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Is there a short-hand notation for $$ f(x) = 1 \quad \forall x $$ ?

I've seen $f\equiv 1$ being used before, but found some some might (mis)interpret that as $f:=1$ (in the sense of definition), i.e., $f$ being the number $1$.

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    I tend to interpret $\equiv$ in the way you want. Also, I usually don't take $:=$ to mean a definition, so much as an instance. E.g. $f:=1$ to me means that $f$ will represent $1,$ but it is not a definition of $f.$2012-07-27
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    I also interpret $\equiv$ in the way you want. (I do take $:=$ to denote a definition.)2012-07-27
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    $A\triangleq B$ is sometimes okay, and $\newcommand\assign{\mathinner{:=}}A\assign B$ sometimes represent $A\gets B$ in context of computer programmng.2012-07-28
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    That's why the (sub)section *notation* is always a great idea at the beginning of any book or paper.2012-07-29

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Go ahead and use $\equiv$. To prevent any possibility of misunderstanding, you can use the word "constant" the first time this notation appears. As in "let $f$ be the constant function $f\equiv1$..."