G. Arunkumar scite author profile

We establish a connection between root multiplicities for Borcherds-Kac-Moody algebras and graph coloring. We show that the generalized chromatic polynomial of the graph associated to a given Borcherds algebra can be used to give a closed formula for certain root multiplicities. Using this connection we give a second interpretation, namely that the root multiplicity of a given root coincides with the number of acyclic orientations with a unique sink of a certain graph (depending on the root). Finally, using the combinatorics of Lyndon words we construct a basis for the root spaces corresponding to these roots and determine the Hilbert series in the case when all simple roots are imaginary. As an application we give a Lie theoretic proof of Stanley's reciprocity theorem of chromatic polynomials.

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Probabilistic Approach for Visual Homing of a Mobile Robot in the Presence of Dynamic Obstacles

Sabnis

Arunkumar

Dwaracherla

et al. 2016

IEEE Trans. Ind. Electron.

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The Peterson recurrence formula for the chromatic discriminant of a graph

Arunkumar¹

2018

Indian J Pure Appl Math

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The absolute value of the coefficient of q in the chromatic polynomial of a graph G is known as the chromatic discriminant of G and is denoted α(G). There is a well known recurrence formula for α(G) that comes from the deletion-contraction rule for the chromatic polynomial. In this paper we prove another recurrence formula for α(G) that comes from the theory of Kac-Moody Lie algebras. We start with a brief survey on many interesting algebraic and combinatorial interpretations of α(G). We use two of these interpretations (in terms of acyclic orientations and spanning trees) to give two bijective proofs for our recurrence formula of α(G).2010 Mathematics Subject Classification. 05C20, 05C30, 05C31.

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Robust Steering Control for Autonomous Homing and its Application in Visual Homing under Practical Conditions

Arunkumar

Sabnis

Vachhani

2017

J Intell Robot Syst

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G. Arunkumar

The Wiener index of the zero-divisor graph of a finite commutative ring with unity

Root multiplicities for Borcherds algebras and graph coloring

Probabilistic Approach for Visual Homing of a Mobile Robot in the Presence of Dynamic Obstacles

The Peterson recurrence formula for the chromatic discriminant of a graph

Robust Steering Control for Autonomous Homing and its Application in Visual Homing under Practical Conditions

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