This research is based on the idea of replacing what the sites contain in the e-abacus diagram with each other and then representing the new diagram (derived from the original diagram) and knowing the value of its partition (as a type of hidden coding of the origin of the diagram or in the sense of the opposite diagram).
Mathas, A. (1999) Iwahori-Hecke Algebras and Schur Algebras of the Symmetric Group. University Lecture Series, 15, 188 p. http://doi.org/10.1090/ulect/015/02
James, G. (1978) Some Combinatorial Results Involving Young Diagrams. Mathematical Proceedings of the Cambridge Philosophical Society, 83, 1-10.
http://doi.org/10.1017/S0305004100054220
Mahmood, A.S. (2011) On the Intersection of Young’s Diagrams Core. Journal of Education and Science, 24, 149-157. http://doi.org/10.33899/edusj.1999.58795
Mahmood, A.B. and Mahmood, A.S. (2019) Secret-Word by E-Abacus Diagram I. Iraqi Journal of Science, 60, 638-646.
http://www.researchgate.net/publication/332058738
Mahmood, A.B. and Mahmood, A.S. (2019) Secret-Text by E-Abacus Diagram II. Iraqi Journal of Science, 60, 840-846.
http://www.researchgate.net/publication/332786557
Shareef, R.J. and Mahmood, A.S. (2019) The Movement of Orbits and Their Effect on the Encoding of Letters in Partition Theory. Open Access Library Journal, 6, 1-7.
http://doi.org/10.4236/oalib.1105834
Sami, H.H. and Mahmood, A.S. (2020) Encoding Syriac Letters in Partition Theory Using Extended Vigenere Cipher. Eastern-European Journal of Enterprise Technologies, 1, 37-46.
