• Banno
    25k
    ...to prove there is no proof G in F requires a sequence of
    inference steps that prove that they themselves do not exist.
    PL Olcott

    G is not a deduction in F. That would be silly.

    Rather, Gödel shows using arithmatization and the diagonalization that the structure of F is such that there must be WFF such as G. He's not using the deductive power of F to prove that G is unprovable.
  • Antony Nickles
    1.1k
    When Carol says "no" indicating that "no" is an incorrect answer
    this makes "no" the correct answer thus not incorrect thus Carol is wrong.
    PL Olcott

    I gave you a perfectly acceptable alternative interpretation of what is happening (which you did not address). You are just applying an interpretation without any context or justification of why it MUST be taken that way; what appears to you as formal logic is just an implication you see as self-evident and singular, when it is just your imposed requirement.

    Carol does not need to be “indicating… an incorrect answer”, she could be indicating there IS NO sense of correctness in this “question”, and thus how CAN she “answer” at all—the “correct” “answer” is to throw up her hands and say “no”, as if to say: “What?”. Another way to interpret this is that, of course, Carol CAN answer ‘no’, she can say whatever she wants, defying your idea of correctness with her own truth to herself, in protest. But with no world, you make the rules, so, sure, make them however you’d like. What you’ve proven is that such a question must be in an abstract environment with closed dictated rules, as if playing with a machine you programmed. So why bring a human (poor Carol) into it?
  • javi2541997
    5.8k
    she could be indicating there IS NO sense of correctness in this “question”, and thus how CAN she “answer” at all—the “correct” “answer” is to throw up her hands and say “no”, as if to say: “What?”. Another way to interpret this is that, of course, Carol CAN answer ‘no’, she can say whatever she wants, defying your idea of correctness with her own truth to herself, in protest.Antony Nickles

    Exactly. That's what I attempted to explain to @PL Olcott, but it is impossible to agree with him, because according to his point, there will always be an incorrect answer because the question is 'posed' to Carol. It seems that poor Carol is guilty of everything regarding this tricky dilemma!
  • Banno
    25k
    You have Carol not playing the game. I wouldn't play , either. Fair call.
  • PL Olcott
    626
    G is not a deduction in F. That would be silly.

    Rather, Gödel shows using arithmatization and the diagonalization that the structure of F is such that there must be WFF such as G. He's not using the deductive power of F to prove that G is unprovable.
    Banno

    In other words Gödel uses a convolulted mess to show THAT G IS unprovable in F
    in F while carefully hiding WHY G is unprovable in F.

    Antinomy It is a term often used in logic and epistemology, when describing a paradox or
    unresolvable contradiction.
    https://www.newworldencyclopedia.org/entry/Antinomy

    Gödel acknowledges that his G is {a proposition which asserts its own unprovability}
    and also acknowledges that any {epistemological antinomy} (self-contradictory G) will do.

    ...14 Every epistemological antinomy can likewise be used for a similar undecidability proof...
    ...We are therefore confronted with a proposition which asserts its own unprovability. 15 ...
    (Gödel 1931:43-44)

    Gödel, Kurt 1931.
    On Formally Undecidable Propositions of Principia Mathematica And Related Systems

    https://mavdisk.mnsu.edu/pj2943kt/Fall%202015/Promotion%20Application/Previous%20Years%20Article%2022%20Materials/godel-1931.pdf
  • PL Olcott
    626
    Carol does not need to be “indicating… an incorrect answer”, she could be indicating there IS NO sense of correctness in this “question”Antony Nickles

    Her answer of "no" indicates that she cannot correctly answer "no"
    yet because "no" is the correct answer her answer of "no" is incorrect.


    Can Carol correctly answer “no” to this [yes/no] question?
    The revised question requires Carol to answer from the solution set.
    Any lack of answer from {yes, no} or answer from {yes,no} is not a
    correct answer.

    Carol's question was written by a PhD computer science professor to show
    that the halting problem specification is inconsistent.

    I have spoken with him directly many times and he agrees with me that an
    equivalent way of saying this is that input D to decider H makes this question:
    "Does your input halt on its input?" a self-contradictory thus incorrect question
    for H when D is defined to do the opposite of whatever H says.
  • PL Olcott
    626
    Exactly. That's what I attempted to explain to PL Olcott, but it is impossible to agree with him, because according to his point, there will always be an incorrect answer because the question is 'posed' to Carol. It seems that poor Carol is guilty of everything regarding this tricky dilemma!javi2541997

    Can Carol correctly answer “no” to this [yes/no] question?

    Was written by a PhD computer science professor as an analogy to the
    conventional halting problem proofs where an input D has been defined
    to do the opposite of whatever program H says.

    His purpose in doing this was to show that because the question
    "Does your input halt on its input? is self-contradictory for some
    program/input pairs that for these pairs it is an incorrect question.

    We still agree with everyone else that when an input D does the
    opposite of whatever program H says that H cannot correctly say
    what input D will do.

    The key distinction that we make is that this does not place any actual
    limit on computation. That H cannot answer an incorrect question is the
    same as the fact that a baker cannot bake a perfect angle food cake
    using only house bricks for ingredients. It is incorrect for us to say that
    her baking skills are limited on that basis.
  • Antony Nickles
    1.1k

    As long as you acknowledge that, again, the “solution set” is YOUR requirement, not revealing anything but the answer you dictate. What you have imposed as “correct” suppresses any other interpretation and thus only has one set of answers.

    Now of course if you are programming a computer than the terms are set and thus easy to force into a corner, but leave it as a formal logic problem or a programming issue for it says nothing about selves or human contradiction. Yes we have expectations and implications and consequences, but we still live in a culture and answer for ourselves in a specific circumstance with possibilities that we act within, or defy.
  • PL Olcott
    626
    As long as you acknowledge that, again, the “solution set” is YOUR requirement, not revealing anything but the answer you dictate. What you have imposed as “correct” suppresses any other interpretation and thus only has one set of answers.Antony Nickles

    Yes this makes it exactly the same as the halting problem's input D
    that does the opposite of whatever Boolean value that decider H says.

    Since the analogy of Carol's question is much easier to understand
    it provides great leverage in understanding the error of the halting
    problem proofs

    The whole purpose of Carol's question was to show that the halting
    problem specification derives a self-contradictory thus incorrect
    question for some program/input pairs.

    When we show this then the inability of some H to say what
    input D will do when D is defined to the opposite of whatever
    H says is simply an incorrect question for H.

    If some program/input pairs are incorrect questions then the lack
    of the ability of H to provide a correct answer is the same as the
    lack of the ability of a baker to bake a perfect angel food cake using
    only house brick for ingredients.
  • Banno
    25k
    while carefully hiding WHY G is unprovable in F.PL Olcott
    Well, no. He carefully shows why G is unprovable.
  • PL Olcott
    626
    Well, no. He carefully shows why G is unprovable.Banno

    Not at all. Diagonalization only shows THAT an expression
    is unprovable, it abstracts away WHY. If we were to formalize
    this question: "What time is it (yes or no)?" diagonalization
    could show THAT it cannot be correctly answered and have
    no idea that the reason WHY it cannot be answered is a type
    mismatch error. Diagonalization makes sure to discard these
    details.
  • Banno
    25k
    it abstracts away WHY.PL Olcott
    An odd view.

    You would presumably, for consistency's sake, say the same for Turing Machines, Lambda calculus, and Markov Algorithms; each of which have similar issues. Do you also reject the uncountability of the reals?

    If so, we might leave this conversation here.
  • PL Olcott
    626
    You would presumably, for consistency's sake, say the same for Turing Machines,Banno

    Not at all and now I show my words are sustained by Gödel's words.
    The last paragraph is proven by all that comes before it.


    My unique take on Gödel 1931 Incompleteness (also self-referential)
    Any expression of the language of formal system F that asserts its
    own unprovability in F to be proven in F requires a sequence of
    inference steps in F that prove they themselves do not exist.

    It is not at all that F is in any way incomplete.
    It is simply that self-contradictory statements cannot be proven
    because they are erroneous.

    The most important aspect of Gödel's 1931 Incompleteness theorem are
    these plain English direct quotes of Gödel from his paper
    ...there is also a close relationship with the “liar” antinomy,14 ...
    ...14 Every epistemological antinomy can likewise be used for a similar undecidability proof...
    ...We are therefore confronted with a proposition which asserts its own unprovability. 15 ...
    (Gödel 1931:43-44)

    Gödel, Kurt 1931.
    On Formally Undecidable Propositions of Principia Mathematica And Related Systems

    https://mavdisk.mnsu.edu/pj2943kt/Fall%202015/Promotion%20Application/Previous%20Years%20Article%2022%20Materials/godel-1931.pdf

    Antinomy
    It is a term often used in logic and epistemology,
    when describing a paradox or unresolvable contradiction.
    https://www.newworldencyclopedia.org/entry/Antinomy

    Quoted from above
    ...14 Every epistemological antinomy can likewise be used for a similar
    undecidability proof...

    ...We are therefore confronted with a proposition which asserts its own
    unprovability...

    Thus in my simple version we can see WHY {a proposition that asserts
    its own unprovability} in F cannot be proven in F. It is because such
    a proposition is an {epistemological antinomy} in F.


    I have also showed that an input D that does the opposite of whatever
    program H says is an {epistemological antinomy} for H.
  • PL Olcott
    626
    Do you also reject the uncountability of the reals?Banno

    We can map every real to an integer and it does seem that we have some reals left over.
    If we imagine that there can be such a thing as immediately adjacent points on a
    number line, then these points would map to the integers. 1.0 + infinitesimal would
    be the next point on a number line.
  • Banno
    25k
    You seem to me to be doing no more than recursive assertion. It is because it is because it is because...

    The "Why" you are after is simply that there are more WFF, more Turing Machines and more Markov algorithms than can be counted.

    Cheers.
  • PL Olcott
    626
    ↪PL Olcott You seem to me to be doing no more than recursive assertion. It is because it is because it is because...Banno

    {epistemological antinomy} is the end all be all of why for these things.
    Professor Hehner calls this exact same idea {inconsistent specification} and
    I call this exact same idea {self-contradictory question}. Gödel calls it
    {epistemological antinomy}.

    When ordinary people hear the term {epistemological antinomy} they translate
    it into {some complex thing that I don't understand} in their or internal dialogue.
    That is why I use the much clearer term {self-contradictory question}.
  • Banno
    25k
    That post doesn't tell me anything.
  • PL Olcott
    626
    PL Olcott That post doesn't tell me anything.Banno

    The reason why the halting problem is not solvable is that its specification does
    not forbid self-contradictory questions. When we change the specification such
    the self-contradictory questions cannot exist then the conventional proofs fail to
    show that the halting problem is not solvable.
  • Banno
    25k


    The reason that the halting problem persists is that the number of possible Turing machines is not enumerable; but any Turing machine designed to check for a halt can only check at most an enumerable number of Turing machines. It therefore cannot check if every Turing machine will halt.
  • PL Olcott
    626
    The reason that the halting problem persists is that the number of possible Turing machines is not enumerable; but any Turing machine designed to check for a halt can only check at most an enumerable number of Turing machines. It therefore cannot check if every Turing machine will halt.Banno

    That simply changes the subject away from an input deriving a self-contradictory
    thus incorrect question for a specific decider. The most favorite rebuttal tactic of
    all of my reviewers is to make sure to always change the subject before there is
    ever any closure on any point.
  • Banno
    25k
    Perhaps this indicates that there is a problem with the approach you have taken.

    After all, what I said above is the case; that is the reason for the halting problem. One way to treat this is as a reductio, showing that your approach has problems.
  • PL Olcott
    626
    After all, what I said above is the case; that is the reason for the halting problem. One way to treat this is as a reductio, showing that your approach has problems.Banno

    When I stopped tolerating infinite digression it ceased.
  • Banno
    25k
    ...a self-contradictory thus incorrect question...PL Olcott
    There are issues here as well, since a question is not the sort of thing that is apt to contradiction. A pair of statements can contradict; some statements can contradict themselves; but questions that are infelicitous are "inappropriate" or "ill-founded" or some such rather than contradictory.

    Austin would have a field day.
  • Banno
    25k
    When I stopped tolerating infinite digression it ceased.PL Olcott

    So again, for consistency, mustn't you also reject Cantor's Diagonal argument as well?
  • PL Olcott
    626
    a question is not the sort of thing that is apt to contradiction.Banno

    Then correctly answer this question:
    Is this sentence (true or false): "This sentence is not true."
  • Banno
    25k
    Well, we've dealt with that already, and as showed, it's problematic for you to insist on a yes or no answer. But there are various ways of dealing with the liar. You earlier went with claiming that it was not a proposition, not eligible for a truth value, Another approach might be to drop bivalence, after Kripke. OR one could go with the revision theory of truth.

    Also, "This sentence is not true" is not a question. So I'm unclear as to how your reply addresses the point that a question is not apt to contradiction.

    And further the liar does not play a role in the issue at hand, Gödel incompleteness and Halting. The sentence of interest is not "This sentence is not true" but "this sentence is not provable".

    So again, for consistency, mustn't you also reject Cantor's Diagonal argument as well?Banno
    Well?
  • PL Olcott
    626
    ↪PL Olcott Well, we've dealt with that already, and as ↪Antony Nickles showed, it's problematic for you to insist on a yes or no answer.Banno

    Not when we are mathematically mapping Carol's question to an input D to a halt decider H that does the opposite of whatever Boolean value that H returns. It is impossible for Carol to correctly answer her question for the same reason and in the same way that it is impossible for H to return the correct halt status of D.

    Also, "This sentence is not true" is not a question.Banno
    The question is: >>>Is this sentence true: "This sentence is not true."<<<

    And further the liar does not play a role in the issue at hand, Gödel incompleteness and Halting.Banno

    Gödel says that it does.
    The most important aspect of Gödel's 1931 Incompleteness theorem
    are these plain English direct quotes of Gödel from his paper:
    ...there is also a close relationship with the “liar” antinomy,14 ...
    ...14 Every epistemological antinomy can likewise be used for a similar undecidability proof...

    The Liar Antinomy <is> an epistemological antinomy.
    So Gödel agrees that incorrect questions are a thing.
  • Banno
    25k
    I don't see this conversation progressing.
  • PL Olcott
    626
    ↪PL Olcott I don't see this conversation progressing.Banno

    Only because when I make a correct point you simply
    ignore rather than acknowledge it.

    I form a perfect incorrect question and then you change the words
    and form a strawman rebuttal of those changed words.

    The question is: >>>Is this sentence true: "This sentence is not true."<<<
  • Banno
    25k
    I've answered that.

    ...as ↪Antony Nickles showed, it's problematic for you to insist on a yes or no answer. But there are various ways of dealing with the liar. You earlier went with claiming that it was not a proposition, not eligible for a truth value, Another approach might be to drop bivalence, after Kripke. OR one could go with the revision theory of truth.Banno

    Here's where we are up to: can you explain how you reject diagonalisation for Gödel but not for Cantor? Or do you reject Cantor's argument, too?
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