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23 results on '"Vichitkunakorn, Panupong"'

1. Degrees and Connectivities of a Graph and Its $\delta$-Complement

Author

Srisawat, Supakorn and Vichitkunakorn, Panupong

Subjects
Mathematics - Combinatorics
Abstract

The $\delta$-complement $G_\delta$ of a graph $G$, introduced in 2022 by Pai et al., is a variant of the graph complement, where two vertices are adjacent in $G_\delta$ if and only if they are of the same degree but not adjacent in $G$ or they are of different degrees but adjacent in $G$. In this paper, we provide the Nordhaus-Gaddum-type bounds, in the spirit of Nordhaus and Gaddum (1956), over the maximum degrees, the minimum degrees, the vertex connectivities, and the edge connectivities of a graph and its $\delta$-complement. All bounds are attained except for the upper bounds on the product between the minimum degrees of a graph and its $\delta$-complement, the vertex connectivities of a graph and its $\delta$-complement, and the edge connectivities of a graph and its $\delta$-complement.

Published
2024

2. On the $\delta$-chromatic numbers of the Cartesian products of graphs

Author

Tangjai, Wipawee, Pho-on, Witsarut, and Vichitkunakorn, Panupong

Subjects
Mathematics - Combinatorics, 05C07, 05C15, 05C35, 05C38, 05C69
Abstract

In this work, we study the $\delta$-chromatic number of a graph which is the chromatic number of the $\delta$-complement of a graph. We give a structure of the $\delta$-complements and sharp bounds on the $\delta$-chromatic numbers of the Cartesian products of graphs. Furthermore, we compute the $\delta$-chromatic numbers of various classes of Cartesian product graphs, including the Cartesian products between cycles, paths, and stars.

Published
2023

3. On the δ-chromatic numbers of the Cartesian products of graphs

Author

Tangjai Wipawee, Pho-on Witsarut, and Vichitkunakorn Panupong

Subjects
δ-complement graph, chromatic number, cartesian product, coloring, 05c07, 05c15, 05c35, 05c38, 05c69, Mathematics, QA1-939
Abstract

In this work, we study the δ\delta -chromatic number of a graph, which is the chromatic number of the δ\delta -complement of a graph. We give a structure of the δ\delta -complements and sharp bounds on the δ\delta -chromatic numbers of the Cartesian products of graphs. Furthermore, we compute the δ\delta -chromatic numbers of various classes of Cartesian product graphs, including the Cartesian products among cycles, paths, and stars.

Published
2024
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4. Ramsey numbers of connected 4-clique matching

Author

Kanopthamakun, Krit and Vichitkunakorn, Panupong

Subjects
Mathematics - Combinatorics, Computer Science - Discrete Mathematics, 05C15, 05D10
Abstract

We determine the exact value of the $2$-color Ramsey number of a connected $4$-clique matching $\mathscr{C}(nK_4)$ which is a set of connected graphs containing $n$ disjoint $K_4$. That is, we show that $R_2(\mathscr{C}(nK_4)) = 13n-3$ for any positive integer $n \geq 3$. The result is an extension of the result by (Roberts, 2017) which gave that result when $n\geq 18$. We also show that the result still holds when $n=2$ provided that $R_2(2K_4) \leq 23$.

Published
2023

8. Conserved quantities of Q-systems from dimer integrable systems

Author

Vichitkunakorn, Panupong

Subjects
Mathematics - Combinatorics, Mathematics - Dynamical Systems
Abstract

We study a discrete dynamic on weighted bipartite graphs on a torus, analogous to dimer integrable systems in Goncharov-Kenyon 2013. The dynamic on the graph is an urban renewal together with shrinking all 2-valent vertices, while it is a cluster transformation on the weight. The graph is not necessary obtained from an integral polygon. We show that all Hamiltonians, partition functions of all weighted perfect matchings with a common homology class, are invariant under a move on the weighted graph. This move coincides with a cluster mutation, analog to Y-seed mutation in dimer integrable systems. We construct graphs for Q-systems of type A and B and show that the Hamiltonians are conserved quantities of the systems. The conserved quantities can be written as partition functions of hard particles on a certain graph. For type A, they Poisson commute under a nondegenerate Poisson bracket.

Published
2017
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10. Solutions to the T-systems with Principal Coefficients

Author

Vichitkunakorn, Panupong

Subjects
Mathematics - Combinatorics, Mathematics - Dynamical Systems, 13F60, 05C22, 82B20
Abstract

The $A_\infty$ T-system, also called the octahedron recurrence, is a dynamical recurrence relation. It can be realized as mutation in a coefficient-free cluster algebra (Kedem 2008, Di Francesco and Kedem 2009). We define T-systems with principal coefficients from cluster algebra aspect, and give combinatorial solutions with respect to any valid initial condition in terms of partition functions of perfect matchings, non-intersecting paths and networks. This also provides a solution to other systems with various choices of coefficients on T-systems including Speyer's octahedron recurrence (Speyer 2007), generalized lambda-determinants (Di Francesco 2013) and (higher) pentagram maps (Schwartz 1992, Ovsienko et al. 2010, Glick 2011, Gekhtman et al. 2014).

Published
2015
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12. T-systems and the pentagram map

Author

Kedem, Rinat and Vichitkunakorn, Panupong

Subjects
Mathematical Physics, Mathematics - Combinatorics
Abstract

These notes summarize two different connections between two discrete integrable systems, the $A_d$ $T$-system and its infinite-rank analog, the octahedron relation, and the pentagram map and its various generalizations., Comment: 21 pages, contribution to FDIS13, July 2013

Published
2014
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13. An evaluation of factors affecting order picking performance in the fishbone warehouse

Author

Masae, Makusee, Boonreung, Witchuda, Vichitkunakorn, Panupong, and Glock, Christoph H.

Abstract

Order picking is the process of retrieving items from storage locations to fulfil customer orders. It has been considered a key determinant of warehouse performance. To increase order picking efficiency, several planning problems need to be solved simultaneously. This research, therefore, solves the joint order picker routing and storage assignment problem in the fishbone warehouse. We evaluate the effects of four main factors, namely pick-list size, warehouse size, picker routing policy, and storage assignment policy, on the picker travel distance. Analysis of variance (ANOVA) results indicate, at a level of significance of 0.05, that each factor including all two- and three-way interactions have a statistically relevant effect on the picker travel distance, except for the three-way interactions of warehouse size, pick-list size, and routing policy. Four-way interactions are not significant at the 0.05 level. Computational results show that the combination of the aisle-by-aisle routing heuristic and within-aisle storage outperforms other combinations of routing and storage assignment heuristics. Our findings support practitioners in identifying appropriate routing and storage assignment policies for efficiently operating fishbone warehouses.

Published
2024
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15. Optimal order picker routing in a conventional warehouse with two blocks and arbitrary starting and ending points of a tour.

Author

Masae, Makusee, Glock, Christoph H., and Vichitkunakorn, Panupong

Subjects
WAREHOUSES, ORDER picking systems, OPERATIONS research, TRAVELING salesman problem, ROUTING algorithms, DYNAMIC programming, GRAPH theory
Abstract

This paper investigates manual order picking, where workers travel through the warehouse to retrieve requested items from shelves. To minimise the completion time of orders, researchers have developed various routing procedures that guide order pickers through the warehouse. The paper at hand contributes to this stream of research and proposes an optimal order picker routing policy for a conventional warehouse with two blocks and arbitrary starting and ending points of a tour. The procedure proposed in this paper extends an earlier work of Löffler et al. (2018. Picker routing in AGV-assisted order picking systems, Working Paper, DPO-01/2018, Deutsche Post Chair-Optimization of Distribution Networks, RWTH Aachen University, 2018) by applying the concepts of Ratliff and Rosenthal (1983. "Order-picking in a Rectangular Warehouse: a Solvable Case of the Traveling Salesman Problem." Operations Research 31 (3): 507–521) and Roodbergen and de Koster (2001a. "Routing Order Pickers in a Warehouse with a Middle Aisle." European Journal of Operational Research 133 (1): 32–43) that used graph theory and dynamic programming for finding an optimal picker route. We also propose a routing heuristic, denoted S*-shape, for conventional two-block warehouses with arbitrary starting and ending points of a tour. In computational experiments, we compare the average order picking tour length in a conventional warehouse with a single block to the case of a conventional warehouse with two blocks to assess the impact of the middle cross aisle on the performance of the warehouse. Furthermore, we evaluate the performance of the S*-shape heuristic by comparing it to the exact algorithm proposed in this study. [ABSTRACT FROM AUTHOR]

Published
2020
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19. Optimal order picker routing in the chevron warehouse.

Author

Masae, Makusee, Glock, Christoph H., and Vichitkunakorn, Panupong

Subjects
ORDER picking systems, WAREHOUSES, ROUTING algorithms, DYNAMIC programming, GRAPH theory, OPERATING costs
Abstract

Order picking has often been considered as one of the most labor- and time-intensive tasks in warehouse operations. Among the various planning problems that have to be solved in manual picker-to-parts systems, the routing of the order picker usually accounts for the highest share of the total warehouse operating cost. To minimize the cost of order picking, researchers have developed various routing procedures that guide the order picker through the warehouse to complete given customer orders. For some warehouse layouts such as the chevron warehouse, an optimal routing algorithm has not yet been proposed. This article, therefore, contributes to filling this research gap by developing an optimal order picker routing policy for the chevron warehouse. The optimal routing algorithm proposed in this article is based on the concept of graph theory and utilizes a dynamic programming procedure. In addition, we propose various simple routing heuristics for the chevron warehouse. In computational experiments, the average order picking tour lengths resulting from optimal routing and from the simple heuristics are compared. Moreover, we compare the performance of the chevron warehouse to the conventional two-block warehouse under various conditions using the tour lengths obtained by the optimal algorithms. [ABSTRACT FROM AUTHOR]

Published
2020
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20. A numerical method for fractional pantograph differential equations based on Taylor wavelets.

Author

Vichitkunakorn, Panupong, Vo, Thieu N, and Razzaghi, Mohsen

Subjects
*FRACTIONAL integrals, *ALGEBRAIC equations, *FRACTIONAL differential equations
Abstract

We present an efficient numerical method for solving fractional pantograph differential equations by applying Taylor wavelets. We give an exact formula for the Riemann-Liouville fractional integral of the Taylor wavelets. We then apply the given formula to reduce our problem to the problem of solving a system of algebraic equations. Several examples are included to show the the effectiveness of our numerical method and in comparison with previous methods. [ABSTRACT FROM AUTHOR]

Published
2020
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