I checked several cases and saw that two functions are equivalent in these samples. However, are the two equivalent in all cases? Is there a way to check that?
Explicit function:
g[x_]= π
h[_] = π
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1 Answer
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Yes, they are equivalent.
_ is a pattern that matches any expression.
x_ is the same thing, with a name, x. The pattern name can be used in two ways.
The most common way is to refer to it on the right hand side of the definition or rule. For example, f[x_] := x^2. If we are not using the matched expression in the right hand side, there's no reason to name the pattern.
The other situation is when two sub-patterns have the same name. This is used to require them to match the same expression. For example, {x_, x_} matches {1,1} but not {1,2}. In contrast, {_, _} matches both {1,1} and {1,2}.
Neither situation applies to your example. The pattern name is never used for anything. Thus there's no purpose of naming the pattern.
Further reading:
answered Jan 31, 2016 at 19:01
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$\begingroup$ Thanks for the thorough answer! I've just known that the pattern is called blank. $\endgroup$– emnhaCommented Jan 31, 2016 at 19:11