1. Knut Vik Designs are “Multimagic” Peter Loly (speaker) with Adam Rogers and Ian Cameron Department of Physics and Astronomy, University of Manitoba, Winnipeg CMS Summer 2014 7 June

2. 2 Pfeffermann 1891 the first bimagic square (Mono)magic linesum 260 Bimagic linesum 11180 sv={260, 2  [1153+  805121], 10  82,64, 2  [ 1153 -  805121], 8  3,8  2 } Rank 7 Main diagonal and two parallel pandiagonals (PDs) shown at right in colour: The green PD has non-magic linesum of 286, so this bimagic square is not pandiagonal magic. 56348571847931 33 2054487295910 26 4313236438449 19 5353053124660 15 2563241245040 6 55171136583245 61 1642522713922 44 6228371451213

3. Background Boyer has popularized multimagic squares where the rows, columns and main diagonals (RCD) of full cover magic squares maintain RCD lineums for integer powers p of each element. C. Boyer, http://www.multimagie.com/English/ Bimagic squares correspond to p=2 begin at orders 8 and 9, trimagic for p=3 begin at order 12, etc. Recently Walter Trump and Francis Gaspalou have used a form of backtracking and bimagic series to count exactly the order 8 bimagics (2014).

4. This Talk Rogers observed before 2007 that Latin squares (rows and columns of m symbols) are similarly "multi-semi-magic" for rows and columns. Some Latin squares are also diagonal. Christian Eggermont called diagonal Latin squares "infinitely- multimagic squares" in a 2004 talk: www.win.tue.nl/(tilde)ceggermo/math/Multimagic(ul)Cube(ul)Day( ul)v3.ppt; Now after Nordgren (2013) drew our attention to Knut Vik Latin designs (orders 5,7,11,...) which have all pandiagonals parallel to the main diagonals containing one of each of the n symbols, we realized that Knut Viks are "multimagic" to all integer powers. R. Nordgren, Pandiagonal and Knut Vik Sudoku Squares, Mathematics Today, 49 (2013) 86-87 and Appendix.

5. Continued Moreover these can be compounded to construct Knut Vik designs of multiplicative orders 5×5,5×7,... [Rogers and Loly 2013]. Some properties which can be compounded and iterated are discussed. See also: A. Hedayat and W. T. Federer, Ann. Statist., 3(2)(1975), 445-447, On the Nonexistence of Knut Vik Designs for all Even Orders; We use entropic measures based on singular value analysis to identify related squares (“clans”). Ian Cameron, Adam Rogers and Peter D. Loly, “Signatura of magic and Latin integer squares: isentropic clans and indexing”, Discussiones Mathematicae Probability and Statistics, 33(1-2) (2013) 121-149, or http://www.discuss.wmie.uz.zgora.pl/ps;

6. Shannon Entropy and Magical Squares Newton, P.K. & DeSalvo, S.A. (2010) [“NDS”] “The Shannon entropy of Sudoku matrices”, Proc. R. Soc. A 466:1957-1975 [Online Feb. 2010.] Immediately clear to us that we could extend NDS using our studies of the singular values of magic squares at IWMS16 in 2007, published in Lin. Alg. Appl. 430 (10) 2659-2680, 2009.

7. Shannon Entropy NDS formula: h= -∑ n i=1 σ i ln(σ i ); h max = ln(n) NDS compression measure: C=1-h/ln(n)*100% [100% - uniform; 0% - random] Effective rank: erank=exp[h] N.B. h,C and erank are related. An index, R, of the sum of the 4 th powers of the SVs (omitting the first linesum SV) is also a useful metric.

8. Diagonality of Latin squares 1234 2 4 1 3 3 1 4 2 4 3 2 1 Linesum 10 Weakly diagonal Diagonals have 2 symbols Lat4d Rank 4 1 2 3 4 3 4 1 2 4 3 2 1 2 1 4 3 Strongly diagonal Diagonals have 4 symbols Sud4a Rank 3 8

9. kv5 9 12345 45123 23451 51234 34512 Rank 5, R=750 SVs: 15 (linesum), and  [(5/2)(5±  5)] (twice)

10. kv5 Rank 5 – non-singular (full rank) SVs: 15 (linesum), and  [(5/2)(5±  5)] (twice) One of 7 Singular Value Clans at 5 th order R-index 750 R is the sum of the fourth powers of the last (n-1) SVs. Compression C=16.61%

11. “infinitely”-MULTImagic, e.g. kv5 elements squared (more spread out – higher entropy, Compression C=7.39%, R=864,190) 11 14 91625 1625 1 49 491625 1 1 4916 9 25 1 4

12. But also “Square Rooted” less spread out than kv5 so lower entropy than kv5. Compression C=31.82%, R= 6.57781 12 1 22 33 44 55 44 551 22 33 22 33 44 551 551 22 33 44 33 44 551 22

13. Compounding Knut Viks Rogers (2004-), Rogers and Loly (2005-2013), used a weighted sum of Kronecker products to compound Latin squares of orders m and n to their multiplicative order mn. All are highly singular: Orders: 5*5=25, C=47.24%, rank 5+5-1=9; 5*7=35, C=47.32% (aggregated) AND 49.98% (distributed), Both rank 5+7-1=11; 7*7=49, C=50.41%, rank 7+7-1=13. Our order 49 is in the same SV clan as Nordgren’s order 49 Super Sudoku, suggesting that they are related by row and column permutations.

14. Linesums for Knut Vik’s “Multimagic” Latins using 0..(n-1): s(p)=Sigma[i^p]{p=0 to (n- 1)}, e.g. s(1)=0+1+2+3+4=10 from Mathematica: 1/2 (-1+n) n [Check n=5: (1/2)(-1+5)5=10] Mathematica : Sum[i^2,{i,0,n-1}]: s(2)= 1/6 (-1+n) n (-1+2 n) Alternatively: S(p)=Sigma[i^p]{p=1 to n} using 1..n S(1)=(n/2)(n+1), e.g. n=5: 1+2+3+4+5=15 S(2)= (n/6)(n+1)(2n+1), e.g. n=5: S(2)=1+4+9+16+25=55

15. End