Law of large numbers for random Dirac measures

Question

Suppose $\{X_1,...X_n\}:\Omega \to \mathbb{R}^p$ be i.i.d. random vectors with common probability law/measure $p$, i.e. $Prob(X_i^{-1}(E))=p(E) \forall E \subset \mathbb{R}^p $ Borel measurable.

Consider the random Dirac measures $\delta_{X_i}$, and their average, which is a random probability measure on $\mathbb{R}^p$, defined by $\frac{1}{n}\sum_{i=1}^{n} \delta_{X_i}$. I'd like to know if $\frac{1}{n}\sum_{i=1}^{n} \delta_{X_i}$ weakly converges to the deterministic measure $p$,

i.e. for every continuous, bounded function $f: \mathbb{R}^p \to \mathbb{R}$, must we have:

$$\frac{1}{n}\sum_{i=1}^{n} {f(X_i)} \to \int_{\mathbb{R}^p } f(x)dp(x)$$ as a convergence in probability of a sequence of random variables $\frac{1}{n}\sum_{i=1}^{n} {f(X_i)}$?

ON a related note, I'd also like to know if the following is true or not:

If a sequence of random measures converges to a deterministic measure in probability, is it equivalent to have the same convergence almost surely? This question is motivated by the fact a when a sequence of random variables converge to a sonstant in probability, the convergence is a.s.

P.S. I understand that this question might be elemenrtary to many of you, so some references would be greatly apreciated!

Answer 1

For your question to make sense, you have to actually have an infinite sequence $X_1,X_2,\dots$ of iid random vectors. Then, by the strong law of large numbers (SLLN) , $$\frac1n\,\sum_{i=1}^n f(X_i)\to Ef(X_1)=\int_{\mathbb R^p} f\, dp$$ almost surely (a.s.), which, as desired, implies the weak law of large numbers (WLLN) , that is, the convergence in probability (which is always implied by the a.s. convergence).

Concerning your second question, it is of course not true that "when a sequence of random variables converge[s] to a [constant] in probability, the convergence is a.s." -- That would be the same as to say that the convergence in probability always implies the a.s. convergence, because $Y_n\to Y$ a.s. (respectively, in probability) if and only if $Y_n-Y$ converges to the constant $0$ a.s. (respectively, in probability).