Fermat's Little Theorem

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1 Fermat's Little Theorem CS 2800: Discrete Structures, Spring 2015 Sid Chaudhuri

2 Not to be confused with... Fermat's Last Theorem: x n + y n = z n has no integer solution for n > 2

3 Recap: Modular Arithmetic Definition: a b (mod m) if and only if m a b Consequences: a b (mod m) iff a mod m = b mod m (Congruence Same remainder) If a b (mod m) and c d (mod m), then a + c b + d (mod m) ac bd (mod m) (Congruences can sometimes be treated like equations)

4 Fermat's Little Theorem If p is a prime number, and a is any integer, then a p a (mod p)

5 Fermat's Little Theorem If p is a prime number, and a is any integer, then a p a (mod p) If a is not divisible by p, then a p 1 1 (mod p)

6 Fermat's Little Theorem Examples: (mod 7) but (mod 7) (mod 13) 123,456, ,885, (mod 2 57,885,161 1)

7 Two proofs Combinatorial counting things Algebraic induction We'll consider only non-negative a the result for non-negative a can be extended to negative integers (try it using what we know of congruences!)

8 Counting necklaces Due to Solomon W. Golomb, 1956 Basic idea: a p suggests we see how to fill p buckets, where each is filled with one of a objects a objects p buckets

9 Strings of beads Each way of filling the buckets gives a different sequence of p objects ( beads ) a p such sequences S = 1 S = 2 S = 3

10 Strings of beads Now string the beads together...

11 Strings of beads and join the ends to form necklaces

12 A necklace rotated... is the same necklace Different strings can produce the same necklace when the ends are joined = =

13 Two types of necklaces Containing beads of a single color

14 Two types of necklaces Containing beads of a single color Only one possible string

15 Two types of necklaces Containing beads of different colors Many possible strings

16 Lemma If p is a prime number and N is a necklace with at least two colors, every rotation of N corresponds to a different string i.e. there are exactly p different strings that form the same necklace N

17 Proof of Lemma First, note that each string corresponds to a rotation of the necklace, and then... cutting it at a fixed point

18 Proof of Lemma No more than p strings can give the same necklace There are only p (say clockwise) rotations of the necklace (that align the beads) before we loop back to the original orientation

19 Proof of Lemma Now we'll show that no less than p strings give the same necklace

20 Proof of Lemma Now we'll show that no less than p strings give the same necklace Consider clockwise rotations by 1/p of a full circle

21 Proof of Lemma Now we'll show that no less than p strings give the same necklace Consider clockwise rotations by 1/p of a full circle Let k be the minimum number of such rotations before the original configuration is repeated

22 Proof of Lemma Now we'll show that no less than p strings give the same necklace Consider clockwise rotations by 1/p of a full circle Let k be the minimum number of such rotations before the original configuration is repeated Clearly, k p (p rotations bring us back to the start)

23 Proof of Lemma Now we'll show that no less than p strings give the same necklace Consider clockwise rotations by 1/p of a full circle Let k be the minimum number of such rotations before the original configuration is repeated Clearly, k p (p rotations bring us back to the start) Claim: k p

24 Claim: k p Proof of Claim

25 Proof of Claim Claim: k p Proof: Let p = qk + r, with 0 r < k (division algorithm)

26 Proof of Claim Claim: k p Proof: Let p = qk + r, with 0 r < k (division algorithm) q iterations, each of k rotations, restores the original configuration (by definition of k)

27 Proof of Claim Claim: k p Proof: Let p = qk + r, with 0 r < k (division algorithm) q iterations, each of k rotations, restores the original configuration (by definition of k) So do p rotations (full circle)

28 Proof of Claim Claim: k p Proof: Let p = qk + r, with 0 r < k (division algorithm) q iterations, each of k rotations, restores the original configuration (by definition of k) So do p rotations (full circle) therefore so do r rotations

29 Proof of Claim Claim: k p Proof: Let p = qk + r, with 0 r < k (division algorithm) q iterations, each of k rotations, restores the original configuration (by definition of k) So do p rotations (full circle) therefore so do r rotations But r < k and we said k was the minimum period!

30 Proof of Claim Claim: k p Proof: Let p = qk + r, with 0 r < k (division algorithm) q iterations, each of k rotations, restores the original configuration (by definition of k) So do p rotations (full circle) therefore so do r rotations But r < k and we said k was the minimum period! which is a contradiction, unless r = 0

31 Proof of Lemma Since k p and k p and p is prime, we must have either

32 Proof of Lemma Since k p and k p and p is prime, we must have either k = 1 (impossible if necklace has at least two colors)

33 Proof of Lemma Since k p and k p and p is prime, we must have either k = 1 (impossible if necklace has at least two colors) or k = p

34 Proof of Lemma Since k p and k p and p is prime, we must have either k = 1 (impossible if necklace has at least two colors) or k = p This proves the lemma

35 What we have so far

36 What we have so far Necklaces with one color

37 What we have so far Necklaces with one color a such strings (one for each color), therefore a such necklaces

38 What we have so far Necklaces with one color a such strings (one for each color), therefore a such necklaces Necklaces with multiple colors

39 What we have so far Necklaces with one color a such strings (one for each color), therefore a such necklaces Necklaces with multiple colors Each corresponds to p different strings

40 What we have so far Necklaces with one color a such strings (one for each color), therefore a such necklaces Necklaces with multiple colors Each corresponds to p different strings a p a strings of multiple colors, therefore (a p a) / p such necklaces

41 What we have so far Necklaces with one color a such strings (one for each color), therefore a such necklaces Necklaces with multiple colors Each corresponds to p different strings a p a strings of multiple colors, therefore (a p a) / p such necklaces p a p a (can't have half a necklace)

42 What we have so far Necklaces with one color a such strings (one for each color), therefore a such necklaces Necklaces with multiple colors Each corresponds to p different strings a p a strings of multiple colors, therefore (a p a) / p such necklaces p a p a (can't have half a necklace) a p a (mod p) QED!

43 Another proof (algebraic)

44 Another proof (algebraic) For a given prime p, we'll do induction on a

45 Another proof (algebraic) For a given prime p, we'll do induction on a Base case: Clear that 0 p 0 (mod p)

46 Another proof (algebraic) For a given prime p, we'll do induction on a Base case: Clear that 0 p 0 (mod p) Inductive hypothesis: a p a (mod p)

47 Another proof (algebraic) For a given prime p, we'll do induction on a Base case: Clear that 0 p 0 (mod p) Inductive hypothesis: a p a (mod p) Consider (a + 1) p

48 Another proof (algebraic) For a given prime p, we'll do induction on a Base case: Clear that 0 p 0 (mod p) Inductive hypothesis: a p a (mod p) Consider (a + 1) p By the Binomial Theorem, (a+1) p =a p + ( p 1) a p 1 + ( p 2) ap 2 + ( p 3) a p ( p p 1) a+1

49 Another proof (algebraic) For a given prime p, we'll do induction on a Base case: Clear that 0 p 0 (mod p) Inductive hypothesis: a p a (mod p) Consider (a + 1) p By the Binomial Theorem, (a+1) p =a p + ( p 1) a p 1 + ( p 2) ap 2 + ( p 3) a p ( p p 1) a+1 All RHS terms except last & perhaps first are divisible by p

50 Another proof (algebraic) For a given prime p, we'll do induction on a Base case: Clear that 0 p 0 (mod p) Inductive hypothesis: a p a (mod p) Consider (a + 1) p By the Binomial Theorem, Binomial coefficient ( p ) k is p!/ k!(p k)!, which is always an integer. p is prime, so it isn't canceled out by terms in the denominator (a+1) p =a p + ( p 1) a p 1 + ( p 2) ap 2 + ( p 3) a p ( p p 1) a+1 All RHS terms except last & perhaps first are divisible by p

51 Another proof (algebraic) Therefore (a + 1) p a p + 1 (mod p)

52 Another proof (algebraic) Therefore (a + 1) p a p + 1 (mod p) But by the inductive hypothesis, a p a (mod p)

53 Another proof (algebraic) Therefore (a + 1) p a p + 1 (mod p) But by the inductive hypothesis, a p a (mod p) a p + 1 a + 1 (mod p) (properties of congruence)

54 Another proof (algebraic) Therefore (a + 1) p a p + 1 (mod p) But by the inductive hypothesis, a p a (mod p) a p + 1 a + 1 (mod p) (properties of congruence) Therefore (a + 1) p a + 1 (mod p)

55 Another proof (algebraic) Therefore (a + 1) p a p + 1 (mod p) But by the inductive hypothesis, a p a (mod p) a p + 1 a + 1 (mod p) (properties of congruence) Therefore (a + 1) p a + 1 (mod p) (congruence is transitive prove!)

56 Another proof (algebraic) Therefore (a + 1) p a p + 1 (mod p) But by the inductive hypothesis, a p a (mod p) a p + 1 a + 1 (mod p) (properties of congruence) Therefore (a + 1) p a + 1 (mod p) Hence proved by induction (congruence is transitive prove!)

CS 5319 Advanced Discrete Structure. Lecture 9: Introduction to Number Theory II

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