Decidable Problem

A decidable problem is one that we can come to a yes/no answer given any input. An examle would be given a number determine if it is divisible by 3. We know that the algorithm below would provide the correct ouput every time.

PRODECURE divisbleByThree(num)
    IF (num MOD 3 = 0) 
        RETURN true
    ELSE
        RETURN false
  File "/tmp/ipykernel_64524/331745577.py", line 1
    PRODECURE divisbleByThree(num)
              ^
SyntaxError: invalid syntax

Undecidable Problem

Halting Problem

The halting problem is defined as: Given an arbitrary computer program with given inputs will the program stop or will it run forever?

Undecidable Problems

A problem where an algorithm cannot make a correct yes/no answer every time.

One way would be to test for an ending, but what if that ending is not easily found? What if it takes an unreasonable amount of time to find the ending? Is that because there is an ending or does one not exist?

You see where the problem comes in? This is an undecidable problem – there is no algorithm which can always produce a yes/no answer for every input of the problem.

Halting Problem in Computers Where may we have seen this in computers today? When a website or program takes too long to load it. It may never load, or it may just be taking a long time. Either way, after a certain time the computer decides the program should be stopped.

Popcorn Hack #1

An algorithm can be used to solve an undecidable problem. (True/False)

ANSWER: False

Popcorn Hack #2

If a programmer encounters an undecidable problem, they can just use an alogirhtm that works most of the time. (True/False)

ANSWER: False

Scenarios of Undecidable Problems in Computing

  1. Infinite Loop in Program Execution:
    • When a program enters an infinite loop, it becomes undecidable whether it will eventually terminate or run indefinitely.
  2. Complex Conditional Statements:
    • Programs with intricate conditional statements or complex control flow may pose undecidable scenarios, making it challenging to determine their termination.
  3. Non-Terminating Recursive Functions:
    • Recursive functions that do not have a base case or have poorly defined termination conditions can result in undecidability regarding their halting behavior.
  4. Unknown Input Space Size:
    • In cases where the size of the input space is unknown or unbounded, it becomes difficult to ascertain if a program will halt for all possible inputs.
  5. Multithreading and Concurrency:
    • Undecidability may arise in concurrent programs where multiple threads interact, introducing intricate synchronization and communication challenges.

Popcorn Hack 3

An algorithm exists that can always produce a yes/no answer for the halting problem. (True/False) -False

Homework Question

Research and explain how modern systems or browsers deal with the aspects of the halting problem when a program takes too long to load. Provide examples of mechanisms or strategies implemented in real-world scenarios to manage unresponsive programs or prolonged loading times.

ASNWER: Some ways that browsers and systems deal with halting problems is that they reduce the quality of the service temporarily to prevent the network from crashing completely. For example, when there is slow internet connection with a netflix network, the screen quality is usually reduced to keep the program running without having it load for too long.