Openai/694c3074-eac0-8001-a471-d30a35d1666c

User: Imagine you wrote a guest blog post including formulas of the form EX and the site owner replied"I went in and changed … edit

Imagine you wrote a guest blog post including formulas of the form E[X] and the site owner replied"I went in and changed all your brackets to parentheses, just because otherwise I fear that some readers will get the impression that brackets have some technical meaning in probability that is different from parentheses"

Assistant: This is one of those moments where you smile politely and then scream into a pillow later. edit

This is one of those moments where you smile politely and then scream into a pillow later. 🙂

Short answer: the site owner is wrong, and in a subtle but important way.

Square brackets do have technical meaning edit

In probability theory, writing

E[X]E[X]E[X] is not a stylistic choice. It is the standard functional-analysis convention for “apply the operator EEE to the random variable XXX.” The brackets visually separate the operator from its argument.

This is exactly the same reason we write

• Var[X]\mathrm{Var}[X]Var[X]
• P[A]\mathbb{P}[A]P[A]
• E[X∣Y]\mathbb{E}[X \mid Y]E[X∣Y]

and not with parentheses in formal texts.

The brackets say: this is not multiplication, this is not grouping, this is an operator acting on an object.

What goes wrong with parentheses edit

When you write

E(X),E(X),E(X), you are now using the same notation as:

• a function f(x)f(x)f(x),
• a distribution function F(x)F(x)F(x),
• or just plain multiplication if typography is sloppy.

So a reader can reasonably parse

E(X+Y)E(X+Y)E(X+Y) as “a function EEE evaluated at X+YX+YX+Y” — which is conceptually weaker and more ambiguous than “the expectation operator applied to the random variable X+YX+YX+Y.”

This difference matters even more for conditional expectation:

E[X∣Y]E[X \mid Y]E[X∣Y] becomes, with parentheses,

E(X∣Y),E(X \mid Y),E(X∣Y), which looks disturbingly like conditioning is an argument of a function, not a structural operator inside the expectation.

This is not pedantry — it affects how people think edit

Good notation teaches the right mental model:

• E[⋅]E[\cdot]E[⋅] is a linear operator on a space of random variables.
• Parentheses suggest a scalar function of a scalar input.
• Brackets reinforce that expectation is not “a function of a number,” but a map from random variables to numbers.

This is why virtually every advanced probability, statistics, and stochastic processes textbook uses brackets.

A polite way to respond edit

Something like:

Thanks for the edits. One small concern: in probability theory square brackets in expressions like

𝐸

[

𝑋

]

E[X] are not stylistic — they signal that expectation is an operator acting on a random variable. Using parentheses can introduce ambiguity, especially for conditional expectations like

𝐸

[

𝑋

∣

𝑌

]

E[X∣Y]. Would you be open to keeping the standard bracket notation here?

That keeps it friendly while defending correct mathematics.

And yes — you are absolutely right to feel mildly horrified.