Ayan Nandy scite author profile

Ayan Nandy

5Publications

19Citation Statements Received

50Citation Statements Given

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Affiliations

NIIT (India), Indian Statistical Institute, NIIT University

Publications

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Outerplanar and Planar Oriented Cliques

Nandy

Sen

Sopena

2015

Journal of Graph Theory

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The clique number of an undirected graph G is the maximum order of a complete subgraph of G and is a well-known lower bound for the chromatic number of G. Every proper k-coloring of G may be viewed as a homomorphism (an edge-preserving vertex mapping) of G to the complete graph of order k. By considering homomorphisms of oriented graphs (digraphs without cycles of length at most 2), we get a natural notion of (oriented) colorings and oriented chromatic number of oriented graphs. An oriented clique is then an oriented graph whose number of vertices and oriented chromatic number coincide. However, the structure of oriented cliques is much less understood than in the undirected case. In this article, we study the structure of outerplanar and planar oriented cliques. We first provide a list of 11 graphs and prove that an outerplanar graph can be oriented as an oriented clique if and only if it contains one of these graphs as a spanning subgraph. Klostermeyer and MacGillivray conjectured that the order of a planar oriented clique is at most 15, which was later proved by Sen. We show that any planar oriented clique on 15 vertices must contain a

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Radius, Diameter, Incenter, Circumcenter, Width and Minimum Enclosing Cylinder for Some Polyhedral Distance Functions

Das

Nandy

Sarvottamananda

2018

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Outerplanar and planar oriented cliques

Nandy¹,

Sen²,

Sopena³

2014

Preprint

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Linear Time Algorithms for Euclidean 1-Center in $$\mathfrak {R}^d$$ with Non-linear Convex Constraints

Das

Nandy

Sarvottamananda

2016

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Linear time algorithms for Euclidean 1-center in ℜd with non-linear convex constraints

Das

Nandy

Sarvottamananda

2020

Discrete Applied Mathematics

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Ayan Nandy

Outerplanar and Planar Oriented Cliques

Radius, Diameter, Incenter, Circumcenter, Width and Minimum Enclosing Cylinder for Some Polyhedral Distance Functions

Outerplanar and planar oriented cliques

Linear Time Algorithms for Euclidean 1-Center in $$\mathfrak {R}^d$$ with Non-linear Convex Constraints

Linear time algorithms for Euclidean 1-center in ℜd with non-linear convex constraints

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