\( \newcommand{\P}[]{\unicode{xB6}} \newcommand{\AA}[]{\unicode{x212B}} \newcommand{\empty}[]{\emptyset} \newcommand{\O}[]{\emptyset} \newcommand{\Alpha}[]{Α} \newcommand{\Beta}[]{Β} \newcommand{\Epsilon}[]{Ε} \newcommand{\Iota}[]{Ι} \newcommand{\Kappa}[]{Κ} \newcommand{\Rho}[]{Ρ} \newcommand{\Tau}[]{Τ} \newcommand{\Zeta}[]{Ζ} \newcommand{\Mu}[]{\unicode{x039C}} \newcommand{\Chi}[]{Χ} \newcommand{\Eta}[]{\unicode{x0397}} \newcommand{\Nu}[]{\unicode{x039D}} \newcommand{\Omicron}[]{\unicode{x039F}} \DeclareMathOperator{\sgn}{sgn} \def\oiint{\mathop{\vcenter{\mathchoice{\huge\unicode{x222F}\,}{\unicode{x222F}}{\unicode{x222F}}{\unicode{x222F}}}\,}\nolimits} \def\oiiint{\mathop{\vcenter{\mathchoice{\huge\unicode{x2230}\,}{\unicode{x2230}}{\unicode{x2230}}{\unicode{x2230}}}\,}\nolimits} \)

Calculus-based Probability

Basics

Axioms of Probability

  • \(\displaystyle 0 \leq P(E) \leq 1\)
  • \(\displaystyle P(S) = 1\) where \(\displaystyle S\) is your sample space
  • For mutually exclusive events \(\displaystyle E_1, E_2, ...\), \(\displaystyle P\left(\bigcup_i^\infty E_i\right) = \sum_i^\infty P(E_i)\)

Monotonicity

  • For all events \(\displaystyle A\), \(\displaystyle B\), \(\displaystyle A \subset B \implies P(A) \leq P(B)\)
Proof

Expectation and Variance

Some definitions and properties.

Definitions

Let \(\displaystyle X \sim D\) for some distribution \(\displaystyle D\). Let \(\displaystyle S\) be the support or domain of your distribution.

  • \(\displaystyle E(X) = \sum_S xp(x)\) or \(\displaystyle \int_S xp(x)dx\)
  • \(\displaystyle Var(X) = E[(X-E(X))^2] = E(X^2) - (E(X))^2\)

Total Expection

\(\displaystyle E(X) = E(E(X|Y))\)
Dr. Xu refers to this as the smooth property.

Proof

\(\displaystyle E(X) = \int_S xp(x)dx = \int_x x \int_y p(x,y)dy dx = \int_x x \int_y p(x|y)p(y)dy dx = \int_y\int_x x p(x|y)dxp(y)dy \)

Total Variance

\(\displaystyle Var(Y) = E(Var(Y|X)) + Var(E(Y | X)\)
This one is not used as often on tests as total expectation

Proof


Convergence

There are 4 types of convergence typically taught in undergraduate courses.
See Wikipedia Convergence of random variables

Almost Surely

  • \(\displaystyle P(\lim X_i = X) = 1\)

In Probability

For all \(\displaystyle \epsilon \gt 0\)
\(\displaystyle \lim P(|X_i - X| \geq \epsilon) = 0\)

  • Implies Convergence in distribution

In Distribution

Pointwise convergence of the cdf
A sequence of random variables \(\displaystyle X_1,...\) converges to \(\displaystyle X\) in probability if for all \(\displaystyle x \in S\),
\(\displaystyle \lim_{i \rightarrow \infty} F_i(x) = F(x)\)

  • Equivalent to convergence in probability if it converges to a degenerate distribution

In Mean Squared

\(\displaystyle \lim_{i \rightarrow \infty} E(|X_i-X|^2)=0\)

Delta Method

See Wikipedia
Suppose \(\displaystyle \sqrt{n}(X_n - \theta) \xrightarrow{D} N(0, \sigma^2)\).
Let \(\displaystyle g\) be a function such that \(\displaystyle g'\) exists and \(\displaystyle g'(\theta) \neq 0\)
Then \(\displaystyle \sqrt{n}(g(X_n) - g(\theta)) \xrightarrow{D} N(0, \sigma^2 g'(\theta)^2)\)
Multivariate:
\(\displaystyle \sqrt{n}(B - \beta) \xrightarrow{D} N(0, \Sigma) \implies \sqrt{n}(h(B)-h(\beta)) \xrightarrow{D} N(0, h'(\theta)^T \Sigma h'(\theta))\)

Notes
  • You can think of this like the Mean Value theorem for random variables.
\(\displaystyle (g(X_n) - g(\theta)) \approx g'(\theta)(X_n - \theta)\)

Limit Theorems

Markov's Inequality

Chebyshev's Inequality

  • \(\displaystyle P(|X - \mu| \geq k \sigma) \leq \frac{1}{k^2}\)
  • \(\displaystyle P(|X - \mu| \geq k) \leq \frac{\sigma^2}{k^2}\)
Proof

Apply Markov's inequality:
Let \(\displaystyle Y = |X - \mu|\) \(\displaystyle P(|X - \mu| \geq k) = P(Y \geq k) = = P(Y^2 \geq k^2) \leq \frac{E(Y^2)}{k^2} = \frac{E((X - \mu)^2)}{k^2}\)

  • Usually used to prove convergence in probability

Central Limit Theorem

Very very important. Never forget this.
For any distribution, the sample mean converges in distribution to normal. Let \(\displaystyle \mu = E(x)\) and \(\displaystyle \sigma^2 = Var(x)\)
Different ways of saying the same thing:

  • \(\displaystyle \sqrt{n}(\bar{x} - \mu) \sim N(0, \sigma^2)\)
  • \(\displaystyle \frac{\sqrt{n}}{\sigma}(\bar{x} - \mu) \sim N(0, 1)\)
  • \(\displaystyle \bar{x} \sim N(\mu, \sigma^2/n)\)

Law of Large Numbers

Relationships between distributions

This is important for tests.
See Relationships among probability distributions.

Poisson Distributions

Sum of poission is poisson sum of lambda.

Normal Distributions

  • If \(\displaystyle X_1 \sim N(\mu_1, \sigma_1^2)\) and \(\displaystyle X_2 \sim N(\mu_2, \sigma_2^2)\) then \(\displaystyle \lambda_1 X_1 + \lambda_2 X_2 \sim N(\lambda_1 \mu_1 + \lambda_2 X_2, \lambda_1^2 \sigma_1^2 + \lambda_2^2 + \sigma_2^2)\) for any \(\displaystyle \lambda_1, \lambda_2 \in \mathbb{R}\)

Gamma Distributions

Note exponential distributions are also Gamma distrubitions

  • If \(\displaystyle X \sim \Gamma(k, \theta)\) then \(\displaystyle \lambda X \sim \Gamma(k, c\theta)\).
  • If \(\displaystyle X_1 \sim \Gamma(k_1, \theta)\) and \(\displaystyle X_2 \sim \Gamma(k_2, \theta)\) then \(\displaystyle X_2 + X_2 \sim \Gamma(k_1 + k_2, \theta)\).
  • If \(\displaystyle X_1 \sim \Gamma(\alpha, \theta)\) and \(\displaystyle X_2 \sim \Gamma(\beta, \theta)\), then \(\displaystyle \frac{X_1}{X_1 + X_2} \sim B(\alpha, \beta)\).

T-distribution

Ratio of normal and squared-root of Chi-sq distribution yields T-distribution.

Chi-Sq Distribution

The ratio of two normalized Chi-sq is an F-distributions

F Distribution

Too many. See the Wikipedia Page. Most important are Chi-sq and T distribution

Textbooks