Case 2 log(n!) O(nlogn) - Department of Computer Science
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Transcript Case 2 log(n!) O(nlogn) - Department of Computer Science
Foundations of Algorithms, Fourth Edition
Richard Neapolitan, Kumarss Naimipour
Updated by Richard P. Simpson
Chapter 1
Algorithms: Efficiency, Analysis, and Order
What is a problem
• A problem is a question to which we seek
an answer.
• Examples
- We want to rearrange a list of numbers in
numerical order. (sort)
- Determine whether the number x is in a list S
of n numbers.
- What is the 25 Fibonacci number?
What is an instance of a problem?
• An instance of a problem is a specific
assignment of the parameters that define
the problem.
• For example in the case of sorting n
numbers we need to be giving the n
numbers in specific order and n the
number of values to sort. This creates the
specific case we are interested in.
What is an Algorithm?
• In mathematics and computer science, an algorithm
(from Algoritmi, the Latin form of Al-Khwārizmī) is an
effective method expressed as a finite list of well-defined
instructions for calculating a function
• IE a step by step solution to the problem.
• In computer systems, an algorithm is basically an
instance of logic written in software by software
developers to be effective for the intended "target"
computer(s), in order for the target machines to produce
output from given input (perhaps null).
Sequential Search
• Problem: Is the key x in the array S of n keys?
• Inputs(parameters): integer n, array of keys indexed from
1 to n (0 to n-1 ?)
• Outputs: location, 0 if not in S
void seqsearch(int n, const int S[], int x, index& location)
{
location = 1;
while(location<=n && S[location]!=x) location++;
if (location >n)location=0;
}
Matrix Multiplication
void matrixmult(int n, const int A[][],const int B[][], int c[][]);
{
index i,j,k;
for(i=1; i<=n; i++)
for(j=1, j<=n; j++){
C[i][j]= 0;
for(k=1; k<=n; k++)
C[i][j] = C[i][j] + C[i][k]* B[k][j];
}
}
Searching Arrays
• Sequential Search
• Binary Search
– Recursive ( be able to write this !)
– Non Recursive (in book)
A problem can solved using a lot of different
algorithms. These may vary in efficiency
and or complexity(we will discuss this later)
See table 1.1
Recursive Fibonacci
See Wolfram MathWorld Discussion
1 2 3 5 8 13 21 34 55 89 . . .
f(0) = 0, f(1)=1, f(n)=f(n-1)+f(n-2)
Recursive Solution
int fib( int n)
{
if(n<=1)
return n;
else
return fib(n-1) + fib(n-2);
}
The recursive algorithm hits all these nodes!
Is this efficient??
Iterative Version
int fib2 ( int n)
{
int I;
int f[0..n];
f[0]=0;
if (n > 0)
f[1]=1;
for (i=2; i<=n; i++)
f[i] = f[i-1] + f[i-2];
}
return f[n];
}
Fills array from left to right.
very efficient!
0
1
1
2
3
0
1
2
3
4
5
8
5
6
7
n-2
n-1
n
SEE Table 1.2
8
Analysis of Algorithms
• Complexity Analysis
– This is a measure of the amount of work done
by an algorithm as a function of its input data
size. IE it’s a function of n.
• Efficiency
– I use this term in a very specific way. If two
different algorithms having the same
complexity are run on the same data set the
execution time will probably be different. The
faster algorithm is more efficient than the
other one.
Types of complexity
•
•
•
•
Worst Case ( our main focus)
Best Case
Average Case
Every Case (i.e. Best = Worst)
Average case complexity
• Sequential Search
– Suppose we have an array of n items and would like
to do a sequential search for the value x. Also
assume that the value x can be in any location with
equal probability (ie 1/n)
1
1
× )= ×
𝑛
𝑛
𝑛(𝑛+1)
𝑛+1
=
2
2
𝑛
𝑘=1(𝑘
𝐴 𝑛 =
1
𝑛
= ×
𝑛
𝑘=1 𝑘
See the analysis for the possibility that x is not in
the array. p22
Complexity Classes
recall that n is the data set size!
•
•
•
•
•
Constant ( 1, 3, 9, 232, etc)
Linear ( n, 2n, 3n-2, 21n+100 etc)
Quadratic (n2,2n2-3,4n2-3n+23, etc)
Cubic ( n3, 4n3+3n2-2n+7, etc)
Etc
NOTE: The leading term of the polynomial is the
most important term from a growth perspective.
Complexity Classes
• The complexity class of cubic polynomials
is represented by the notation Ɵ(n3)
• Note that Ɵ(n3) is a set of functions.
• Common complexity sets include
– Ɵ(lg n)
– Ɵ(n)
– Ɵ(n lg n)
– Ɵ(n2)
Ɵ(2n)
Ɵ(n!)
etc
Figure 1.3: Growth rates of
some common complexity
functions.
Doubling the Data Size
• If an algorithm is Ɵ(n2) and the data set is
doubled what happens to the execution
time?
Specificly assume that we have 2n items
Hence Ɵ((2n)2)=Ɵ(4n2) = 4Ɵ(n2)
Four times as long!
What about cubics?
Big O (memorize)
This is not a suggestion
Definition
For a given complexity function f(n), O(f(n))
is the set of functions g(n) for which there
exists some positive real constant c and
some nonnegative integer N such that for all
n≥N,
g(n) ≤ c × f(n)
2
2
Showing that 5𝑛 + 3𝑛 − 6 ∈ 𝜃(𝑛 )
We need to find a c and a N that will make
the following inequality true
5𝑛2 + 3𝑛 − 6 ≤ 𝑐𝑛2
What would a good choice for c be?
5𝑛2 + 3𝑛 − 6 ≤ 6𝑛2
3𝑛 − 6 ≤ 𝑛2
0 ≤ 𝑛2 − 3𝑛 + 6
We can solve this or just guess.
A solution : c=3 and c=6 works.
Big O , Big Ω, Big θ
Greater than
quadratics
N3,2n
Θ(
n2
)
Ω(n2)
All quadratics
Less than
quadratics
nlgn,n,lg
O(n2)
Figure 1.4: Illustrating "big O", Ω and Θ
Figure 1.5: The function n2 + 10n eventually stays beneath the function 2n2
Another way of looking at it
Figure 1.6: The sets O (n2), Ω (n2)and Θ (n2). Some exemplary members
are shown.
Logarithm Rules
The logarithm to the base b of x denoted logbx is
defined to that number y such that
by = x
logb(x1*x2) = logb x1 + logb x2 logbx > 0 if x > 1
logb(x1/x2) = logb x1 - logb x2 logbx = 0 if x = 1
logbx < 0 if 0 < x < 1
logb xc = c logbx
Additional Rules
For all real a>0, b>0 , c>0 and n
logb a = logca / logc b
logb a
logb (1/a) = -
logb a = 1/ logab
a logb n = n logb a
Theorem: log(n!)(nlogn)
Case 1 nlogn O(log(n!))
log(n!) = log(n*(n-1)*(n-2) * * * 3*2*1)
= log(n*(n-1)*(n-2)**n/2*(n/2-1)* * 2*1
=> log(n/2*n/2* * * n/2*1 *1*1* * * 1)
= log(n/2)n/2 = n/2 log n/2 O(nlogn)
Case 2 log(n!) O(nlogn)
log(n!) = logn + log(n-1) + log(n-2) + . . . Log(2) + log(1)
< log n + log n + log n . . . + log n
= nlogn
The Little o Theorem: If log(f)o(log(g)) and
lim g(n) =inf as n goes to inf then f o(g)
Note the above theorem does not apply to big O for
log(n2) O(log n) but n2 O(n)
Application: Show that 2n o(nn)
Taking the log of functions we have log(2n)=nlog22
and log( nn) = nlog2n.
Hence
lim
n
n log n
log n
lim
n log 2 n log 2
Implies that 2n o(nn)
Theorem: lg n o( n )
lg n
ln n
lim
lim
n
n n ln 2 n
1
ln n
lim
ln 2 n n
1
1/ n
lim
ln 2 n 1 (2 n )
Homework
• 1.1 problem 7
• 1.3 problem 14
• 1.4 problem 15, 19