Let ${\displaystyle (E,\|\cdot \|)}$  be a real separable Banach space with the norm induced topology, we use the Borel σ-algebra and denote the dual space as ${\displaystyle E^{*}}$ . Let ${\displaystyle \langle z,S\rangle :={}_{E^{*}}\langle z,S\rangle _{E}}$  be the dual pairing and ${\displaystyle i}$  is the imaginary unit. Let

• ${\displaystyle X_{1},\dots ,X_{n}}$  be independent and symmetric ${\displaystyle E}$ -valued random variables defined on the same probability space
• ${\displaystyle S_{n}=\sum _{i=1}^{n}X_{n}}$ 
• ${\displaystyle \mu _{n}}$  be the probability measure of ${\displaystyle S_{n}}$ 
• ${\displaystyle S}$  some ${\displaystyle E}$ -valued random variable.

The following is equivalent^[2]: 40

1. ${\displaystyle S_{n}\to S}$  converges almost surely.
2. ${\displaystyle S_{n}\to S}$  converges in probability.
3. ${\displaystyle \mu _{n}}$  converges to ${\displaystyle \mu }$  in the Lévy–Prokhorov metric.
4. ${\displaystyle \{\mu _{n}\}}$  is uniformly tight.
5. ${\displaystyle \langle z,S_{n}\rangle \to \langle z,S\rangle }$  in probability for every ${\displaystyle z\in E^{*}}$ .
6. There exist a probability measure ${\displaystyle \mu }$  on ${\displaystyle E}$  such that for every ${\displaystyle z\in E^{*}}$ 

${\displaystyle \mathbb {E} [e^{i\langle z,S_{n}\rangle }]\to \int _{E}e^{i\langle z,x\rangle }\mu (\mathrm {d} x).}$ 

Remarks: Since ${\displaystyle E}$  is separable point ${\displaystyle 3}$  (i.e. convergence in the Lévy–Prokhorov metric) is the same as convergence in distribution ${\displaystyle \mu _{n}\implies \mu }$ . If we remove the symmetric distribution condition:

• in a finite-dimensional setting equivalence is true for all except point ${\displaystyle 4}$  (i.e. the uniform tighness of ${\displaystyle \{\mu _{n}\}}$ ),^[2]
• in an infinite-dimensional setting ${\displaystyle 1\iff 2\iff 3}$  is true but ${\displaystyle 6\implies 3}$  does not always hold.^[2]: 37

• Pap, Gyula; Heyer, Herbert (2010). Structural Aspects in the Theory of Probability. Singapore: World Scientific. p. 79.