Presentation is loading. Please wait.

Presentation is loading. Please wait.

Costas Busch - RPI1 Decidability. Costas Busch - RPI2 Another famous undecidable problem: The halting problem.

Published byMagnus Strickland Modified over 7 years ago

Similar presentations

Presentation on theme: "Costas Busch - RPI1 Decidability. Costas Busch - RPI2 Another famous undecidable problem: The halting problem."— Presentation transcript:

1 Costas Busch - RPI1 Decidability

2 Costas Busch - RPI2 Another famous undecidable problem: The halting problem

3 Costas Busch - RPI3 The Halting Problem Input:Turing Machine String Question: Does halt on input ?

4 Costas Busch - RPI4 Theorem: The halting problem is undecidable Proof:Assume for contradiction that the halting problem is decidable (there are and for which we cannot decide whether halts on input )

5 Costas Busch - RPI5 Thus, there exists Turing Machine that solves the halting problem YEShalts on doesn’t halt on NO

6 Costas Busch - RPI6 Input: initial tape contents Encoding of String YES NO Construction of

7 Costas Busch - RPI7 Construct machine : If returns YES then loop forever If returns NO then halt

8 Costas Busch - RPI8 NO Loop forever YES

9 Costas Busch - RPI9 Construct machine : Input: If halts on input Then loop forever Else halt (machine )

10 Costas Busch - RPI10 copy

11 Costas Busch - RPI11 Run machine with input itself: Input: If halts on input Then loop forever Else halt (machine )

12 Costas Busch - RPI12 on input If halts then loops forever If doesn’t halt then it halts : NONSENSE !!!!!

13 Costas Busch - RPI13 Therefore, we have contradiction The halting problem is undecidable END OF PROOF

14 Costas Busch - RPI14 Another proof of the same theorem: If the halting problem was decidable then every recursively enumerable language would be recursive

15 Costas Busch - RPI15 Theorem: The halting problem is undecidable Proof:Assume for contradiction that the halting problem is decidable

16 Costas Busch - RPI16 Let be a recursively enumerable language Let be the Turing Machine that accepts We will prove that is also recursive: we will describe a Turing machine that accepts and halts on any input

17 Costas Busch - RPI17 halts on ? YES NO Run with input reject accept reject Turing Machine that accepts and halts on any input Halts on final state Halts on non-final state

18 Costas Busch - RPI18 Thereforeis recursive But there are recursively enumerable languages which are not recursive Contradiction!!!! Since is chosen arbitrarily, every recursively enumerable language is also recursive

19 Costas Busch - RPI19 Therefore, the halting problem is undecidable END OF PROOF

Download ppt "Costas Busch - RPI1 Decidability. Costas Busch - RPI2 Another famous undecidable problem: The halting problem."

Similar presentations

Linear Bounded Automata LBAs

Linear Bounded Automata LBAs
CS 461 – Nov. 9 Chomsky hierarchy of language classes –Review –Let’s find a language outside the TM world! –Hints: languages and TM are countable, but.

CS 461 – Nov. 9 Chomsky hierarchy of language classes –Review –Let’s find a language outside the TM world! –Hints: languages and TM are countable, but.
Prof. Busch - LSU1 Decidable Languages. Prof. Busch - LSU2 Recall that: A language is Turing-Acceptable if there is a Turing machine that accepts Also.

Prof. Busch - LSU1 Decidable Languages. Prof. Busch - LSU2 Recall that: A language is Turing-Acceptable if there is a Turing machine that accepts Also.
Courtesy Costas Busch - RPI1 A Universal Turing Machine.

Courtesy Costas Busch - RPI1 A Universal Turing Machine.
Costas Busch - RPI1 Single Final State for NFAs. Costas Busch - RPI2 Any NFA can be converted to an equivalent NFA with a single final state.

Costas Busch - RPI1 Single Final State for NFAs. Costas Busch - RPI2 Any NFA can be converted to an equivalent NFA with a single final state.
Fall 2004COMP 3351 Recursively Enumerable and Recursive Languages.

Fall 2004COMP 3351 Recursively Enumerable and Recursive Languages.
Costas Busch - RPI1 Undecidable problems for Recursively enumerable languages continued…

Costas Busch - RPI1 Undecidable problems for Recursively enumerable languages continued…
Fall 2003Costas Busch - RPI1 Decidability. Fall 2003Costas Busch - RPI2 Recall: A language is decidable (recursive), if there is a Turing machine (decider)

Fall 2003Costas Busch - RPI1 Decidability. Fall 2003Costas Busch - RPI2 Recall: A language is decidable (recursive), if there is a Turing machine (decider)
Recursively Enumerable and Recursive Languages

Recursively Enumerable and Recursive Languages
1 The Chomsky Hierarchy. 2 Unrestricted Grammars: Rules have form String of variables and terminals String of variables and terminals.

1 The Chomsky Hierarchy. 2 Unrestricted Grammars: Rules have form String of variables and terminals String of variables and terminals.
1 Uncountable Sets continued.... 2 Theorem: Let be an infinite countable set. The powerset of is uncountable.

1 Uncountable Sets continued Theorem: Let be an infinite countable set. The powerset of is uncountable.
Fall 2004COMP 3351 The Chomsky Hierarchy. Fall 2004COMP 3352 Non-recursively enumerable Recursively-enumerable Recursive Context-sensitive Context-free.

Fall 2004COMP 3351 The Chomsky Hierarchy. Fall 2004COMP 3352 Non-recursively enumerable Recursively-enumerable Recursive Context-sensitive Context-free.
Fall 2004COMP 3351 Reducibility. Fall 2004COMP 3352 Problem is reduced to problem If we can solve problem then we can solve problem.

Fall 2004COMP 3351 Reducibility. Fall 2004COMP 3352 Problem is reduced to problem If we can solve problem then we can solve problem.
Linear Bounded Automata LBAs

Linear Bounded Automata LBAs
Homework #9 Solutions.

Homework #9 Solutions.
1 Decidability continued. 2 Undecidable Problems Halting Problem: Does machine halt on input ? State-entry Problem: Does machine enter state halt on input.

1 Decidability continued. 2 Undecidable Problems Halting Problem: Does machine halt on input ? State-entry Problem: Does machine enter state halt on input.
Fall 2005Costas Busch - RPI1 Recursively Enumerable and Recursive Languages.

Fall 2005Costas Busch - RPI1 Recursively Enumerable and Recursive Languages.
Courtesy Costas Busch - RPI1 Reducibility. Courtesy Costas Busch - RPI2 Problem is reduced to problem If we can solve problem then we can solve problem.

Courtesy Costas Busch - RPI1 Reducibility. Courtesy Costas Busch - RPI2 Problem is reduced to problem If we can solve problem then we can solve problem.
Fall 2006Costas Busch - RPI1 Undecidable Problems (unsolvable problems)

Fall 2006Costas Busch - RPI1 Undecidable Problems (unsolvable problems)
Prof. Busch - LSU1 Undecidable Problems (unsolvable problems)

Prof. Busch - LSU1 Undecidable Problems (unsolvable problems)

Similar presentations

Ads by Google