independence of random variables
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Independence of random variables. Definition Random variables X and Y are independent if their joint distribution function factors into the product of their marginal distribution functions Theorem - PowerPoint PPT PresentationTRANSCRIPT
week 8 1
Independence of random variables • Definition
Random variables X and Y are independent if their joint distribution function factors into the product of their marginal distribution functions
• TheoremSuppose X and Y are jointly continuous random variables. X and Y are independent if and only if given any two densities for X and Y their product is the joint density for the pair (X,Y) i.e.
Proof:
• If X and Y are independent random variables and Z =g(X), W = h(Y) then Z, W are also independent.
yFxFyxF YXYX ,,
yfxfyxf YXYX ,,
week 8 2
Example
• Suppose X and Y are discrete random variables whose values are the non-negative integers and their joint probability function is
Are X and Y independent? What are their marginal distributions?
• Factorization is enough for independence, but we need to be careful of constant terms for factors to be marginal probability functions.
...2,1,0,!!
1,, yxe
yxyxp yx
YX
week 8 3
Example and Important Comment
• The joint density for X, Y is given by
• Are X, Y independent?
• Independence requires that the set of points where the joint density is positive must be the Cartesian product of the set of points where the marginal densities are positive i.e. the set of points where fX,Y(x,y) >0 must be (possibly infinite) rectangles.
otherwise
yxyxyxyxf YX
0
1,0,4,
2
,
week 8 4
Conditional densities
• If X, Y jointly distributed continuous random variables, the conditional density function of Y | X is defined to be
if fX(x) > 0 and 0 otherwise.
• If X, Y are independent then .
• Also,
Integrating both sides over x we get
• This is a useful application of the law of total probability for the continuous case.
xf
yxfxyf
X
YXXY
,| ,
|
xfxyfyxf XXYYX |, |,
dxxfxyfyf XXYY ||
yfxyf YXY ||
week 8 5
Example
• Consider the joint density
• Find the conditional density of X given Y and the conditional density of Y given X.
otherwise
yxeyxf
y
YX0
0,
2
,
week 8 6
Properties of Expectations Involving Joint Distributions
• For random variables X, Y and constants
E(aX + bY) = aE(X) + bE(Y)
Proof:
• For independent random variables X, Y
E(XY) = E(X)E(Y)
whenever these expectations exist.
Proof:
Rba ,
week 8 7
Covariance
• Recall: Var(X+Y) = Var(X) + Var(Y) +2 E[(X-E(X))(Y-E(Y))]
• Definition For random variables X, Y with E(X), E(Y) < ∞, the covariance of X and Y is
• Covariance measures whether or not X-E(X) and Y-E(Y) have the same sign.
• Claim:
Proof:
• Note: If X, Y independent then E(XY) =E(X)E(Y), and Cov(X,Y) = 0.
YEYXEXEYXCov ,
YEXEXYEYXCov ,
week 8 8
Example • Suppose X, Y are discrete random variables with probability function given
by
• Find Cov(X,Y). Are X,Y independent?
y x -1 0 1 pX(x)
-1 1/8 1/8 1/8
0 1/8 0 1/8
1 1/8 1/8 1/8
pY(y)
week 8 9
Important Facts
• Independence of X, Y implies Cov(X,Y) = 0 but NOT vice versa.
• If X, Y independent then Var(X+Y) = Var(X) + Var(Y).
• If X, Y are NOT independent then
Var(X+Y) = Var(X) + Var(Y) + 2Cov(X,Y).
• Cov(X,X) = Var(X).
week 8 10
Example
• Suppose Y ~ Binomial(n, p). Find Var(Y).
week 8 11
Properties of Covariance
For random variables X, Y, Z and constants
• Cov(aX+b, cY+d) = acCov(X,Y)
• Cov(X+Y, Z) = Cov(X,Z) + Cov(Y,Z)
• Cov(X,Y) = Cov(Y, X)
Rdcba ,,,
week 8 12
Correlation• Definition
For X, Y random variables the correlation of X and Y is
whenever V(X), V(Y) ≠ 0 and all these quantities exists.
• Claim: ρ(aX+b,cY+d) = ρ(X,Y)
Proof:
• This claim means that the correlation is scale invariant.
YVXV
YXCovYX
,,
week 8 13
Theorem
• For X, Y random variables, whenever the correlation ρ(X,Y) exists it must satisfy
-1 ≤ ρ(X,Y) ≤ 1Proof:
week 8 14
Interpretation of Correlation ρ
• ρ(X,Y) is a measure of the strength and direction of the linear relationship between X, Y.
• If X, Y have non-zero variance, then .
• If X, Y independent, then ρ(X,Y) = 0. Note, it is not the only time when ρ(X,Y) = 0 !!!
• Y is a linearly increasing function of X if and only if ρ(X,Y) = 1.
• Y is a linearly decreasing function of X if and only if ρ(X,Y) = -1.
1,1
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Example
• Find Var(X - Y) and ρ(X,Y) if X, Y have the following joint density
otherwise
xyxyxf YX 0
103,,
week 8 16
Conditional Expectation
• For X, Y discrete random variables, the conditional expectation of Y given X = x is
and the conditional variance of Y given X = x is
where these are defined only if the sums converges absolutely.
• In general,
yXY xypyhxXYhE || |
22
|2
||
|||
xXYExXYE
xypxXYEyxXYVy
XY
y
XY xypyxXYE || |
week 8 17
• For X, Y continuous random variables, the conditional expectation of
Y given X = x is
and the conditional variance of Y given X = x is
• In general,
dyxyfyxXYE XY || |
22
|2
||
|||
xXYExXYE
dyxyfxXYEyxXYV XY
dyxyfyhxXYhEy XY || |
week 8 18
Example
• Suppose X, Y are continuous random variables with joint density function
• Find E(X | Y = 2).
otherwise
xyeyxf
y
YX0
10,0,,
week 8 19
More about Conditional Expectation
• Assume that E(Y | X = x) exists for every x in the range of X. Then, E(Y | X ) is a random variable. The expectation of this random variable is
E [E(Y | X )]
• TheoremE [E(Y | X )] = E(Y)
This is called the “Law of Total Expectation”.
Proof:
week 8 20
Example
• Suppose we roll a fair die; whatever number comes up we toss a coin that many times. What is the expected number of heads?
week 8 21
Theorem
• For random variables X, Y
V(Y) = V [E(Y|X)] + E[V(Y|X)]
Proof:
week 8 22
Example
• Let X ~ Geometric(p).
Given X = x, let Y have conditionally the Binomial(x, p) distribution.
• Scenario: doing Bernoulli trails with success probability p until 1st success so X : number of trails. Then do x more trails and count the number of success which is Y.
• Find, E(Y), V(Y).
week 8 23
Law of Large Numbers
• Toss a coin n times.
• Suppose
• Xi’s are Bernoulli random variables with p = ½ and E(Xi) = ½.
• The proportion of heads is .
• Intuitively approaches ½ as n ∞ .
Tupcametossiif
HupcametossiifX
th
th
i0
1
n
iin X
nX
1
1
nX
week 8 24
Markov’s Inequality
• If X is a non-negative random variable with E(X) < ∞ and a >0 then,
Proof:
a
XEaXP
week 8 25
Chebyshev’s Inequality
• For a random variable X with E(X) < ∞ and V(X) < ∞, for any a >0
• Proof:
2a
XVaXEXP
week 8 26
Back to the Law of Large Numbers
• Interested in sequence of random variables X1, X2, X3,… such that the random variables are independent and identically distributed (i.i.d). Let
Suppose E(Xi) = μ , V(Xi) = σ2, then
and
• Intuitively, as n ∞, so
n
iin X
nX
1
1
n
ii
n
iin XE
nX
nEXE
11
11
n
XVn
Xn
VXVn
ii
n
iin
2
12
1
11
0nXV nn XEX
week 8 27
• Formally, the Weak Law of Large Numbers (WLLN) states the following:
• Suppose X1, X2, X3,…are i.i.d with E(Xi) = μ < ∞ , V(Xi) = σ2 < ∞, then for any positive number a
as n ∞ .
This is called Convergence in Probability.
Proof:
0 aXP n
week 8 28
Example
• Flip a coin 10,000 times. Let
• E(Xi) = ½ and V(Xi) = ¼ .
• Take a = 0.01, then by Chebyshev’s Inequality
• Chebyshev Inequality gives a very weak upper bound.
• Chebyshev Inequality works regardless of the distribution of the Xi’s.
Tupcametossiif
HupcametossiifX
th
th
i0
1
4
1
01.0
1
000,104
101.0
2
12
nXP
week 8 29
Strong Law of Large Number
• Suppose X1, X2, X3,…are i.i.d with E(Xi) = μ < ∞ , then converges to μ
as n ∞ with probability 1. That is
• This is called convergence almost surely.
11
lim 21
n
nXXX
nP
nX