Post on 29-Jan-2016
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Recursive Definitions and Structural Induction
CS 202
Epp section ???
Aaron Bloomfield
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Recursion
• Recursion means defining something, such as a function, in terms of itself– For example, let f(x) = x!– We can define f(x) as f(x) = x * f(x-1)
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Recursion example
– Find f(1), f(2), f(3), and f(4), where f(0) = 1
a) Let f(n+1) = f(n) + 2• f(1) = f(0) + 2 = 1 + 2 = 3• f(2) = f(1) + 2 = 3 + 2 = 5• f(3) = f(2) + 2 = 5 + 2 = 7• f(4) = f(3) + 2 = 7 + 2 = 9
b) Let f(n+1) = 3f(n)• f(1) = 3 * f(0) = 3*1 = 3• f(2) = 3 * f(1) = 3*3 = 9• f(3) = 3 * f(2) = 3*9 = 27• f(4) = 3 * f(3) = 3*27 = 81
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Recursion example
– Find f(1), f(2), f(3), and f(4), where f(0) = 1
c) Let f(n+1) = 2f(n)
• f(1) = 2f(0) = 21 = 2• f(2) = 2f(1) = 22 = 4• f(3) = 2f(2) = 24 = 16• f(4) = 2f(3) = 216 = 65536
d) Let f(n+1) = f(n)2 + f(n) + 1• f(1) = f(0)2 + f(0) + 1 = 12 + 1 + 1 = 3• f(2) = f(1)2 + f(0) + 1 = 32 + 3 + 1 = 13• f(3) = f(2)2 + f(0) + 1 = 132 + 13 + 1 = 183• f(4) = f(3)2 + f(0) + 1 = 1832 + 183 + 1 = 33673
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Fractals
• A fractal is a pattern that uses recursion– The pattern itself repeats indefinitely
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Fractals
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Fibonacci sequence
• Definition of the Fibonacci sequence
– Non-recursive:
– Recursive: F(n) = F(n-1) + F(n-2)
or: F(n+1) = F(n) + F(n-1)
• Must always specify base case(s)!– F(1) = 1, F(2) = 1– Note that some will use F(0) = 1, F(1) = 1
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Fibonacci sequence in Java
long Fibonacci (int n) {if ( (n == 1) || (n == 2) ) return 1;else return Fibonacci (n-1) + Fibonacci (n-2);
}
long Fibonacci2 (int n) {return (long) ((Math.pow((1.0+Math.sqrt(5.0)),n)-
Math.pow((1.0-Math.sqrt(5.0)),n)) /
(Math.sqrt(5) * Math.pow(2,n)));}
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Recursion definition
• From “The Hacker’s Dictionary”:
• recursion n. See recursion. See also tail recursion.
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Bad recursive definitions
• Consider:– f(0) = 1– f(n) = 1 + f(n-2)– What is f(1)?
• Consider:– f(0) = 1– f(n) = 1+f(-n)– What is f(1)?
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Defining sets via recursion
• Same two parts:– Base case (or basis step)– Recursive step
• Example: the set of positive integers– Basis step: 1 S– Recursive step: if x S, then x+1 S
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Defining sets via recursion
• Give recursive definitions for:a) The set of odd positive integers
1 S If x S, then x+2 S
b) The set of positive integer powers of 3 3 S If x S, then 3*x S
c) The set of polynomials with integer coefficients 0 S If p(x) S, then p(x) + cxn S
– c Z, n Z and n ≥ 0
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Defining strings via recursion
• Terminology is the empty string: “” is the set of all letters: { a, b, c, …, z }
• The set of letters can change depending on the problem
• We can define a set of strings * as follows– Base step: *– If w * and x , then wx *– Thus, * s the set of all the possible strings that can
be generated with the alphabet– Is this countably infinite or uncountably infinite?
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Defining strings via recursion
• Let = { 0, 1 }• Thus, * is the set of all binary numbers
– Or all binary strings– Or all possible computer files
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String length via recursion
• How to define string length recursively?– Basis step: l() = 0– Recursive step: l(wx) = l(w) + 1 if w * and x
• Example: l(“aaa”)– l(“aaa”) = l(“aa”) + 1– l(“aa”) = l(“a”) + 1– l(“a”) = l(“”) + 1– l(“”) = 0– Result: 3
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Strings via recursion example
• Give a recursive definition for the set of string that are palindromes– We will define set P, which is the set of all
palindromes
• Basis step: P– Second basis step: x P when x
• Recursive step: xpx P if x and p P
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Recursion pros
• Easy to program• Easy to understand
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Recursion cons• Consider the recursive Fibonacci generator• How many recursive calls does it make?
– F(1): 1– F(2): 1– F(3): 3– F(4): 5– F(5): 9– F(10): 109– F(20): 13,529– F(30): 1,664,079– F(40): 204,668,309– F(50): 25,172,538,049– F(100): 708,449,696,358,523,830,149 7 * 1020
• At 1 billion recursive calls per second (generous), this would take over 22,000 years
• But that would also take well over 1012 Gb of memory!
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Trees
• Rooted trees:– A graph containing nodes and edges
• Cannot contain a cycle!
Cycle not allowed in a tree
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Rooted trees
• Recursive definition:– Basis step: A single vertex r is a rooted tree– Recursive step:
• Let T1, T2, …, Tn be rooted trees
• Form a new tree with a new root r that contains an edge to the root of each of the trees T1, T2, …, Tn
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(Extended) Binary trees
• Recursive definition– Basis step: The empty set is an extended binary tree– Recursive step:
• Let T1, and T2 be extended binary trees
• Form a new tree with a new root r
• Form a new tree such that T1 is the left subtree,and T2 is the right subtree
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Full binary trees• Recursive definition
– Basis step: A full binary tree consisting only of the vertex r– Recursive step:
• Let T1, and T2 be extended binary trees• Form a new tree with a new root r• Form a new tree T such that T1 is the left subtree, and T2 is the right subtree
(denoted by T = T1∙T2)
• Note the only difference between a regular binary tree and a full one is the basis step
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Binary tree height
• h(T) denotes the height of tree T• Recursive definition:
– Basis step: The height of a tree with only one node r is 0
– Recursive step:• Let T1 and T2 be binary trees
• The binary tree T = T1∙T2 has heighth(T) = 1 + max ( h(T1), h(T2) )
• This definition can be generalized to non-binary trees
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Binary tree size
• n(T) denotes the number of vertices in tree T• Recursive definition:
– Basis step: The number of vertices of an empty tree is 0
– Basis step: The number of vertices of a tree with only one node r is 1
– Recursive step:• Let T1 and T2 be binary trees• The number of vertices in binary tree T = T1∙T2 is:
n(T) = 1 + n(T1) + n(T2)
• This definition can be generalized to non-binary trees
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Recursion vs. induction
• Consider the recursive definition for factorial:
– f(0) = 1
– f(n) = n * f(n-1)
• Sort of like induction
Base case
The “step”
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Recursion vs. induction
• Consider the set of all integers that are multiples of 3– { 3, 6, 9, 12, 15, … }– { x | x = 3k and k Z+ }
• Recursive definition:– Basis step: 3 S– Recursive step: If x S and y S, then x+y S
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Recursion vs. induction• Proof via induction: prove that S contains all the integers that are
divisible by 3– Let A be the set of all ints divisible by 3– Show that S = A
• Two parts:– Show that S A
• Let P(n) = 3n S• Base case: P(1) = 3*1 S
– By the basis step of the recursive definition• Inductive hypothesis: assume P(k) = 3*k S is true• Inductive step: show that P(k+1) = 3*(k+1) is true
– 3*(k+1) = 3k+3– 3k S by the inductive hypothesis– 3 S by the base case– Thus, 3k+3 S by the recursive definition
– Show that A S• Similar steps (not reproduced here)
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What did we just do?
• Notice what we did:– Showed the base case– Assumed the inductive hypothesis– For the inductive step, we:
• Showed that each of the “parts” were in S– The parts being 3k and 3
• Showed that since both parts were in S, by the recursive definition, the combination of those parts is in S
– i.e., 3k+3 S
• This is called structural induction
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Structural induction
• A more convenient form of induction for recursively defined “things“
• Used in conjunction with the recursive definition• Three parts:
– Basis step: Show the result holds for the elements in the basis step of the recursive definition
– Inductive hypothesis: Assume that the statement is true for some existing elements
• Usually, this just means assuming the statement is true
– Recursive step: Show that the recursive definition allows the creation of a new element using the existing elements
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Tree structural induction example
• Show that n(T) ≥ 2h(T) + 1 for full binary trees
• Basis step: Let T be the full binary tree of just one node r– h(T) = 0– n(T) = 1– n(T) ≥ 2h(T) + 1– 1 ≥ 2*0 + 1– 1 ≥ 1
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Tree structural induction example
• Show that n(T) ≥ 2h(T) + 1• Inductive hypothesis:
– Let T1 and T2 be full binary trees• Assume that n(T1) ≥ 2h(T1) + 1 for some tree T1
• Assume that n(T2) ≥ 2h(T2) + 1 for some tree T2
• Recursive step:– Let T = T1 ∙ T2
• Here the ∙ operator means creating a new tree with a root note r and subtrees T1 and T2
• New element is T– By the definition of height and size, we know:
• n(T) = 1 + n(T1) + n(T2)• h(T) = 1 + max ( h(T1), h(T2) )
– Therefore:• n(T) = 1 + n(T1) + n(T2)• ≥ 1 + 2h(T1) + 1 + 2h(T2) + 1• ≥ 1 + 2*max ( h(T1), h(T2) ) the sum of two non-neg #’s is at least
as large as the larger of the two
• = 1 + 2*h(T)– Thus, n(T) ≥ 2h(T) + 1
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String structural induction example
• Part (a): Give the definition for ones(s), which counts the number of ones in a bit string s
• Let = { 0, 1 }
• Basis step: ones() = 0
• Recursive step: ones(wx) = ones(w) + x– Where x and w *– Note that x is a bit: either 0 or 1
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String structural induction example
• Part (b): Use structural induction to prove that ones(st) = ones(s) + ones(t)
• Basis step: t = – ones (s∙) = ones(s) = ones(s)+0 = ones(s) + ones()
• Inductive hypothesis: Assume ones(s∙t) = ones(s) + ones(t)
• Recursive step: Want to show that ones(s∙t∙x) = ones(s) + ones(t∙x)– Where s, t * and x – New element is ones(s∙t∙x)– ones (s∙t∙x) = ones ((s∙t)∙x)) by associativity of
concatenation– = x+ones(s∙t) by recursive definition– = x + ones(s) + ones(t) by inductive hypothesis– = ones(s) + (x + ones(t)) by commutativity and assoc. of +– = ones(s) + ones(t∙x) by recursive definition– Proven!
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Induction methods comparedWeak
mathematicalStrong
Mathematical Structural
Used forUsually
formulaeUsually formulae not
provable via mathematical induction
Only things defined via recursion
Assumption Assume P(k)Assume P(1), P(2), …, P(k)
Assume statement is true for some "old"
elements
What to prove True for P(k+1) True for P(k+1)
Statement is true for some "new" elements
created with "old" elements
Step 1 calledBase case Base case Basis step
Step 3 calledInductive step Inductive step Recursive step
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Induction types compared
• Show that F(n) < 2n
– Where F(n) is the nth Fibonacci number– Actually F(n) < 20.7*n, but we won’t prove that here
• Fibonacci definition:– Basis step: F(1) = 1 and F(2) = 1– Recursive step: F(n) = F(n-1) + F(n-2)
• Base case (or basis step): Show true for F(1) and F(2)– F(1) = 1 < 21 = 2– F(2) = 1 < 22 = 4
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Via weak mathematical induction
• Inductive hypothesis: Assume F(k) < 2k
• Inductive step: Prove F(k+1) < 2k+1
– F(k+1) = F(k) + F(k-1)– We know F(k) < 2k by the inductive hypothesis– Each term is less than the next, therefore:
F(k) > F(k-1)• Thus, F(k-1) < F(k) < 2k
– Therefore, F(k+1) = F(k) + F(k-1) < 2k + 2k = 2k+1
– Proven!
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Via strong mathematical induction
• Inductive hypothesis: Assume F(1) < 21, F(2) < 22, …, F(k-1) < 2k-1, F(k) < 2k
• Inductive step: Prove F(k+1) < 2k+1
– F(k+1) = F(k) + F(k-1)– We know F(k) < 2k by the inductive hypothesis– We know F(k-1) < 2k-1 by the inductive hypothesis– Therefore, F(k) + F(k-1) < 2k + 2k-1 < 2k+1
– Proven!
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Via structural induction
• Inductive hypothesis: Assume F(n) < 2n
• Recursive step: – Show true for “new element”: F(n+1)– We know F(n) < 2n by the inductive hypothesis– Each term is less than the next, therefore
F(n) > F(n-1)• Thus, F(n-1) < F(n) < 2n
– Therefore, F(n) + F(n-1) < 2n + 2n = 2n+1
– Proven!
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Another way via structural induction
• Inductive hypothesis: Assume F(n) < 2n and F(n-1) < 2n-1
– The difference here is we are using two “old” elements versus one, as in the last slide
• Recursive step: – Show true for “new element”: F(n+1)– F(n+1) = F(n) + F(n-1)– We know F(n) < 2n by the inductive hypothesis– We know F(n-1) < 2n-1 by the inductive hypothesis– Therefore, F(n) + F(n-1) < 2k + 2k-1 < 2k+1
– Proven!
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But wait!
• In this example, the structural induction proof was essentially the same as the weak or strong mathematical induction proof– It’s hard to find an example that works well for all of
the induction types
• Structural induction will work on some recursive problems which weak or strong mathematical induction will not– Trees, strings, etc.
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Recursive definition examples• Give the recursive definition of the following sequences
– Note that many answers are possible!
a) an = 4n – 2– Terms: 2, 6, 10, 14, 16, etc.– a1 = 2– an = an-1 + 4
b) an = 1 + (-1)n
– Terms: 0, 2, 0, 2, 0, 2, etc.– a1 = 0, a2 = 2– an = an-2
c) an = n(n+1)– Terms: 2, 6, 12, 20, 30, 42, etc.– a1 = 2– an = an-1 + 2*n
d) an = n2
– Terms: 1, 4, 9, 16, 25, 36, 49, etc.– a1 = 1– an = an-1 + 2n - 1
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More more examples
• Show that f12 + f2
2 + f32 + … + fn
2 = fnfn+1
• Base case: n = 1– f1
2 = f1f2
– 12 = 1*1
• Inductive hypothesis: Assume– f1
2 + f22 + f3
2 + … + fk2 = fkfk+1
• Inductive step: Prove– f1
2 + f22 + f3
2 + … + fk2 + fk+1
2 = fk+1fk+2
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More more more examples
• Inductive hypothesis: Assume– f1
2 + f22 + f3
2 + … + fk2 = fkfk+1
• Inductive step: Prove– f1
2 + f22 + f3
2 + … + fk2 + fk+1
2 = fk+1fk+2
– fkfk+1 + fk+12 = fk+1fk+2
– fkfk+1 + fk+12 = fk+1 (fk + fk+1)
– fkfk+1 + fk+12 = fkfk+1 + fk+1
2
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More^4 examples
• Show that f1 + f2 + f3 + … + f2n-1 = f2n
• Base case: n = 1– f1 = f2*1
– 1 = 1
• Inductive hypothesis: Assume– f1 + f2 + f3 + … + f2k-1 = f2k
• Inductive step: Prove– f1 + f2 + f3 + … + f2k-1 + f2(k+1)-1 = f2(k+1)
– f1 + f2 + f3 + … + f2k-1 + f2k+1 = f2k+2
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More^5 examples
• Inductive hypothesis: Assume– f1 + f2 + f3 + … + f2k-1 = f2k
• Inductive step: Prove– f1 + f2 + f3 + … + f2k-1 + f2k+1 = f2k+2
– f2k + f2k+1 = f2k+2
– True by definition of f2k+2
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More^6 examples• Show that the set S defined by
– Basis step: 1 S– Recursive step: s + t S when s S and t S
• is the set of positive integers:– Z+ = { 1, 2, 3, … }
• Note the (somewhat recursive) definition of the positive integers:– 1 is a positive integer– For any arbitrary n that is a positive integer, n+1 is also a positive
integer
• Proof by structural induction• Basis step: 1 S and 1 Z+
• Inductive hypothesis: Assume k S• Recursive step: Show k+1 S
– k S by the inductive hypothesis– 1 S by the base case– k+1 S by the recursive step of the recursive definition above
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More^7 examples
• Give a recursive definition of the reversal of a string
• Basis step: R = – Note that the superscripted R means reversal of a string
• Recursive step: Consider a string w *– Rewrite w as vy where v * and y
• v is the first n-1 characters in w• y is the last character in w
– wR = y(vR)• Parentheses are for our benefit