Marta Borowiecka-Olszewska scite author profile

Marta Borowiecka-Olszewska

5Publications

71Citation Statements Received

101Citation Statements Given

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101

Affiliations

University of Zielona Góra

Publications

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Lévy processes and stochastic integrals in the sense of generalized convolutions

Borowiecka-Olszewska¹,

Jasiulis-Gołdyn²,

Misiewicz³

et al. 2015

Bernoulli

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In this paper, we present a comprehensive theory of generalized and weak generalized convolutions, illustrate it by a large number of examples, and discuss the related infinitely divisible distributions. We consider Lévy and additive process with respect to generalized and weak generalized convolutions as certain Markov processes, and then study stochastic integrals with respect to such processes. We introduce the representability property of weak generalized convolutions. Under this property and the related weak summability, a stochastic integral with respect to random measures related to such convolutions is constructed.

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The deficiency of all generalized Hertz graphs and minimal consecutively non-colourable graphs in this class

Borowiecka-Olszewska

Drgas-Burchardt

2016

Discrete Mathematics

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On the structure and deficiency of k-trees with bounded degree

Borowiecka-Olszewska

Drgas-Burchardt

Hałuszczak

2016

Discrete Applied Mathematics

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Consecutive Colouring of Oriented Graphs

et al. 2021

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We consider arc colourings of oriented graphs such that for each vertex the colours of all out-arcs incident with the vertex and the colours of all in-arcs incident with the vertex form intervals. We prove that the existence of such a colouring is an NP-complete problem. We give the solution of the problem for r-regular oriented graphs, transitive tournaments, oriented graphs with small maximum degree, oriented graphs with small order and some other classes of oriented graphs. We state the conjecture that for each graph there exists a consecutive colourable orientation and confirm the conjecture for complete graphs, 2-degenerate graphs, planar graphs with girth at least 8, and bipartite graphs with arboricity at most two that include all planar bipartite graphs. Additionally, we prove that the conjecture is true for all perfect consecutively colourable graphs and for all forbidden graphs for the class of perfect consecutively colourable graphs.

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Forbidden structures for planar perfect consecutively colourable graphs

Borowiecka-Olszewska¹,

Drgas-Burchardt²

2017

Discuss. Math. Graph Theory

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A consecutive colouring of a graph is a proper edge colouring with positive integers in which the colours of edges incident with each vertex form an interval of integers. The idea of this colouring was introduced in 1987 by Asratian and Kamalian under the name of interval colouring. Sevastjanov showed that the corresponding decision problem is N P -complete even restricted to the class of bipartite graphs. We focus our attention on the class of consecutively colourable graphs whose all induced subgraphs are consecutively colourable, too. We call elements of this class perfect consecutively colourable to emphasise the conceptual similarity to perfect graphs. Obviously, the class of perfect consecutively colourable graphs is induced hereditary, so it can be characterized by the family of induced forbidden graphs. In this work we give a necessary and sufficient conditions that must be satisfied by the generalized Sevastjanov rosette to be an induced forbidden graph for the class of perfect consecutively colourable graphs. Along the way, we show the exact values of the deficiency of all generalized Sevastjanov rosettes, which improves the earlier known estimating result. It should be mentioned that the deficiency of a graph measures its closeness to the class of consecutively colourable graphs. We motivate the investigation of graphs considered here by showing their connection to the class of planar perfect consecutively colourable graphs.

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