On the algebraic notation for such types:

  • X for the singleton container type
  • + for choice between two types (tagged unions)
  • for the ordered product of two types
  • and a least fixed-point operator, that may be implicit.

Additionally, we have:

  • 0 for the empty type
  • 1 for unit
  • X^2 for X•X

Thus, we can describe e.g. the type of binary trees as:

  • B = 1 + X • B^2

or the type of inductive lists:

  • L = 1 + X • L

Regular data structures described in this form are the core of algebraic data types as found in Haskell or ML.

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