Igor Malinović scite author profile

Igor Malinović

5Publications

52Citation Statements Received

121Citation Statements Given

How they've been cited

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116

Affiliations

École Polytechnique Fédérale de Lausanne

Publications

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Clustered Planarity Testing Revisited

Fulek

Kynčl

Malinović

et al. 2014

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The Hanani-Tutte theorem is a classical result proved for the first time in the 1930s that characterizes planar graphs as graphs that admit a drawing in the plane in which every pair of edges not sharing a vertex cross an even number of times. We generalize this result to clustered graphs with two disjoint clusters, and show that a straightforward extension to flat clustered graphs with three or more disjoint clusters is not possible. For general clustered graphs we show a variant of the Hanani-Tutte theorem in the case when each cluster induces a connected subgraph.Di Battista and Frati proved that clustered planarity of embedded clustered graphs whose every face is incident to at most five vertices can be tested in polynomial time. We give a new and short proof of this result, using the matroid intersection algorithm.

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A PTAS for the Time-Invariant Incremental Knapsack Problem

Faenza

Malinović

2018

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The Time-Invariant Incremental Knapsack problem (IIK) is a generalization of Maximum Knapsack to a discrete multi-period setting. At each time, capacity increases and items can be added, but not removed from the knapsack. The goal is to maximize the sum of profits over all times. IIK models various applications including specific financial markets and governmental decision processes. IIK is strongly NP-hard [7] and there has been work [7,8,11,21,23] on giving approximation algorithms for some special cases. In this paper, we settle the complexity of IIK by designing a PTAS based on rounding a disjuncive formulation, and provide several extensions of the technique.

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On bounded pitch inequalities for the min-knapsack polytope

Faenza¹,

Malinović²,

Mastrolilli³

et al. 2018

Preprint

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On inequalities with bounded coefficients and pitch for the min knapsack polytope

Bienstock

Faenza

Malinović

et al. 2022

Discrete Optimization

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Clustered Planarity Testing Revisited

Fulek¹,

Kynčl²,

Malinović³

et al. 2015

Electron. J. Combin.

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The Hanani–Tutte theorem is a classical result proved for the first time in the 1930s that characterizes planar graphs as graphs that admit a drawing in the plane in which every pair of edges not sharing a vertex cross an even number of times. We generalize this result to clustered graphs with two disjoint clusters, and show that a straightforward extension to flat clustered graphs with three or more disjoint clusters is not possible. For general clustered graphs we show a variant of the Hanani–Tutte theorem in the case when each cluster induces a connected subgraph.Di Battista and Frati proved that clustered planarity of embedded clustered graphs whose every face is incident with at most five vertices can be tested in polynomial time. We give a new and short proof of this result, using the matroid intersection algorithm.

show abstract

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Igor Malinović

Clustered Planarity Testing Revisited

A PTAS for the Time-Invariant Incremental Knapsack Problem

On bounded pitch inequalities for the min-knapsack polytope

On inequalities with bounded coefficients and pitch for the min knapsack polytope

Clustered Planarity Testing Revisited

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