this post was submitted on 28 Mar 2024
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How would you represent something like "sum a list of numbers" as components of verifiers?
Here's how I think it works
In formal language, what it means to accept a verification means does the result fall into the list of acceptable values.
Consider adding two 2-bit numbers:
The machine itself simply holds this automata and language, so all it does is take input and reject/accept end state. I think you're just getting caught up in definitions
A sum of a list of numbers I think would be something like
Machines accept a valid state or hit an error state (accept/reject). The computation happens between the input and accept/reject.
But maybe I don't understand it either. It's been a while since I poked around at this stuff.
For all possible input, only recognize the one input that's (under certain encoding scheme) equal to the sum of the given list. That's for a given list.
Another more general approach is that, only recognize the input if (under certain encoding), it's a pair of a list and a number, where the number is the sum of the list.
In general, given a Turing machine which outputs the result of a procedure to its memory tape, you can equivalently construct a recognizer of valid input/output pairs. Say P is the procedure, then the recognizer R is
let (i, o) = input in P(i) = o
The reverse is also possible. Give a recognizer R, you can construct a procedure P that given part of the input (can be empty), computes the rest of the input that makes R accept the whole. It can be defined as
for o in all-strings, if R(i, o) then output o and halt, else continue
.It might feel contrived at first, but both views can be useful depending on the situation. You'll get used to it soon with some exercises.