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From: Richard Damon <richard@damon-family.org>
Newsgroups: sci.logic,comp.theory
Subject: Re: True on the basis of meaning --- Good job Richard ! ---Socratic
 method (agreement)
Date: Wed, 22 May 2024 19:01:41 -0400
Organization: i2pn2 (i2pn.org)
Message-ID: <v2ltgl$1nrfv$2@i2pn2.org>
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On 5/22/24 3:52 PM, olcott wrote:
> On 5/22/2024 11:58 AM, Mikko wrote:
>> On 2024-05-22 15:55:39 +0000, olcott said:
>>
>>> On 5/22/2024 2:57 AM, Mikko wrote:
>>>> On 2024-05-21 14:36:29 +0000, olcott said:
>>>>
>>>>> On 5/21/2024 3:05 AM, Mikko wrote:
>>>>>> On 2024-05-20 17:48:40 +0000, olcott said:
>>>>>>
>>>>>>> On 5/20/2024 2:55 AM, Mikko wrote:
>>>>>>>> On 2024-05-19 14:15:51 +0000, olcott said:
>>>>>>>>
>>>>>>>>> On 5/19/2024 9:03 AM, Mikko wrote:
>>>>>>>>>> On 2024-05-19 13:41:56 +0000, olcott said:
>>>>>>>>>>
>>>>>>>>>>> On 5/19/2024 6:55 AM, Richard Damon wrote:
>>>>>>>>>>>> On 5/18/24 11:47 PM, olcott wrote:
>>>>>>>>>>>>> On 5/18/2024 6:04 PM, Richard Damon wrote:
>>>>>>>>>>>>>> On 5/18/24 6:47 PM, olcott wrote:
>>>>>>>>>>>>>>> On 5/18/2024 5:22 PM, Richard Damon wrote:
>>>>>>>>>>>>>>>> On 5/18/24 4:00 PM, olcott wrote:
>>>>>>>>>>>>>>>>> On 5/18/2024 2:57 PM, Richard Damon wrote:
>>>>>>>>>>>>>>>>>> On 5/18/24 3:46 PM, olcott wrote:
>>>>>>>>>>>>>>>>>>> On 5/18/2024 12:38 PM, Richard Damon wrote:
>>>>>>>>>>>>>>>>>>>> On 5/18/24 1:26 PM, olcott wrote:
>>>>>>>>>>>>>>>>>>>>> On 5/18/2024 11:56 AM, Richard Damon wrote:
>>>>>>>>>>>>>>>>>>>>>> On 5/18/24 12:48 PM, olcott wrote:
>>>>>>>>>>>>>>>>>>>>>>> On 5/18/2024 9:32 AM, Richard Damon wrote:
>>>>>>>>>>>>>>>>>>>>>>>> On 5/18/24 10:15 AM, olcott wrote:
>>>>>>>>>>>>>>>>>>>>>>>>> On 5/18/2024 7:43 AM, Richard Damon wrote:
>>>>>>>>>>>>>>>>>>>>>>>>>> No, your system contradicts itself.
>>>>>>>>>>>>>>>>>>>>>>>>>>
>>>>>>>>>>>>>>>>>>>>>>>>>
>>>>>>>>>>>>>>>>>>>>>>>>> You have never shown this.
>>>>>>>>>>>>>>>>>>>>>>>>> The most you have shown is a lack of 
>>>>>>>>>>>>>>>>>>>>>>>>> understanding of the
>>>>>>>>>>>>>>>>>>>>>>>>> Truth Teller Paradox.
>>>>>>>>>>>>>>>>>>>>>>>>
>>>>>>>>>>>>>>>>>>>>>>>> No, I have, but you don't understand the proof, 
>>>>>>>>>>>>>>>>>>>>>>>> it seems because you don't know what a "Truth 
>>>>>>>>>>>>>>>>>>>>>>>> Predicate" has been defined to be.
>>>>>>>>>>>>>>>>>>>>>>>>
>>>>>>>>>>>>>>>>>>>>>>>
>>>>>>>>>>>>>>>>>>>>>>> My True(L,x) predicate is defined to return true 
>>>>>>>>>>>>>>>>>>>>>>> or false for every
>>>>>>>>>>>>>>>>>>>>>>> finite string x on the basis of the existence of 
>>>>>>>>>>>>>>>>>>>>>>> a sequence of truth
>>>>>>>>>>>>>>>>>>>>>>> preserving operations that derive x from
>>>>>>>>>>>>>>>>>>>>>>
>>>>>>>>>>>>>>>>>>>>>> And thus, When True(L, p) established a sequence 
>>>>>>>>>>>>>>>>>>>>>> of truth preserving operations eminationg from 
>>>>>>>>>>>>>>>>>>>>>> ~True(L, p) by returning false, it contradicts 
>>>>>>>>>>>>>>>>>>>>>> itself. The problem is that True, in making an 
>>>>>>>>>>>>>>>>>>>>>> answer of false, has asserted that such a sequence 
>>>>>>>>>>>>>>>>>>>>>> exists.
>>>>>>>>>>>>>>>>>>>>>>
>>>>>>>>>>>>>>>>>>>>> On 5/13/2024 9:31 PM, Richard Damon wrote:
>>>>>>>>>>>>>>>>>>>>>  > On 5/13/24 10:03 PM, olcott wrote:
>>>>>>>>>>>>>>>>>>>>>  >> On 5/13/2024 7:29 PM, Richard Damon wrote:
>>>>>>>>>>>>>>>>>>>>>  >>>
>>>>>>>>>>>>>>>>>>>>>  >>> Remember, p defined as ~True(L, p) ...
>>>>>>>>>>>>>>>>>>>>>  >>
>>>>>>>>>>>>>>>>>>>>>  >> Can a sequence of true preserving operations 
>>>>>>>>>>>>>>>>>>>>> applied
>>>>>>>>>>>>>>>>>>>>>  >> to expressions that are stipulated to be true 
>>>>>>>>>>>>>>>>>>>>> derive p?
>>>>>>>>>>>>>>>>>>>>>  > No, so True(L, p) is false
>>>>>>>>>>>>>>>>>>>>>  >>
>>>>>>>>>>>>>>>>>>>>>  >> Can a sequence of true preserving operations 
>>>>>>>>>>>>>>>>>>>>> applied
>>>>>>>>>>>>>>>>>>>>>  >> to expressions that are stipulated to be true 
>>>>>>>>>>>>>>>>>>>>> derive ~p?
>>>>>>>>>>>>>>>>>>>>>  >
>>>>>>>>>>>>>>>>>>>>>  > No, so False(L, p) is false,
>>>>>>>>>>>>>>>>>>>>>  >
>>>>>>>>>>>>>>>>>>>>>
>>>>>>>>>>>>>>>>>>>>> *To help you concentrate I repeated this*
>>>>>>>>>>>>>>>>>>>>> The Liar Paradox and your formalized Liar Paradox both
>>>>>>>>>>>>>>>>>>>>> contradict themselves that is why they must be 
>>>>>>>>>>>>>>>>>>>>> screened
>>>>>>>>>>>>>>>>>>>>> out as type mismatch error non-truth-bearers 
>>>>>>>>>>>>>>>>>>>>> *BEFORE THAT OCCURS*
>>>>>>>>>>>>>>>>>>>>
>>>>>>>>>>>>>>>>>>>> And the Truth Predicate isn't allowed to "filter" 
>>>>>>>>>>>>>>>>>>>> out expressions.
>>>>>>>>>>>>>>>>>>>>
>>>>>>>>>>>>>>>>>>>
>>>>>>>>>>>>>>>>>>> YOU ALREADY KNOW THAT IT DOESN'T
>>>>>>>>>>>>>>>>>>> WE HAVE BEEN OVER THIS AGAIN AND AGAIN
>>>>>>>>>>>>>>>>>>> THE FORMAL SYSTEM USES THE TRUE AND FALSE PREDICATE
>>>>>>>>>>>>>>>>>>> TO FILTER OUT TYPE MISMATCH ERROR
>>>>>>>>>>>>>>>>>>>
>>>>>>>>>>>>>>>>>>> The first thing that the formal system does with any
>>>>>>>>>>>>>>>>>>> arbitrary finite string input is see if it is a 
>>>>>>>>>>>>>>>>>>> Truth-bearer:
>>>>>>>>>>>>>>>>>>> Truthbearer(L,x) ≡ (True(L,x) ∨ True(L,~x))
>>>>>>>>>>>>>>>>>>
>>>>>>>>>>>>>>>>>> No, we can ask True(L, x) for any expression x and get 
>>>>>>>>>>>>>>>>>> an answer.
>>>>>>>>>>>>>>>>>>
>>>>>>>>>>>>>>>>>
>>>>>>>>>>>>>>>>> The system is designed so you can ask this, yet 
>>>>>>>>>>>>>>>>> non-truth-bearers
>>>>>>>>>>>>>>>>> are rejected before True(L, x) is allowed to be called.
>>>>>>>>>>>>>>>>>
>>>>>>>>>>>>>>>>>
>>>>>>>>>>>>>>>>>
>>>>>>>>>>>>>>>>
>>>>>>>>>>>>>>>> Not allowed.
>>>>>>>>>>>>>>>>
>>>>>>>>>>>>>>>
>>>>>>>>>>>>>>> My True(L,x) predicate is defined to return true or false 
>>>>>>>>>>>>>>> for every
>>>>>>>>>>>>>>> finite string x on the basis of the existence of a 
>>>>>>>>>>>>>>> sequence of truth
>>>>>>>>>>>>>>> preserving operations that derive x from
>>>>>>>>>>>>>>>
>>>>>>>>>>>>>>> A set of finite string semantic meanings that form an 
>>>>>>>>>>>>>>> accurate
>>>>>>>>>>>>>>> verbal model of the general knowledge of the actual world 
>>>>>>>>>>>>>>> that
>>>>>>>>>>>>>>> form a finite set of finite strings that are stipulated 
>>>>>>>>>>>>>>> to have
>>>>>>>>>>>>>>> the semantic value of Boolean true.
>>>>>>>>>>>>>>>
>>>>>>>>>>>>>>> *This is computable* Truthbearer(L,x) ≡ (True(L,x) ∨ 
>>>>>>>>>>>>>>> True(L,~x))
>>>>>>>>>>>>>>> *This is computable* Truthbearer(L,x) ≡ (True(L,x) ∨ 
>>>>>>>>>>>>>>> True(L,~x))
>>>>>>>>>>>>>>> *This is computable* Truthbearer(L,x) ≡ (True(L,x) ∨ 
>>>>>>>>>>>>>>> True(L,~x))
>>>>>>>>>>>>>>> *This is computable* Truthbearer(L,x) ≡ (True(L,x) ∨ 
>>>>>>>>>>>>>>> True(L,~x))
>>>>>>>>>>>>>>> *This is computable* Truthbearer(L,x) ≡ (True(L,x) ∨ 
>>>>>>>>>>>>>>> True(L,~x))
>>>>>>>>>>>>>>>
>>>>>>>>>>>>>>>
>>>>>>>>>>>>>>
>>>>>>>>>>>>>> So, for a statement x to be false, it says that there must 
>>>>>>>>>>>>>> be a sequence of truth perserving operations that derive 
>>>>>>>>>>>>>> ~x from, right?
>>>>>>>>>>>>>>
>>>>>>>>>>>>> Yes we must build from mutual agreement, good.
>>>>>>>>>>>>>
>>>>>>>>>>>>>> So do you still say that for p defined in L as ~True(L, p) 
>>>>>>>>>>>>>> that your definition will say that True(L, p) will return 
>>>>>>>>>>>>>> false?
>>>>>>>>>>>>>>
>>>>>>>>>>>>>
>>>>>>>>>>>>> It is the perfectly isomorphic to this:
>>>>>>>>>>>>> True(English, "This sentence is not true")
>>>>>>>>>>>>>
>>>>>>>>>>>>
>>>>>>>>>>>>
>>>>>>>>>>>> Nope, Because "This sentece is not true" can be a 
>>>>>>>>>>>> non-truth-bearer, but by its definition, True(L, x) can not.
>>>>>>>>>>>>
>>>>>>>>>>>
>>>>>>>>>>> True(L,x) is always a truth bearer.
>>>>>>>>>>> when x is defined as True(L,x) then x is not a truth bearer.
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