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Juggling Sequences with Number Theory

Juggling Sequences with Number Theory. & “A Tale of Two Kingdoms”. Stephen Harnish Professor of Mathematics Bluffton University harnishs@bluffton.edu. Miami University 35 th Annual Mathematics & Statistics Conference: Number Theory September 28-29, 2007.

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Juggling Sequences with Number Theory

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  1. Juggling Sequences with Number Theory & “A Tale of Two Kingdoms”

  2. Stephen Harnish Professor of Mathematics Bluffton University harnishs@bluffton.edu Miami University 35th Annual Mathematics & Statistics Conference: Number Theory September 28-29, 2007 Juggling Sequences with Number Theory

  3. Classical Results Theorem 1: (Euler) The sequence has no equal initial and middle sums. Theorem 2: (Dirichlet) The sequence has no equal initial and middle sums.

  4. Initial and Middle Sums of Sequences • Note that sequence {1, 2, 3, 4, …} has numerous initial sums that equal middle sums: (1 + 2) = 3 = (3) (1 + 2 + 3 + 4 + 5) = 15 = (7 + 8) (1 + 2 + 3 + 4 + 5 + 6) = 21 = (10 + 11) (1 + 2 + 3 + 4 + 5 + 6) = 21 = (6 + 7 + 8)

  5. Sequence Sums Definition: For the sequence an initial sum is any value of the form for some integer k and a middle sum is any value of the form for some integers j and k, where the length of a middle sum is .

  6. Initial and Middle Sums of Sequences • Note that sequence {1, 2, 3, 4, …} has numerous initial sums that equal middle sums: (1 + 2) = 3 = (3) (1 + 2 + 3 + 4 + 5) = 15 = (7 + 8) (1 + 2 + 3 + 4 + 5 + 6) = 21 = (10 + 11) (1 + 2 + 3 + 4 + 5 + 6) = 21 = (6 + 7 + 8)

  7. Results Theorem 3: Every initial sum of the sequence is equal to some middle sum Conjecture 1: Given the sequence then for each integer k , some initial sum is equal to some k-length middle sum.

  8. Initial and Middle Sums of Sequences--Fibonacci • Note that sequence {1, 1, 2, 3, 5, 8, 13…} has the following initial sums: (1) = 1 =(1) (1 + 1) = 2 =(2) (1 + 1 + 2) = 4 (1 + 1 + 2 + 3) = 7 (1 + 1 + 2 + 3 + 5) = 12 (1 + 1 + 2 + 3 + 5 + 8) = 20

  9. Results Conjecture 2: Some initial sum of the sequence is equal to a k-length middle sum for each k. Theorem 4: The Fibonacci sequence has only two instances of equal initial and middle sums. Namely, middle sums (1) and (2). (Hint: use the fact that and compare with the magnitude of each middle sum of length 1, 2, 3, etc.)

  10. Juggling History • 1994 to 1781 (BCE)—first depiction on the 15th Beni Hassan tomb of an unknown prince from Middle Kingdom Egypt. The Science of Juggling • 1903—psychology and learning rates • 1940’s—computers predict trajectories • 1970’s—Claude Shannon’s juggling machines at MIT The Math of Juggling • 1985—Increased mathematical analysis via site-swap notation (independently developed by Klimek, Tiemann, and Day) For Further Reference: • Buhler, Eisenbud, Graham & Wright’s “Juggling Drops and Descents” in The Am. Math. Monthly, June-July 1994. • Beek and Lewbel’s “The Science of Juggling” Scientific American, Nov. 95. • Burkard Polster’s The Mathematics of Juggling, Springer, 2003. • Juggling Lab at http://jugglinglab.sourceforge.net/

  11. Juggling Patterns (via Juggling Lab)

  12. Thirteen-ball Cascade

  13. A 30-ball pattern of period-15 named: “uuuuuuuuuzwwsqr” using standard site-swap notation

  14. 531

  15. Several period-5, 2-ball patterns 90001 12223 30520 14113

  16. A story relating juggling with number theory…

  17. The Pact (1400 C.E.) In the first year of the new century when the Kings of Onom and Laud each decreed the annual juggling period to be 1, a peace treaty was signed…

  18. A Tale of Two Kingdoms(first studied by E. Tamref) • Values of Culture 1 (Onom) • Annual Juggling Ceremony • Values of Culture 2 (Laud) • Annual Juggling Ceremony

  19. A Tale of Two Kingdoms(first studied by E. Tamref) • Values of Culture 1 (Onom) • Annual Juggling Ceremony • Orderly—1 period per year, starting with 1, then 2, 3, etc. • Values of Culture 2 (Laud) • Annual Juggling Ceremony • Orderly—1 period per year, starting with 1, then 2, 3, etc.

  20. A Tale of Two Kingdoms(first studied by E. Tamref) • Values of Culture 1 (Onom) • Annual Juggling Ceremony • Orderly—1 period per year, starting with 1, then 2, 3, etc. • Sequential & Complete—Juggling performances start with all patterns for 0 balls, then 1, 2, 3, etc. • Values of Culture 2 (Laud) • Annual Juggling Ceremony • Orderly—1 period per year, starting with 1, then 2, 3, etc. • Sequential & Complete—Juggling performances start with all patterns for 0 balls, then 1, 2, 3, etc.

  21. A Tale of Two Kingdoms(first studied by E. Tamref) • Values of Culture 1 (Onom) • Annual Juggling Ceremony • Orderly—1 period per year, starting with 1, then 2, 3, etc. • Sequential & Complete—Juggling performances start with all patterns for 0 balls, then 1, 2, 3, etc. • Individuality— Monistic presentation: 1 performer per ceremony • Values of Culture 2 (Laud) • Annual Juggling Ceremony • Orderly—1 period per year, starting with 1, then 2, 3, etc. • Sequential & Complete—Juggling performances start with all patterns for 0 balls, then 1, 2, 3, etc. • Complementarity— Dualistic presentation: 2 performers per ceremony

  22. The Pact (1400 C.E.) In the first year of the new century when the Kings of Onom and Laud each decreed the annual juggling period to be 1, a peace treaty was signed. To strengthen this new union, the pact was to be celebrated each year at a banquet where each kingdom would contribute a juggling performance obeying its own principles. However, to symbolize their equal status and mutual regard, each performance must consist of an equal number of juggling patterns.

  23. Year One For example, at the end of the first year, the solo juggler of Onom performed all period-1 juggling patterns with 0, 1, 2, 3, and 4 balls, while the juggler duet from Laud first performed all period-1 patterns with 0 and 1 ball and then 0, 1, and 2 balls. (Total number of patterns for each: 5)

  24. Year Two 00 11 20 02 22 31 13 40 04 33 42 24 51 15 60 06 44 53 35 62 26 71 17 80 08

  25. Year Two Also, at the end of the second year, the following were performed at the banquet—the solo juggler of Onom performed all period-2 juggling patterns with 0 to 4 balls, while the juggler duet from Laud first performed all patterns with 0 to 2 & then 0 to 3 balls. (Total number of patterns for each: 25) 0 balls 1 ball 2 balls 3 balls 4 balls

  26. A Tale of Two Kingdoms(first studied by E. Tamref) • Values of Culture 1 (Onom) • Annual Juggling Ceremony • Orderly—1 period per year, starting with 1, then 2, 3, etc. • Sequential & Complete—Juggling performances start with all patterns for 0 balls, then 1, 2, 3, etc. • Individuality— Monistic presentation: 1 performer per ceremony • Values of Culture 2 (Laud) • Annual Juggling Ceremony • Orderly—1 period per year, starting with 1, then 2, 3, etc. • Sequential & Complete—Juggling performances start with all patterns for 0 balls, then 1, 2, 3, etc. • Complementarity— Dualistic presentation: 2 performers per ceremony

  27. Question Will this harmonious arrangement continue indefinitely for the Kingdoms of Laud and Onom? For years 3 and beyond, as the sanctioned periods continually increase by one, can joint ceremonies be planned so that each abides by their own rules and each presents the same number of juggling patterns?

  28. Period-3 Juggling Patterns 0 balls 1 ball 2 balls… 1 7 19

  29. Period-1 # of Balls: 0 1 2 3 4 # of Patterns: 1 1 1 1 1

  30. Year Two Also, at the end of the second year, the following were performed at the banquet--the solo juggler of Onom performed all period-2 juggling patterns with 0 to 4 balls, while the juggler duet from Laud first performed all patterns with 0 to 2 & then 0 to 3 balls. (Total number of patterns for each: 25) 0 balls 1 ball 2 balls 1 pattern3 patterns5 patterns 3 balls 4 balls 7 patterns9 patterns

  31. Period-2 # of Balls: 0 1 2 3 4 # of Patterns: 1 3 5 7 9

  32. Period-3 Juggling PatternsWhere have we seen these numbers before? 0 balls 1 ball 2 balls… 1 7 19

  33. Period-3 # of Balls: 0 1 2 3 4 # of Patterns: 1 7 19 37 61

  34. Again, Period-2 • Patterns per ball are odd numbers • A balanced juggling performance: (1+3+5+7+9) = 25 = (1+3+5) + (1+3+5+7) • Recall: (the sum of the first k odds) = So: = • Initial sum = Middle sum (1+3+5+7) = 16 = (7+9)

  35. Initial & Middle sums for Pythagorean Triples

  36. Sequence: 1 7 19 37 61 91 … • Examples: Initial Sums: 1, 8, 27, 64, 125,… Middle Sums: 7, 26, 63, …19, 56,117,…37,… • Euler: No initial and middle sums are equal. (proven in the equivalent form of has no solutions in non-zero integers a, b, and c)

  37. The future of the “Two Kingdoms” is resolved through number theory T.F.A.E.: 1. 2. 3. For the specific sequences of the form (initial sum) = (initial sum) – (initial sum) (initial sum) = (middle sum)

  38. Conclusion Theorem 5: (Graham, et. al., 1994) The number of period-n juggling patterns with fewer than b balls is . Theorem 6: T.F.A.E.: • The monistic and dualistic sequential periodic juggling pact can not be satisfied for years 3, 4, 5, … • F.L.T.

  39. F.L.T. (It is impossible to separate a cube into two cubes, or a fourth power into two fourth powers, or in general, any power higher than the second into two like powers. I have discovered a truly marvelous proof of this, which this margin is too narrow to contain.) Fermat/Tamref Conclusion: “Add one more to your list of applications of F.L.T.”

  40. Thus ends our exercise in:Juggling Sequences with Number Theory & “A Tale of Two Kingdoms” Stephen Harnish harnishs@bluffton.edu

  41. Website sources • Images came from the following sites: http://www.sciamdigital.com/index.cfm?fa=Products.ViewBrowseList http://www2.bc.edu/~lewbel/jugweb/history-1.htmlhttp://en.wikipedia.org/wiki/Fermat%27s_last_theorem http://en.wikipedia.org/wiki/Pythagorean_triple http://en.wikipedia.org/wiki/Juggling

  42. Another story-line from the 14th C • Earlier in 14th C. Onom, there had emerged a heretical sect called the neo-foundationalists. They valued orderliness and sequentiality, but they also had more progressive aspirations—the solo performer’s juggling routine would be orderly and sequential but perhaps NOT based on the foundation of first 0 balls, then 1, 2, etc. These neo-foundationalists might start at some non-zero number of balls and then increase from there. • However, they were neo-foundationalists in that they would only perform such a routine with m to n number of balls (where 1 < m < n) if the number of such juggling patterns equaled the number of patterns from the traditional, more foundational display of 0 to N balls (for some whole number N). • For how many years (i.e., period choices) were these neo-foundationalists successful in finding such equal middle and initial sums of juggling patterns? • (Answer: Only for years 1 and 2).

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