. Given a graph G, a temporal ...
Spreading processes on graphs are a natural model for a wide variety of real-world phenomena, includ...
Spreading processes on graphs are a natural model for a wide variety of real-world phenomena, includ...
In this work, we investigate novel algorithmic growth processes. In particular, we propose three gro...
Temporal graphs are used to abstractly model real-life networks that are inherently dynamic in natur...
In this work, we investigate novel algorithmic growth processes. Our system runs on a 2-dimensional ...
Spreading processes on graphs are a natural model for a wide variety of real-world phenomena, includ...
This article investigates emergence and complexity in complex systems that can share information on ...
AbstractWe propose dynamic algorithms and data structures for chordal graphs supporting the followin...
AbstractIn this paper we study the Target Set Selection problem proposed by Kempe, Kleinberg, and Ta...
Network propagation is a powerful transformation that amplifies signal-to-noise ratio in biological ...
We investigate a family of algorithms for graph bisection that are based on a simple local connectiv...