Matthew Wright slides also by John Chase

The Mathematics Juggling of Matthew Wright slides also by John Chase 1 4 5 1 4 1 4 5 1 4 4 5

Basic Juggling Patterns Axioms: • The juggler must juggle at a constant rhythm. • Only one throw may occur on each beat of the pattern. • Throws on odd beats must be made from the right hand; throws on even beats from the left hand. • The pattern juggled must be periodic. It must repeat. It must repeat. • All balls must be thrown to the same height. Example:basic 3-ball pattern arcs represent throws dots represent beats 1 2 4 5 6 7 8 9 ∙∙∙ 3

Basic 3-ball Pattern 1 2 4 5 6 7 8 9 ∙∙∙ 3 Notice: balls land in the opposite hand from which they were thrown Basic 4-ball Pattern 1 2 4 5 6 7 8 9 ∙∙∙ 3 Notice: balls land in the same hand from which they were thrown

The Basic -ball Patterns If is odd: • Each throw lands in the opposite hand from which it was thrown. • These are called cascade throws. If is even: • Each throw lands in the same hand from which it was thrown. • These are called fountain throws.

Let’s change things up a bit… Axioms: • The juggler must juggle at a constant rhythm. • Only one throw may occur on each beat of the pattern. • Throws on even beats must be made from the right hand; throws on odd beats from the left hand. • The pattern juggled must be periodic. It must repeat. It must repeat. • All balls must be thrown to the same height. What if we allow throws of different heights? Axioms 1-4 describe the simple juggling patterns.

Example Start with the basic 4-ball pattern: Concentrate on the landing sites of two throws. • Now swap them! • The first 4-throw will land a count later, making it a 5-throw. • The second 4-throw will land a count earlier, making it a 3-throw. • This is called a site swap.

Juggling Sequences Site swaps allow us to obtain many simple juggling patterns, starting from the basic juggling patterns. We describe each simple juggling pattern by a juggling sequence: a sequence of integers corresponding to the sequence of throws in the juggling pattern. The length of a juggling sequence is its period. A juggling sequence is minimalif it has minimal period among all juggling sequences representing the same pattern. Example:the juggling sequence 441 4 4 4 4 4 4 1 1 1 1 ∙∙∙ 2 3 4 5 6 7 8 9

Juggling Sequences 2-balls: 31, 312, 411, 330 3-balls: 441, 531, 51, 4413, 45141 4-balls: 5551, 53, 534, 633, 71 5-balls: 66661, 744, 75751 1 4 ∙∙∙ 5 1 4 1 4 5 1 4 4 5

Is every sequence a juggling sequence? No. Consider the sequence 54. collision! 5 4 Clearly, a 5-throw followed by a 4-throw results in a collision. In general, an -throw followed by an -throw results in a collision.

? How do we know if a given sequence is jugglable? For instance, is 6831445 a jugglable sequence?

A juggling function is a function: This function tells us what throw to make on each beat. That is, on beat , we juggle a -throw, for each integer . The sequence described by this function is jugglable if and only if the function is a permutation of the integers. Two important properties of juggling functions: 1. Height of the highest throw: 2. Number of balls required to juggle the corresponding sequence: number of balls required to juggle

How many balls are required to juggle a given sequence? The Average Theorem: Let be a juggling function with finite height. Then exists, is finite, and is equal to , where the limit is over all integer intervals , and is the number of integers in . Proof:

interval , with minimum contribution of any particular ball to maximum contribution of any particular ball to Proof: The left and right expressions tend to as tends to infinity.

How many balls are required to juggle a given sequence? The Average Theorem: Corollary: The number of balls necessary to juggle a juggling sequence equals its average. Application: A finite juggling sequence must have an integer average. Examples: 534 441 7531 75751 352 5-ball pattern not jugglable! 4-ball pattern 3-ball pattern 4-ball pattern

How can we change one juggling sequence into another? We could perform a site swap. Consider the sequence of nonnegative integers: If , we can swap the landing positions of the balls thrown on beats and to obtain the sequence : Notice: • The sequence is a juggling sequence if and only if is. • The average of is the same as the average of . • If is a juggling sequence, then the number of balls used to juggle equals the number of balls used to juggle .

How can we change one juggling sequence into another? We could perform a cyclic shift. Again, let be a sequence of nonnegative integers: Now move the last element, , to the beginning of the sequence to obtain the sequence : Notice: • The sequence is a juggling sequence if and only if is. • The average of is the same as the average of . • If is a juggling sequence, then the number of balls used to juggle equals the number of balls used to juggle .

The Flattening Algorithm Let be a sequence of nonnegative integers: The flattening algorithm transforms into a new sequence as follows: • If is a constant sequence, stop and output this sequence. Otherwise, • use cyclic shifts to arrange the elements of such that a maximum integer in , say , is at position 0 and a non-maximum integer in , say , is at position 1. If , stop and output this sequence. Otherwise, • perform a site swap of positions 0 and 1. Redefine to be the resulting sequence, and return to step 1.

The Flattening Algorithm also jugglable! Example: start with the sequence 642 swap shift swap shift swap jugglable! 642 552 525 345 534 444 also not jugglable Example: start with the sequence 514 swap shift swap shift not jugglable 514 244 424 334 443 • Observe: • The Flattening Algorithm can be used to decide whether or not a sequence is jugglable. • If the input is a -ball juggling sequence with period , this algorithm outputs the basic -ball sequence of period . • If the input is not a juggling sequence, the program stops at step 2 and outputs a sequence of the form .

How do we know if a given sequence is jugglable? Theorem: Let , for , be a sequence of nonnegative integers and let . Then, is a juggling sequence if and only if the function defined is a permutation of the set . • Example: Show 534 is a valid juggling sequence. • Let . The period is 3, so . Note . • Then • This is a permutation of , so 534 is a valid juggling sequence.

Theorem: Let , for , be a sequence of nonnegative integers and let . Then, is a juggling sequence if and only if the function defined is a permutation of the set . Proof: The function is a permutation if and only if the vector contains all of the integers from to . Suppose we apply site swaps and cyclic permutations to the sequence to obtain sequence with corresponding vector . Then contains all of the elements of if and only if does. Therefore, given a sequence , apply the flattening algorithm to obtain . Then is a juggling sequence if and only if is a constant sequence, if and only if contains all of the elements of .

? How many ways are there to juggle? Infinitely many. (Consider the basic -ball sequences for each integer .) How many -ball juggling sequences are there with period ?

How many -ball juggling sequences are there of period ? : There is one unique sequence, namely, 1. 1 : Starting with the sequence 22, we can perform site swaps to obtain two other sequences, 31 and 40(unique up to cyclic shifts). 2 2 3 1 4 0 : Starting with 333and performing site swaps, we (eventually) obtain 13 sequences (unique up to cyclic shifts).

How many -ball juggling sequences are there of period ? 3 0 6 5 1 0 4 2 6 1 1 5 4 4 7 1 1 2 2 5 3 0 8 3 7 2 0 1 4 2 0 3 6 : Starting with 333and performing site swaps, we (eventually) obtain 13 sequences (unique up to cyclic shifts). 3 0 3 3 0 9

Is there a better way to count juggling sequences? Suppose we have a large number of each of the following juggling cards: These cards can be used to construct all juggling sequences that are juggled with at most three balls.

Example: juggling sequence 441 juggling diagram ∙∙∙ 4 ∙∙∙ 4 1 4 4 1 4 4 1 constructed with juggling cards 4 4 1 4 4 1 4 4 1

Counting Juggling Sequences With many copies of these four cards, we can construct any (not-necessarily minimal) juggling sequences that is juggled with at most three balls. Similarly, with many copies of distinct cards, we can construct any (not-necessarily minimal) juggling sequence that is juggled with at most balls. Lemma: The number of all juggling sequences of period , juggled with at most balls, is:

Counting Juggling Sequences Lemma: The number of all juggling sequences of period , juggled with at most balls, is: It follows that: Lemma: The number of all -ball juggling sequences of period is: However, we have counted each cyclic permutation of every sequence, as well as non-minimal sequences. How can we count the minimal -ball juggling sequences of period , not counting cyclic permutations of the same sequence as distinct?

Counting Juggling Sequences Theorem: The number of all minimal -ball juggling sequences of period , with , is if cyclic permutations of juggling sequences are not counted as distinct. Here, denotes the Möbiusfunction: Proof: If divides , then each minimal juggling sequence of period gives rise to exactly sequences of period . Thus, The expression for follows by Möbius inversion.

? Questions?

Reference: BurkardPolster. The Mathematics of Juggling. Springer, 2003. Juggling Simulators: • www.quantumjuggling.com • jugglinglab.sourceforge.net

Matthew Wright slides also by John Chase

Matthew Wright slides also by John Chase

Presentation Transcript

Slides by Matthew Will

Slides by Matthew Will

Slides by Matthew Will

Slides by Matthew Will

Slides by Matthew Will

Matthew Wright slides also by John Chase

Slides by Matthew Will

Slides by Matthew Will

Slides by Matthew Will

Slides by Matthew Will

Slides by Matthew Will

Slides by Matthew Will

Slides by Matthew Will

Slides by Matthew Will

Slides by Matthew Will

Slides by Matthew Will

Slides by Matthew Will

Slides by Matthew Will

Slides by Matthew Will

Slides by Matthew Will

Slides by Matthew Will