I've only found some indirect clue from eta expansion

SimpleExpr ::= SimpleExpr1
`_' The expression 𝑒 _ is well-formed if 𝑒 is of method type or if 𝑒 is a call-by-name parameter.
If 𝑒 is a method with parameters, 𝑒 _ represents 𝑒 converted to a function type by eta expansion.
If 𝑒 is a parameterless method or call-by-name parameter of type =>𝑇, 𝑒 _ represents the function of type () => 𝑇, which evaluates 𝑒 when it is applied to the empty parameterlist ().

So i guess eta is short for expression to anonymous function? Am i right?

  • 2
    Yes, more precisely to a subclass of them. – Thomas Lang Oct 19 '19 at 23:58

Eta is the greek letter Ξ· and in this case stands for extensionality. It comes from the lambda calculus. See https://en.wikipedia.org/wiki/Lambda_calculus#%CE%B7-conversion

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  • 1
    I see. <br/>Ξ±-conversion: changing bound variables (alpha); Ξ²-reduction: applying functions to their arguments (beta); Ξ·-conversion: which captures a notion of extensionality (eta). – caisil Oct 20 '19 at 1:47
  • Ξ²-reduction is more about substituting the argument of a function into its body, you reduce an application. We talk about Ξ±-renaming and Ξ·-expansion (or Ξ·-contraction when going the opposite direction). – Théo Winterhalter Oct 20 '19 at 9:52

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