A square matrix of distinct numbers in which every row, column and both diagonals have the same total is referred to as a magic square. Constructing a magic square of a given order is considered a difficult computational problem, particularly when additional constraints are imposed. Hyper-heuristics are emerging high-level search methodologies that explore the space of heuristics for solving a given problem. In this study, we present a range of effective selection hyper-heuristics mixing perturbative low-level heuristics for constructing the constrained version of magic squares. The results show that selection hyper-heuristics, even the non-learning ones deliver an outstanding performance, beating the best-known heuristic solution on averag...
This paper shows how to create magic squares with perfect square sum of entries. There are three typ...
Počevši od poznatog Lo Shu kvadrata razvila se cijela priča o magičnim kvadratima. Njihova ljepota i...
How rare are magic squares? So far, the exact number of magic squares of order n is only known for n...
A square matrix of distinct numbers in which every row, column and both diagonals has the same total...
A square matrix of distinct numbers in which every row, column and both diagonals have the same tota...
UKCI 2015: UK Workshop on Computational Intelligence, University of Exeter, UK, 7-9 September 2015A ...
Abstract:- I found the magic square a simple problem with a very rich combinatorics: there are (n2)!...
Hyper-heuristics have emerged as a way to raise the level of generality of search techniques for com...
In this expository paper, we show how to use the Douglas—Rachford algorithm as a successful heuristi...
Hyper-heuristics comprise a set of approaches that are motivated (at least in part) by the goal of a...
This thesis aims to construct a computer program that generates a magic square of any order greater ...
Although the number of solutions in combinatorial optimization problems (COPs) is finite, some probl...
Description a collection of efficient, vectorized algorithms for the creation and investigation of m...
Water Retention on Magic Squares is the hard combinatorial optimisation problem of searching for mag...
In this paper we introduce two Algorithms, the first Algorithms when it is odd order and how we calc...
This paper shows how to create magic squares with perfect square sum of entries. There are three typ...
Počevši od poznatog Lo Shu kvadrata razvila se cijela priča o magičnim kvadratima. Njihova ljepota i...
How rare are magic squares? So far, the exact number of magic squares of order n is only known for n...
A square matrix of distinct numbers in which every row, column and both diagonals has the same total...
A square matrix of distinct numbers in which every row, column and both diagonals have the same tota...
UKCI 2015: UK Workshop on Computational Intelligence, University of Exeter, UK, 7-9 September 2015A ...
Abstract:- I found the magic square a simple problem with a very rich combinatorics: there are (n2)!...
Hyper-heuristics have emerged as a way to raise the level of generality of search techniques for com...
In this expository paper, we show how to use the Douglas—Rachford algorithm as a successful heuristi...
Hyper-heuristics comprise a set of approaches that are motivated (at least in part) by the goal of a...
This thesis aims to construct a computer program that generates a magic square of any order greater ...
Although the number of solutions in combinatorial optimization problems (COPs) is finite, some probl...
Description a collection of efficient, vectorized algorithms for the creation and investigation of m...
Water Retention on Magic Squares is the hard combinatorial optimisation problem of searching for mag...
In this paper we introduce two Algorithms, the first Algorithms when it is odd order and how we calc...
This paper shows how to create magic squares with perfect square sum of entries. There are three typ...
Počevši od poznatog Lo Shu kvadrata razvila se cijela priča o magičnim kvadratima. Njihova ljepota i...
How rare are magic squares? So far, the exact number of magic squares of order n is only known for n...