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Makes self-orthogonal diagonal Latin squares, SODLS,
for all valid orders, (that is, not order 2, 3, or 6).
Input is an order, (one number), or an order range,
(two numbers separated by white space).
Output files are in folder SODLS[_n].
Each file contains a SODLS followed by a magic square.
The magic square, M, is made from the order N SODLS, Q,
and its transpose, as:
M[row][col] = N x Q[row][col] + Q[col][row] + 1
See http://budshaw.ca/SODLS.html
http://budshaw.ca/addenda/SODLSmethods.html
http://budshaw.ca/addenda/SODLSnotes.html
http://budshaw.ca/Download.html#sodls
Features
- minimum of 1 SODLS for any order
- many SODLS for some orders
- magic squares, SODLS
- associative magic squares, SSSODLS
- pandiagonal magic squares, SOWPLS
- ultramagic squares, PSSSODLS
Project Samples
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