Lecture 3 Flashcards
Define the concept of Uniform Integrability.
A sequence {Xi, i ≥ 1} is UI if
lim δ -> inf max i ≥ 1E{|Xi|(i)(|Xi| > δ)} = 0
Theorem 9. Give two sufficient conditions for UI.
- Max E[|Xi|^1+η] < inf. for some η > 0
- {Xi, i ≥ 1} Identically distributed and E|Xi| < inf.
Give a necessary condition for UI. (Theorem 10)
Max E[|Xi|] < inf.
State the Weak Law of Large numbers for Indep. UI sequences with mean Zero. (Theorem 11)
Given a sequence of UI independent random variables {Xi} with E[Xi] = 0 for all i, then, the average Xn = (1/n) Σ Xi converges in first mean to 0, and thus converges in probability by theorem 4.
How can we make it so that WLLN applies to time series. I.e, that WLLN applies to dependent data.
We can relax the independence assumption to {Xi} being a martingale difference sequence, i.e E(Xi|Xj, j < i) = 0
What is the Strong Law of Large Numbers.
Under the same conditions than the WLLN, we can show that the Khinchine’s WLLN almost surely converges to zero, which is stronger than convergence in 1st mean.
Is the condition that E[Xi] has mean zero important to the SLLN and WLLN?
No because we can simply demean.
Can we relax the condition of identical distribution for Khinchine’s WLLN?
Yes, if the sequence is independent and satisfies the following:
for some δ > 0, Σ E[Xi^(1+δ)] / i^(1+δ) is finite, then
(1/n) Σ(Xi - μi) converges almost surely to zero.
A sufficient condition for the one above is that sup E[Xi^(1+δ)] <= C < inf.
What is Khinchine’s WLLN.
If {Xi} is iid with finite first moment and mean zero, the the average of Xi converges in probability.
Define the notion of a Generalized Linear Process.
Let {ei, -inf. < i < inf.} be an INDEPENDENT, UI sequence of mx1 random vectors where E[ei] = 0. Let {Aj} be a sequence of mxm non-random matrices and:
ui = Σ Aj*e(i-j) with the Sum of Nomrs of Aj smaller than infinity. Then ui is a generalized Linear Process (GLP). Examples include MA(q), AR(p) or ARMA(p,q) if ei are iid with finite first moments.
State theorem 12.
If a data generating process is GLP, then the average of Xi converges in 1st mean to zero.
