Your search keyword '"Manoj Changat"' showing total 14 results

1. First-order logic with metric betweenness – the case of non-definability of some graph classes

Author

Jeny Jacob and Manoj Changat

Subjects

First-order logic, n-colorable, n-connected, perfect graph, probe chordal, matching, Mathematics, QA1-939

Abstract

The metric betweenness of a connected graph and arbitrary graphs is FO definable. Moreover, several interesting classes of graphs with strong distance properties are shown to be FO definable using metric betweenness. However, there are different classes that do not possess such an FO axiomatization. The main goal of this note is to show that certain classes of graphs do not allow an axiomatization in First-Order Logic with Betweenness (FOLB).

Published

2024

2. Axiomatic characterization of the interval function of partial cubes and partial Hamming graphs

Author

Jeny Jacob, Manoj Changat, Lekshmi Kamal K. Sheela, Abhirami R. S, and Amrutha U.A.

Subjects

Partial Hamming graph, partial cube, interval function, transit function, Mathematics, QA1-939

Abstract

AbstractInterval function of a graph is a well-known notion in metric graph theory and the axiomatic characterization using a set of first order axioms of different graph classes is an interesting problem in this area. Partial cubes and partial Hamming graphs form one of the central graph class that can be embedded into hypercubes and Hamming graphs respectively. In this paper we present an axiomatic characterization of the interval function of partial cubes and partial Hamming graphs, using different first order axioms. Further, we give an axiomatic characterization of the interval function of these graphs using axioms on an arbitrary function R on V.

Published

2024

3. Tolerant Radon partitions on the all-paths convexity in graphs

Author

Sreekumar Sreedharan and Manoj Changat

Subjects

All-paths convexity, Radon partition, t-tolerant Radon partition, 05C12, 05C38, 52B05, Mathematics, QA1-939

Abstract

AbstractIn a graph G, the all-paths transit function A(u, v), consists of the set of all vertices in the graph G which lies in some path connecting u and v. Convexity obtained by the all-paths transit function is called all-paths convexity. A partition of a set P of vertices of a graph G into two disjoint non-empty subsets is called a Radon partition if the convex hulls of the subsets intersect. A Radon partition (P0, Q0) of P into nonempty subsets is called t-tolerant Radon partition, if for any set [Formula: see text] with [Formula: see text], the intersection of the convex hulls [Formula: see text]. Here we study the t-tolerant Radon number of G with respect to all-paths convexity. It is the minimum number k such that any collection of k vertices of G has t-tolerant Radon partition. We prove that if G has only one block, then [Formula: see text] whenever [Formula: see text]. Finally, we prove that if the block-cut vertex tree representation of G is a path then [Formula: see text], and if the block-cut vertex tree representation of G is a tree that is not a path then [Formula: see text].

Published

2024

4. Axiomatic characterizations of Ptolemaic and chordal graphs

Author

Manoj Changat, Lekshmi Kamal K. Sheela, and Prasanth G. Narasimha-Shenoi

Subjects

interval function, betweenness axioms, ptolemaic graphs, transit function, induced path transit function, Applied mathematics. Quantitative methods, T57-57.97

Abstract

The interval function and the induced path function are two well studied class of set functions of a connected graph having interesting properties and applications to convexity, metric graph theory. Both these functions can be framed as special instances of a general set function termed as a transit function defined on the Cartesian product of a non-empty set \(V\) to the power set of \(V\) satisfying the expansive, symmetric and idempotent axioms. In this paper, we propose a set of independent first order betweenness axioms on an arbitrary transit function and provide characterization of the interval function of Ptolemaic graphs and the induced path function of chordal graphs in terms of an arbitrary transit function. This in turn gives new characterizations of the Ptolemaic and chordal graphs.

Published

2023

5. Transit sets of -point crossover operators

Author

Manoj Changat, Prasanth G. Narasimha-Shenoi, Ferdoos Hossein Nezhad, Matjaž Kovše, Shilpa Mohandas, Abisha Ramachandran, and Peter F. Stadler

Subjects

genetic algorithms, recombination, transit functions, betweenness, vapnik–chervonenkis dimension, Mathematics, QA1-939

Abstract

-point crossover operators and their recombination sets are studied from different perspectives. We show that transit functions of -point crossover generate, for all , the same convexity as the interval function of the underlying graph. This settles in the negative an open problem by Mulder about whether the geodesic convexity of a connected graph is uniquely determined by its interval function . The conjecture of Gitchoff and Wagner that for each transit set distinct from a hypercube there is a unique pair of parents from which it is generated is settled affirmatively. Along the way we characterize transit functions whose underlying graphs are Hamming graphs, and those with underlying partial cube graphs. For general values of it is shown that the transit sets of -point crossover operators are the subsets with maximal Vapnik–Chervonenkis dimension.

Published

2020

6. Betweenness in graphs: A short survey on shortest and induced path betweenness

Author

Manoj Changat, Prasanth G. Narasimha-Shenoi, and Geetha Seethakuttyamma

Subjects

betweenness, interval function, induced path function, Mathematics, QA1-939

Abstract

Betweenness is a universal notion present in several disciplines of mathematics. The notion of betweenness has a profound history and many pioneers like Euclid, Pasch, Hilbert have studied betweenness axiomatically. In discrete mathematics too, betweenness is present and several authors have worked on this concept from an axiomatic view. In graph theory, betweenness is developed mainly as metric betweenness, studied using the shortest path metric in a connected graph, thus resulting in the notion of the interval function. Many interesting results are available in graph theory using the interval function. The interval function is generalized to induced path function by replacing shortest paths by induced paths. The induced path betweenness also captured attention among graph theorists with several interesting results to date. From an axiomatic point of view, two pertinent questions can be framed on these functions. Is it possible to axiomatically characterize the interval function of some special graphs using some set of first order axioms defined on an arbitrary transit function? Is it possible to characterize the graphs with the help of their interval functions? In this paper, we survey the results as answers to these questions available from the research papers.

Published

2019

7. A Note on the Interval Function of a Disconnected Graph

Author

N. Narayanan, Ferdoss Hossein Nezhad, Henry Martyn Mulder, and Manoj Changat

Subjects

disconnected graph, 0102 computer and information sciences, Strength of a graph, 01 natural sciences, law.invention, Combinatorics, law, Line graph, 05c38, QA1-939, Discrete Mathematics and Combinatorics, 05c12, 0101 mathematics, interval function, Graph property, Complement graph, Mathematics, Distance-hereditary graph, Discrete mathematics, Applied Mathematics, 010102 general mathematics, Voltage graph, Interval graph, axiomatic characterization, Mathematics::Logic, TheoryofComputation_MATHEMATICALLOGICANDFORMALLANGUAGES, 010201 computation theory & mathematics, 05c05, transit function, Null graph

Abstract

In this note we extend the Mulder-Nebeský characterization of the interval function of a connected graph to the disconnected case. One axiom needs to be adapted, but also a new axiom is needed in addition.

Published

2018

8. Transit sets of k-point crossover operators

Author

Peter F. Stadler, Shilpa Mohandas, Matjaž Kovše, Ferdoos Hossein Nezhad, Abisha Ramachandran, Prasanth G. Narasimha-Shenoi, and Manoj Changat

Subjects

Conjecture, Open problem, lcsh:Mathematics, 010102 general mathematics, Crossover, Vapnik–Chervonenkis dimension, 0102 computer and information sciences, Genetic algorithms, lcsh:QA1-939, 01 natural sciences, Convexity, Recombination, Combinatorics, Transit functions, Betweenness, Hamming graph, 010201 computation theory & mathematics, Discrete Mathematics and Combinatorics, Geodesic convexity, Hypercube, 0101 mathematics, Connectivity, Mathematics

Abstract

k -point crossover operators and their recombination sets are studied from different perspectives. We show that transit functions of k -point crossover generate, for all k > 1 , the same convexity as the interval function of the underlying graph. This settles in the negative an open problem by Mulder about whether the geodesic convexity of a connected graph G is uniquely determined by its interval function I . The conjecture of Gitchoff and Wagner that for each transit set R k ( x , y ) distinct from a hypercube there is a unique pair of parents from which it is generated is settled affirmatively. Along the way we characterize transit functions whose underlying graphs are Hamming graphs, and those with underlying partial cube graphs. For general values of k it is shown that the transit sets of k -point crossover operators are the subsets with maximal Vapnik–Chervonenkis dimension.

Published

2020

9. Algorithms and Discrete Applied Mathematics : 6th International Conference, CALDAM 2020, Hyderabad, India, February 13–15, 2020, Proceedings

Author

Manoj Changat, Sandip Das, Manoj Changat, and Sandip Das

Subjects

Mathematics—Data processing, Computer science—Mathematics, Computer science, Data structures (Computer science), Information theory

Abstract

This book constitutes the proceedings of the 6th International Conference on Algorithms and Discrete Applied Mathematics, CALDAM 2020, held in Hyderabad, India, in February 2020. The 38 papers presented together with 2 invited talks in this volume were carefully reviewed and selected from 102 submissions. The papers are organized in topical sections on graph algorithms, graph theory, combinatorial optimization, distributed algorithms, combinatorial algorithms, and computational complexity.

Published

2020

10. On Gated Sets in Graphs

Author

Abisha Ramachandran, Manoj Changat, and Iztok Peterin

Subjects

convex geometry, General Mathematics, 0102 computer and information sciences, 01 natural sciences, Combinatorics, Computer Science::Hardware Architecture, weakly modular graph, Pathwidth, Computer Science::Emerging Technologies, TheoryofComputation_ANALYSISOFALGORITHMSANDPROBLEMCOMPLEXITY, gated set, 0101 mathematics, Mathematics, Discrete mathematics, Block graph, Convex geometry, 010102 general mathematics, Neighbourhood (graph theory), 52A01, Vertex (geometry), Modular decomposition, 010201 computation theory & mathematics, Independent set, Shortest path problem, 05C75, MathematicsofComputing_DISCRETEMATHEMATICS

Abstract

A subset $K$ of vertices of a graph $G$ is gated if for every vertex $x \in V(G)$ there exists a gate $v \in K$ which is on a shortest path between $x$ and any vertex $u$ of $K$. We give a characterization of gated sets in an arbitrary graph $G$ and several necessary conditions. This characterization yields very nice results in the case of weakly modular graphs, which are also presented. We also show that the trees are precisely the graphs which present a convex geometry with respect to the gated convexity.

Published

2016

11. Convexities related to path properties on graphs

Author

Gerard Sierksma, Henry Martyn Mulder, Manoj Changat, Research programme OPERA, and Econometrics

Subjects

Discrete mathematics, Block graph, NUMBERS, SETS, Induced path, convexity, Clique graph, Longest path problem, Theoretical Computer Science, Combinatorics, Pathwidth, induced path, transit function, Discrete Mathematics and Combinatorics, Path graph, Cograph, Distance, geodesic, Mathematics

Abstract

A feasible family of paths in a connected graph G is a family that contains at least one path between any pair of vertices in G. Any feasible path family defines a convexity on G. Well-known instances are: the geodesics, the induced paths, and all paths. We propose a more general approach for such 'path properties'. We survey a number of results from this perspective, and present a number of new results. We focus on the behaviour of such convexities on the Cartesian product of graphs and on the classical convexity invariants, such as the Caratheodory, Helly and Radon numbers in relation with Graph invariants, such as the clique number and other Graph properties. (c) 2004 Elsevier B.V. All rights reserved.

Published

2005

12. ALMOST SELF-CENTERED MEDIAN AND CHORDAL GRAPHS

Author

Kannan Balakrishnan, Boštjan Brešar, Manoj Changat, Sandi Klavžar, Iztok Peterin, and Ajitha R. Subhamathi

Subjects

chordal graph, 90B80, General Mathematics, 05C75, diameter, median graph, almost self-centered graph, 05C12, radius

Abstract

Almost self-centered graphs were recently introduced as the graphs with exactly two non-central vertices. In this paper we characterize almost self-centered graphs among median graphs and among chordal graphs. In the first case $P_4$ and the graphs obtained from hypercubes by attaching to them a single leaf are the only such graphs. Among chordal graph the variety of almost self-centered graph is much richer, despite the fact that their diameter is at most 3. We also discuss almost self-centered graphs among partial cubes and among $k$-chordal graphs, classes of graphs that generalize median and chordal graphs, respectively. Characterizations of almost self-centered graphs among these two classes seem elusive.

Published

2012

13. Computing median and antimedian sets in median graphs.

Author

Kannan Balakrishnan, Boštjan Brešar, Manoj Changat, Sandi Klavžar, Matjaž Kovše, and Ajitha Subhamathi

Subjects

SET theory, GRAPHIC methods, COMPUTATIONAL complexity, MATHEMATICAL functions, ALGORITHMS, DIMENSIONS, MEDIAN (Mathematics)

Abstract

Abstract  The median (antimedian) set of a profile π=(u 1,…,u k ) of vertices of a graph G is the set of vertices x that minimize (maximize) the remoteness ∑ i d(x,u i ). Two algorithms for median graphs G of complexity O(n idim(G)) are designed, where n is the order and idim(G) the isometric dimension of G. The first algorithm computes median sets of profiles and will be in practice often faster than the other algorithm which in addition computes antimedian sets and remoteness functions and works in all partial cubes. [ABSTRACT FROM AUTHOR]

Published

2010

14. The median function on graphs with bounded profiles

Author

Kannan Balakrishnan, Sandi Klavar, and Manoj Changat

Subjects

Discrete mathematics, Graph center, Consensus, Applied Mathematics, Median graph, Neighbourhood (graph theory), Median function, Consensus strategy, Vertex (geometry), Combinatorics, Graph power, Independent set, Bounded function, Discrete Mathematics and Combinatorics, Local property, Bound graph, Mathematics

Abstract

The median of a profile @p=(u"1,...,u"k) of vertices of a graph G is the set of vertices x that minimize the sum of distances from x to the vertices of @p. It is shown that for profiles @p with diameter @q the median set can be computed within an isometric subgraph of G that contains a vertex x of @p and the r-ball around x, where r>[email protected]@q/|@p|. The median index of a graph and r-joins of graphs are introduced and it is shown that r-joins preserve the property of having a large median index. Consensus strategies are also briefly discussed on a graph with bounded profiles.