Dana Scott on Lambda Calculus

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Prof. Dana Scott gave a few talks on Lambda Calculus, and some of them are available on Youtube.

A list of them can be found here:

Local Links

This video series seems to be taken in the same day, a total of 5 hours. Prof. Scott offered many anecdotal insights on how calculus was invented and formed. It directly relates to the notion of function and combinators. Particularly, the SK Combinators.

Lecture 1

This starting lecture talks about the name of Lambda came from[1].

Lecture 2

Godel Numbering

Think about variables in terms of special numbers. This is an insight from Godel[2]Cite error: Invalid <ref> tag; invalid names, e.g. too many, and later utilized to created Universal computation.

We don't need Turing Machine

In this lectureCite error: Invalid <ref> tag; invalid names, e.g. too many, Scott explicitly stated that:

"You don't need Turing Machine to understand it, I hope I can convince you of that."

Scott's Universe is the Powerset of Integers

In this lectureCite error: Invalid <ref> tag; invalid names, e.g. too many, Scott explicitly stated that:

"The Universe if the Powerset of Integers."

Sophomores or Juniors should learn some Topology

Sophomores or juniors should have some topology from calculus...

A neighborhood of a possibly infinite set...

Once you define Topology, you may define continuous functions

Lecture 3

This lecture[3] starts to mention the notion of algebraic closure and fixed points.

Lecture 4

This lecture[4]Cite error: Invalid <ref> tag; invalid names, e.g. too many mentioned three important persons in logic.

  1. John Myhill
  2. John Sheperdson
  3. Hartley Rogers Jr.

Why he kicks himself in the middle of the night

This is also the place where he starts talking about the recursive combinators, and how this enumerative device can be used to make one rich and famous.

  1. Here is where he wants to kick himself at the night
  2. No body said: "do this operators have any algebra to them...", if only, if only ...

This statement relates to the paper[5] on Algebra of Systems and this statement in particulary[6].



References

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