Lilanthi Samarasekara scite author profile

Lilanthi Samarasekara

5Publications

35Citation Statements Received

18Citation Statements Given

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Affiliations

University of Colombo

Publications

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The size, multipartite Ramsey numbers for C3 versus all graphs up to 4 vertices

Jayawardene¹,

Samarasekara²

2017

J. Natn. Sci. Foundation Sri Lanka

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Let the star on n vertices, namely K1,n−1 be denoted by Sn. If every two coloring of the edges of a complete balanced multipartite graph Kj×s there is a copy of Sn in the first color or a copy of Sm in the second color, then we will say Kj×s → (Sn, Sm). The size Ramsey multipartite number mj(Sn, Sm) is the smallest natural number s such that Kj×s → (Sn, Sm). In this paper, we obtain the exact values of the size Ramsey numbers mj(Sn, Sm) for n, m 3 and j 3.

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Size multipartite Ramsey numbers for stripes versus small cycles

Jayawardene

Baskoro

Samarasekara

et al. 2016

ejgta

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Size Multipartite Ramsey Numbers for K4-e Versus all Graphs up to 4 Vertices

Jayawardene¹,

Samarasekara²

2017

APAM

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A strict upper bound for size multipartite Ramsey numbers of paths versus stars

Jayawardene

Samarasekara

2017

IJC

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Let P n represent the path of size n. Let K 1,m−1 represent a star of size m and be denoted by S m . Given a two coloring of the edges of a complete graph K j×s we say that K j×s → (P n , S m+1 ) if there is a copy of P n in the first color or a copy of S m+1 in the second color. The size Ramsey multipartite number m j (P n , S m+1 ) is the smallest natural number s such that K j×s → (P n , S m+1 ).Given j, n, m if s = n + m − 1 − k j − 1 , in this paper, we show that the size Ramsey numbers m j (P n , S m+1 ) is bounded above by s for k = n − 1 j . Given j ≥ 3 and s, we will obtain an infinite class (n, m) that achieves this upper bound s. In the later part of the paper, will also investigate necessary and sufficient conditions needed for the upper bound to hold.

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A Ramsey problem related to butterfly graph vs. proper connected subgraphs of K4

Jayawardene¹,

Samarasekara²

2019

Preprint

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