Type theory: Difference between revisions
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The topic of ''type [[theory]]'' is fundamental both in [[logic]] and computer | The topic of ''type [[theory]]'' is fundamental both in [[logic]] and computer Science , for instance: | ||
# Reynolds 1983 and 1985. | # Reynolds 1983 and 1985. | ||
# Paradoxes and Russell's Type Theories | # Paradoxes and Russell's Type Theories |
Latest revision as of 17:54, 21 February 2024
The topic of type theory is fundamental both in logic and computer Science , for instance:
- Reynolds 1983 and 1985.
- Paradoxes and Russell's Type Theories
- Simple Type Theory and the λ -Calculus.
Church's type theory, aka simple type theory, is a formal logical language which includes classical first-order and propositional logic, but is more expressive in a practical sense. It is used, with some modifications and enhancements, in most modern applications of type theory.