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253 results on '"Rescigno, Adele A."'

1. An Efficient Algorithm for Group Testing with Runlength Constraints

Author

Dalai, Marco, Della Fiore, Stefano, Rescigno, Adele A., and Vaccaro, Ugo

Subjects
Computer Science - Information Theory, Computer Science - Data Structures and Algorithms, 05D40
Abstract

In this paper, we provide an efficient algorithm to construct almost optimal $(k,n,d)$-superimposed codes with runlength constraints. A $(k,n,d)$-superimposed code of length $t$ is a $t \times n$ binary matrix such that any two 1's in each column are separated by a run of at least $d$ 0's, and such that for any column $\mathbf{c}$ and any other $k-1$ columns, there exists a row where $\mathbf{c}$ has $1$ and all the remaining $k-1$ columns have $0$. These combinatorial structures were introduced by Agarwal et al. [1], in the context of Non-Adaptive Group Testing algorithms with runlength constraints. By using Moser and Tardos' constructive version of the Lov\'asz Local Lemma, we provide an efficient randomized Las Vegas algorithm of complexity $\Theta(t n^2)$ for the construction of $(k,n,d)$-superimposed codes of length $t=O(dk\log n +k^2\log n)$. We also show that the length of our codes is shorter, for $n$ sufficiently large, than that of the codes whose existence was proved in [1]., Comment: Accepted for publication in Discrete Applied Mathematics

Published
2024

2. Spanning Trees Minimizing Branching Costs

Author

Gargano, Luisa and Rescigno, Adele A.

Subjects
Computer Science - Data Structures and Algorithms, Computer Science - Computational Complexity, F.2.2
Abstract

The Minimum Branch Vertices Spanning Tree problem aims to find a spanning tree $T$ in a given graph $G$ with the fewest branch vertices, defined as vertices with a degree three or more in $T$. This problem, known to be NP-hard, has attracted significant attention due to its importance in network design and optimization. Extensive research has been conducted on the algorithmic and combinatorial aspects of this problem, with recent studies delving into its fixed-parameter tractability. In this paper, we focus primarily on the parameter modular-width. We demonstrate that finding a spanning tree with the minimum number of branch vertices is Fixed-Parameter Tractable (FPT) when considered with respect to modular-width. Additionally, in cases where each vertex in the input graph has an associated cost for serving as a branch vertex, we prove that the problem of finding a spanning tree with the minimum branch cost (i.e., minimizing the sum of the costs of branch vertices) is FPT with respect to neighborhood diversity.

Published
2024

3. Bounds and Algorithms for Frameproof Codes and Related Combinatorial Structures

Author

Dalai, Marco, Della Fiore, Stefano, Rescigno, Adele A., and Vaccaro, Ugo

Subjects
Computer Science - Information Theory, Computer Science - Data Structures and Algorithms
Abstract

In this paper, we study upper bounds on the minimum length of frameproof codes introduced by Boneh and Shaw to protect copyrighted materials. A $q$-ary $(k,n)$-frameproof code of length $t$ is a $t \times n$ matrix having entries in $\{0,1,\ldots, q-1\}$ and with the property that for any column $\mathbf{c}$ and any other $k$ columns, there exists a row where the symbols of the $k$ columns are all different from the corresponding symbol (in the same row) of the column $\mathbf{c}$. In this paper, we show the existence of $q$-ary $(k,n)$-frameproof codes of length $t = O(\frac{k^2}{q} \log n)$ for $q \leq k$, using the Lov\'asz Local Lemma, and of length $t = O(\frac{k}{\log(q/k)}\log(n/k))$ for $q > k$ using the expurgation method. Remarkably, for the practical case of $q \leq k$ our findings give codes whose length almost matches the lower bound $\Omega(\frac{k^2}{q\log k} \log n)$ on the length of any $q$-ary $(k,n)$-frameproof code and, more importantly, allow us to derive an algorithm of complexity $O(t n^2)$ for the construction of such codes., Comment: 5 pages plus extra one reference page, accepted to the IEEE Information Theory Workshop (ITW 2023)

Published
2023

6. Parameterized Complexity of Immunization in the Threshold Model

Author

Cordasco, Gennaro, Gargano, Luisa, and Rescigno, Adele Anna

Subjects
Computer Science - Computational Complexity, Computer Science - Discrete Mathematics, Computer Science - Data Structures and Algorithms, Mathematics - Combinatorics
Abstract

We consider the problem of controlling the spread of harmful items in networks, such as the contagion proliferation of diseases or the diffusion of fake news. We assume the linear threshold model of diffusion where each node has a threshold that measures the node resistance to the contagion. We study the parameterized complexity of the problem: Given a network, a set of initially contaminated nodes, and two integers $k$ and $\ell$, is it possible to limit the diffusion to at most $k$ other nodes of the network by immunizing at most $\ell$ nodes? We consider several parameters associated to the input, including: the bounds $k$ and $\ell$, the maximum node degree $\Delta$, the treewidth, and the neighborhood diversity of the network. We first give $W[1]$ or $W[2]$-hardness results for each of the considered parameters. Then we give fixed-parameter algorithms for some parameter combinations.

Published
2021

7. Spanning Trees with Few Branch Vertices in Graphs of Bounded Neighborhood Diversity

Author

Gargano, Luisa, Rescigno, Adele A., Goos, Gerhard, Founding Editor, Hartmanis, Juris, Founding Editor, Bertino, Elisa, Editorial Board Member, Gao, Wen, Editorial Board Member, Steffen, Bernhard, Editorial Board Member, Yung, Moti, Editorial Board Member, Rajsbaum, Sergio, editor, Balliu, Alkida, editor, Daymude, Joshua J., editor, and Olivetti, Dennis, editor

Published
2023
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8. Groups Burning: Analyzing Spreading Processes in Community-Based Networks

Author

Cordasco, Gennaro, Gargano, Luisa, Rescigno, Adele A., Goos, Gerhard, Founding Editor, Hartmanis, Juris, Founding Editor, Bertino, Elisa, Editorial Board Member, Gao, Wen, Editorial Board Member, Steffen, Bernhard, Editorial Board Member, Yung, Moti, Editorial Board Member, Lin, Chun-Cheng, editor, Lin, Bertrand M. T., editor, and Liotta, Giuseppe, editor

Published
2023
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9. Iterated Type Partitions

Author

Cordasco, Gennaro, Gargano, Luisa, and Rescigno, Adele Anna

Subjects
Computer Science - Computational Complexity, Computer Science - Discrete Mathematics, Mathematics - Combinatorics
Abstract

This paper deals with the complexity of some natural graph problems when parametrized by {measures that are restrictions of} clique-width, such as modular-width and neighborhood diversity. The main contribution of this paper is to introduce a novel parameter, called iterated type partition, that can be computed in polynomial time and nicely places between modular-width and neighborhood diversity. We prove that the Equitable Coloring problem is W[1]-hard when parametrized by the iterated type partition. This result extends to modular-width, answering an open question about the possibility to have FPT algorithms for Equitable Coloring when parametrized by modular-width. Moreover, we show that the Equitable Coloring problem is instead FTP when parameterized by neighborhood diversity. Furthermore, we present simple and fast FPT algorithms parameterized by iterated type partition that provide optimal solutions for several graph problems; in particular, this paper presents algorithms for the Dominating Set, the Vertex Coloring and the Vertex Cover problems. While the above problems are already known to be FPT with respect to modular-width, the novel algorithms are both simpler and more efficient: For the Dominating set and Vertex Cover problems, our algorithms output an optimal set in time $O(2^t+poly(n))$, while for the Vertex Coloring problem, our algorithm outputs an optimal set in time $O(t^{2.5t+o(t)}\log n+poly(n))$, where $n$ and $t$ are the size and the iterated type partition of the input graph, respectively.

Published
2020

12. Pervasive Domination

Author

Cordasco, Gennaro, Gargano, Luisa, Rescigno, Adele A., Goos, Gerhard, Founding Editor, Hartmanis, Juris, Founding Editor, Bertino, Elisa, Editorial Board Member, Gao, Wen, Editorial Board Member, Steffen, Bernhard, Editorial Board Member, Yung, Moti, Editorial Board Member, Ljubić, Ivana, editor, Barahona, Francisco, editor, Dey, Santanu S., editor, and Mahjoub, A. Ridha, editor

Published
2022
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13. Parameterized Complexity of Immunization in the Threshold Model

Author

Cordasco, Gennaro, Gargano, Luisa, Rescigno, Adele A., Goos, Gerhard, Founding Editor, Hartmanis, Juris, Founding Editor, Bertino, Elisa, Editorial Board Member, Gao, Wen, Editorial Board Member, Steffen, Bernhard, Editorial Board Member, Woeginger, Gerhard, Editorial Board Member, Yung, Moti, Editorial Board Member, Mutzel, Petra, editor, Rahman, Md. Saidur, editor, and Slamin, editor

Published
2022
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15. Time-Bounded Influence Diffusion with Incentives

Author

Cordasco, Gennaro, Gargano, Luisa, Peters, Joseph, Rescigno, Adele Anna, and Vaccaro, Ugo

Subjects
Computer Science - Data Structures and Algorithms, Computer Science - Social and Information Networks, Mathematics - Combinatorics, Physics - Physics and Society
Abstract

A widely studied model of influence diffusion in social networks represents the network as a graph $G=(V,E)$ with an influence threshold $t(v)$ for each node. Initially the members of an initial set $S\subseteq V$ are influenced. During each subsequent round, the set of influenced nodes is augmented by including every node $v$ that has at least $t(v)$ previously influenced neighbours. The general problem is to find a small initial set that influences the whole network. In this paper we extend this model by using \emph{incentives} to reduce the thresholds of some nodes. The goal is to minimize the total of the incentives required to ensure that the process completes within a given number of rounds. The problem is hard to approximate in general networks. We present polynomial-time algorithms for paths, trees, and complete networks., Comment: An extended abstract of this paper was presented at the 25th International Colloquium on Structural Information and Communication Complexity (Sirocco 2018) June 18-21, 2018 Ma'ale HaHamisha, Israel

Published
2018

16. Whom to befriend to influence people

Author

Cordasco, Gennaro, Gargano, Luisa, Lafond, Manuel, Narayanan, Lata, Rescigno, Adele A., Vaccaro, Ugo, and Wu, Kangkang

Subjects
Computer Science - Data Structures and Algorithms, Computer Science - Social and Information Networks, Mathematics - Combinatorics, Physics - Physics and Society
Abstract

Alice wants to join a new social network, and influence its members to adopt a new product or idea. Each person $v$ in the network has a certain threshold $t(v)$ for {\em activation}, i.e adoption of the product or idea. If $v$ has at least $t(v)$ activated neighbors, then $v$ will also become activated. If Alice wants to activate the entire social network, whom should she befriend? More generally, we study the problem of finding the minimum number of links that a set of external influencers should form to people in the network, in order to activate the entire social network. This {\em Minimum Links} Problem has applications in viral marketing and the study of epidemics. Its solution can be quite different from the related and widely studied Target Set Selection problem. We prove that the Minimum Links problem cannot be approximated to within a ratio of $O(2^{\log^{1-\epsilon} n})$, for any fixed $\epsilon>0$, unless $NP\subseteq DTIME(n^{polylog(n)})$, where $n$ is the number of nodes in the network. On the positive side, we give linear time algorithms to solve the problem for trees, cycles, and cliques, for any given set of external influencers, and give precise bounds on the number of links needed. For general graphs, we design a polynomial time algorithm to compute size-efficient link sets that can activate the entire graph.

Published
2016

17. Evangelism in Social Networks: Algorithms and Complexity

Author

Cordasco, Gennaro, Gargano, Luisa, Rescigno, Adele Anna, and Vaccaro, Ugo

Subjects
Computer Science - Data Structures and Algorithms, Computer Science - Social and Information Networks, Mathematics - Combinatorics, Physics - Physics and Society
Abstract

We consider a population of interconnected individuals that, with respect to a piece of information, at each time instant can be subdivided into three (time-dependent) categories: agnostics, influenced, and evangelists. A dynamical process of information diffusion evolves among the individuals of the population according to the following rules. Initially, all individuals are agnostic. Then, a set of people is chosen from the outside and convinced to start evangelizing, i.e., to start spreading the information. When a number of evangelists, greater than a given threshold, communicate with a node v, the node v becomes influenced, whereas, as soon as the individual v is contacted by a sufficiently much larger number of evangelists, it is itself converted into an evangelist and consequently it starts spreading the information. The question is: How to choose a bounded cardinality initial set of evangelists so as to maximize the final number of influenced individuals? We prove that the problem is hard to solve, even in an approximate sense. On the positive side, we present exact polynomial time algorithms for trees and complete graphs. For general graphs, we derive exact parameterized algorithms. We also investigate the problem when the objective is to select a minimum number of evangelists capable of influencing the whole network. Our motivations to study these problems come from the areas of Viral Marketing and the analysis of quantitative models of spreading of influence in social networks., Comment: An extended abstract of this paper was presented at the 27th International Workshop on Combinatorial Algorithms (IWOCA 2016), Helsinki, Finland, August 17-19, 2016

Published
2016

18. On Finding Small Sets that Influence Large Networks

Author

Cordasco, Gennaro, Gargano, Luisa, and Rescigno, Adele Anna

Subjects
Computer Science - Data Structures and Algorithms, Computer Science - Social and Information Networks, Mathematics - Combinatorics, Physics - Physics and Society
Abstract

We consider the problem of selecting a minimum size subset of nodes in a network, that allows to activate all the nodes of the network. We present a fast and simple algorithm that, in real-life networks, produces solutions that outperform the ones obtained by using the best algorithms in the literature. We also investigate the theoretical performances of our algorithm and give proofs of optimality for some classes of graphs. From an experimental perspective, experiments also show that the performance of the algorithms correlates with the modularity of the analyzed network. Moreover, the more the influence among communities is hard to propagate, the less the performances of the algorithms differ. On the other hand, when the network allows some propagation of influence between different communities, the gap between the solutions returned by the proposed algorithm and by the previous algorithms in the literature increases., Comment: This paper will appear in Social Network Analysis and Mining (SNAM) Journal. A preliminary version of this paper was presented at the 1st International Workshop on Dynamics in Networks (DyNo 2015) in conjunction with the 2016 IEEE/ACM International Conference ASONAM, Paris, France, August 25-28, 2015

Published
2016
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19. Discovering Small Target Sets in Social Networks: A Fast and Effective Algorithm

Author

Cordasco, Gennaro, Gargano, Luisa, Mecchia, Marco, Rescigno, Adele A., and Vaccaro, Ugo

Subjects
Computer Science - Data Structures and Algorithms, Computer Science - Social and Information Networks, Mathematics - Combinatorics, Physics - Physics and Society
Abstract

Given a network represented by a graph $G=(V,E)$, we consider a dynamical process of influence diffusion in $G$ that evolves as follows: Initially only the nodes of a given $S\subseteq V$ are influenced; subsequently, at each round, the set of influenced nodes is augmented by all the nodes in the network that have a sufficiently large number of already influenced neighbors. The question is to determine a small subset of nodes $S$ (\emph{a target set}) that can influence the whole network. This is a widely studied problem that abstracts many phenomena in the social, economic, biological, and physical sciences. It is known that the above optimization problem is hard to approximate within a factor of $2^{\log^{1-\epsilon}|V|}$, for any $\epsilon >0$. In this paper, we present a fast and surprisingly simple algorithm that exhibits the following features: 1) when applied to trees, cycles, or complete graphs, it always produces an optimal solution (i.e, a minimum size target set); 2) when applied to arbitrary networks, it always produces a solution of cardinality which improves on the previously known upper bound; 3) when applied to real-life networks, it always produces solutions that substantially outperform the ones obtained by previously published algorithms (for which no proof of optimality or performance guarantee is known in any class of graphs)., Comment: A preliminary version of this paper was presented at the 9th Annual International Conference on Combinatorial Optimization and Applications (COCOA'15), December 18-20, 2015, Houston, Texas, USA

Published
2016

20. Optimizing Spread of Influence in Weighted Social Networks via Partial Incentives

Author

Cordasco, Gennaro, Gargano, Luisa, Rescigno, Adele A., and Vaccaro, Ugo

Subjects
Computer Science - Data Structures and Algorithms, Computer Science - Social and Information Networks, Mathematics - Combinatorics, Physics - Physics and Society
Abstract

A widely studied process of influence diffusion in social networks posits that the dynamics of influence diffusion evolves as follows: Given a graph $G=(V,E)$, representing the network, initially \emph{only} the members of a given $S\subseteq V$ are influenced; subsequently, at each round, the set of influenced nodes is augmented by all the nodes in the network that have a sufficiently large number of already influenced neighbors. The general problem is to find a small initial set of nodes that influences the whole network. In this paper we extend the previously described basic model in the following ways: firstly, we assume that there are non negative values $c(v)$ associated to each node $v\in V$, measuring how much it costs to initially influence node $v$, and the algorithmic problem is to find a set of nodes of \emph{minimum total cost} that influences the whole network; successively, we study the consequences of giving \emph{incentives} to member of the networks, and we quantify how this affects (i.e., reduces) the total costs of starting process that influences the whole network. For the two above problems we provide both hardness and algorithmic results. We also experimentally validate our algorithms via extensive simulations on real life networks., Comment: An extended abstract of a preliminary version of this paper appeared in: Proceedings of 22nd International Colloquium on Structural Information and Communication Complexity (SIROCCO 2015), Lectures Notes in Computer Science vol. 9439, C. Scheideler (Ed.), pp. 119-134, 2015

Published
2015

22. Dual Domination

Author

Cordasco, Gennaro, Gargano, Luisa, Rescigno, Adele Anna, Hutchison, David, Editorial Board Member, Kanade, Takeo, Editorial Board Member, Kittler, Josef, Editorial Board Member, Kleinberg, Jon M., Editorial Board Member, Mattern, Friedemann, Editorial Board Member, Mitchell, John C., Editorial Board Member, Naor, Moni, Editorial Board Member, Pandu Rangan, C., Editorial Board Member, Steffen, Bernhard, Editorial Board Member, Terzopoulos, Demetri, Editorial Board Member, Tygar, Doug, Editorial Board Member, Goos, Gerhard, Founding Editor, Hartmanis, Juris, Founding Editor, Colbourn, Charles J., editor, Grossi, Roberto, editor, and Pisanti, Nadia, editor

Published
2019
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23. Low-Weight Superimposed Codes and Their Applications

Author

Gargano, Luisa, Rescigno, Adele A., Vaccaro, Ugo, Hutchison, David, Series Editor, Kanade, Takeo, Series Editor, Kittler, Josef, Series Editor, Kleinberg, Jon M., Series Editor, Mattern, Friedemann, Series Editor, Mitchell, John C., Series Editor, Naor, Moni, Series Editor, Pandu Rangan, C., Series Editor, Steffen, Bernhard, Series Editor, Terzopoulos, Demetri, Series Editor, Tygar, Doug, Series Editor, Weikum, Gerhard, Series Editor, Chen, Jianer, editor, and Lu, Pinyan, editor

Published
2018
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24. Strong Conflict-Free Coloring of Intervals

Author

Gargano, Luisa and Rescigno, Adele A.

Subjects
Computer Science - Data Structures and Algorithms, Computer Science - Discrete Mathematics
Abstract

We consider the k-strong conflict-free coloring of a set of points on a line with respect to a family of intervals: Each point on the line must be assigned a color so that the coloring has to be conflict-free, in the sense that in every interval I there are at least k colors each appearing exactly once in I. In this paper, we present a polynomial algorithm for the general problem; the algorithm has an approximation factor 5-2/k when k\geq2 and approximation factor 2 for k=1. In the special case the family contains all the possible intervals on the given set of points, we show that a 2 approximation algorithm exists, for any k\geq1.

Published
2012

26. On k-Strong Conflict–Free Multicoloring

Author

Gargano, Luisa, Rescigno, Adele A., Vaccaro, Ugo, Hutchison, David, Series editor, Kanade, Takeo, Series editor, Kittler, Josef, Series editor, Kleinberg, Jon M., Series editor, Mattern, Friedemann, Series editor, Mitchell, John C., Series editor, Naor, Moni, Series editor, Pandu Rangan, C., Series editor, Steffen, Bernhard, Series editor, Terzopoulos, Demetri, Series editor, Tygar, Doug, Series editor, Weikum, Gerhard, Series editor, Gao, Xiaofeng, editor, Du, Hongwei, editor, and Han, Meng, editor

Published
2017
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28. Evangelism in Social Networks

Author

Cordasco, Gennaro, Gargano, Luisa, Rescigno, Adele A., Vaccaro, Ugo, Hutchison, David, Series editor, Kanade, Takeo, Series editor, Kittler, Josef, Series editor, Kleinberg, Jon M., Series editor, Mattern, Friedemann, Series editor, Mitchell, John C., Series editor, Naor, Moni, Series editor, Pandu Rangan, C., Series editor, Steffen, Bernhard, Series editor, Terzopoulos, Demetri, Series editor, Tygar, Doug, Series editor, Weikum, Gerhard, Series editor, Mäkinen, Veli, editor, Puglisi, Simon J., editor, and Salmela, Leena, editor

Published
2016
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29. A Fast and Effective Heuristic for Discovering Small Target Sets in Social Networks

Author

Cordasco, Gennaro, Gargano, Luisa, Mecchia, Marco, Rescigno, Adele A., Vaccaro, Ugo, Hutchison, David, Series editor, Kanade, Takeo, Series editor, Kittler, Josef, Series editor, Kleinberg, Jon M., Series editor, Mattern, Friedemann, Series editor, Mitchell, John C., Series editor, Naor, Moni, Series editor, Pandu Rangan, C., Series editor, Steffen, Bernhard, Series editor, Terzopoulos, Demetri, Series editor, Tygar, Doug, Series editor, Weikum, Gerhard, Series editor, Lu, Zaixin, editor, Kim, Donghyun, editor, Wu, Weili, editor, Li, Wei, editor, and Du, Ding-Zhu, editor

Published
2015
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30. Optimizing Spread of Influence in Social Networks via Partial Incentives

Author

Cordasco, Gennaro, Gargano, Luisa, Rescigno, Adele A., Vaccaro, Ugo, Hutchison, David, Series editor, Kanade, Takeo, Series editor, Kittler, Josef, Series editor, Kleinberg, Jon M., Series editor, Mattern, Friedemann, Series editor, Mitchell, John C., Series editor, Naor, Moni, Series editor, Pandu Rangan, C., Series editor, Steffen, Bernhard, Series editor, Terzopoulos, Demetri, Series editor, Tygar, Doug, Series editor, Weikum, Gerhard, Series editor, and Scheideler, Christian, editor

Published
2015
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33. An FPT Algorithm for Spanning Trees with Few Branch Vertices Parameterized by Modular-Width

Author

Luisa Gargano and Adele A. Rescigno, Gargano, Luisa, Rescigno, Adele A., Luisa Gargano and Adele A. Rescigno, Gargano, Luisa, and Rescigno, Adele A.

Abstract

The minimum branch vertices spanning tree problem consists in finding a spanning tree T of an input graph G having the minimum number of branch vertices, that is, vertices of degree at least three in T. This NP-hard problem has been widely studied in the literature and has many important applications in network design and optimization. Algorithmic and combinatorial aspects of the problem have been extensively studied and its fixed parameter tractability has been recently considered. In this paper we focus on modular-width and show that the problem of finding a spanning tree with the minimum number of branch vertices is FPT with respect to this parameter.

Published
2023
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34. Improved Algorithms and Bounds for List Union-Free Families

Author

Rescigno, Adele A. and Vaccaro, Ugo

Abstract

List union-free families are basic combinatorial structures that appear in different application scenarios, most notably in one-bit compressed sensing. In this paper, we study algorithms for the construction of list union-free families and we provide bounds on the parameters of these families that substantially affect the complexity of the algorithms that utilize them.

Published
2024
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40. Strong Conflict-Free Coloring for Intervals

Author

Cheilaris, Panagiotis, Gargano, Luisa, Rescigno, Adele A., Smorodinsky, Shakhar, Hutchison, David, editor, Kanade, Takeo, editor, Kittler, Josef, editor, Kleinberg, Jon M., editor, Mattern, Friedemann, editor, Mitchell, John C., editor, Naor, Moni, editor, Nierstrasz, Oscar, editor, Pandu Rangan, C., editor, Steffen, Bernhard, editor, Sudan, Madhu, editor, Terzopoulos, Demetri, editor, Tygar, Doug, editor, Vardi, Moshe Y., editor, Weikum, Gerhard, editor, Chao, Kun-Mao, editor, Hsu, Tsan-sheng, editor, and Lee, Der-Tsai, editor

Published
2012
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41. Optimal Time Data Gathering in Wireless Networks with Omni–Directional Antennas

Author

Bermond, Jean-Claude, Gargano, Luisa, Perénnes, Stephane, Rescigno, Adele A., Vaccaro, Ugo, Hutchison, David, Series editor, Kanade, Takeo, Series editor, Kittler, Josef, Series editor, Kleinberg, Jon M., Series editor, Mattern, Friedemann, Series editor, Mitchell, John C., Series editor, Naor, Moni, Series editor, Nierstrasz, Oscar, Series editor, Pandu Rangan, C., Series editor, Steffen, Bernhard, Series editor, Sudan, Madhu, Series editor, Terzopoulos, Demetri, Series editor, Tygar, Doug, Series editor, Vardi, Moshe Y., Series editor, Weikum, Gerhard, Series editor, Kosowski, Adrian, editor, and Yamashita, Masafumi, editor

Published
2011
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43. Gathering with Minimum Delay in Tree Sensor Networks

Author

Bermond, Jean-Claude, Gargano, Luisa, Rescigno, Adele A., Hutchison, David, editor, Kanade, Takeo, editor, Kittler, Josef, editor, Kleinberg, Jon M., editor, Mattern, Friedemann, editor, Mitchell, John C., editor, Naor, Moni, editor, Nierstrasz, Oscar, editor, Pandu Rangan, C., editor, Steffen, Bernhard, editor, Sudan, Madhu, editor, Terzopoulos, Demetri, editor, Tygar, Doug, editor, Vardi, Moshe Y., editor, Weikum, Gerhard, editor, Shvartsman, Alexander A., editor, and Felber, Pascal, editor

Published
2008
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46. Optimally Fast Data Gathering in Sensor Networks

Author

Gargano, Luisa, Rescigno, Adele A., Hutchison, David, editor, Kanade, Takeo, editor, Kittler, Josef, editor, Kleinberg, Jon M., editor, Mattern, Friedemann, editor, Mitchell, John C., editor, Naor, Moni, editor, Nierstrasz, Oscar, editor, Pandu Rangan, C., editor, Steffen, Bernhard, editor, Sudan, Madhu, editor, Terzopoulos, Demetri, editor, Tygar, Dough, editor, Vardi, Moshe Y., editor, Weikum, Gerhard, editor, Královič, Rastislav, editor, and Urzyczyn, Paweł, editor

Published
2006
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