Queens Independence Separation on Rectangular Chessboards

Sowndarya Suseela Padma Kaluri; Y Lakshmi Naidu

doi:10.22342/jims.27.2.986.158-169

Sowndarya Suseela Padma Kaluri ⁽¹⁾ , Y Lakshmi Naidu ⁽²⁾

(1) Department of Mathematics and Computer Science, Sri Sathya Sai Institute of Higher Learning, India,

(2) Department of Mathematics and Computer Science, Sri Sathya Sai Institute of Higher Learning, India

https://doi.org/10.22342/jims.27.2.986.158-169

Issue
VOLUME 27 NUMBER 2 (July 2021)

Submitted
February 9, 2021

Accepted
June 10, 2021

Published
July 16, 2021

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Abstract

The famous eight queens problem with non-attacking queens placement on an 8 x 8 chessboard was first posed in the year 1848. The queens separation problem is the legal placement of the fewest number of pawns with the maximum number of independent queens placed on an N x N board which results in a separated board. Here a legal placement is defined as the separation of attacking queens by pawns. Using this concept, the current study extends the queens separation problem onto the rectangular board M x N, (M<N), to result in a separated board with the maximum number of independent queens. The research work here first describes the M+k queens separation with k=1 pawn and continue to find for any k. Then it focuses on finding the symmetric solutions of the M+k queens separation with k pawns.

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References

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Authors

Sowndarya Suseela Padma Kaluri

Department of Mathematics and Computer Science, Sri Sathya Sai Institute of Higher Learning

kspsowndarya44@gmail.com (Primary Contact)

Y Lakshmi Naidu

Department of Mathematics and Computer Science, Sri Sathya Sai Institute of Higher Learning

Kaluri, S. S. P., & Naidu, Y. L. (2021). Queens Independence Separation on Rectangular Chessboards. Journal of the Indonesian Mathematical Society, 27(2), 158–169. https://doi.org/10.22342/jims.27.2.986.158-169