Is 1+1=2 an empirical proposition? by Yafet Erasmo Sanchez Sanchez

Yafet Erasmo Sanchez Sanchez,

"...how does the zero number fit with the idea of number if there is nothing to count?"

I can't think of any case where zero is a number. If I am to make sense of zero it is not as a number but as a word indicating that I have not yet begun to count anything. If zero appears on a line with positive numbers to the right and negative numbers to the left, it remains a point of origin where I have not yet begun to count. If I count three units to the right and then reverse my direction and count five units to the left, I pass zero but ignore it in favor of the number three. In other words, zero doesn't exist as a part of the act of counting. The useful function of zero is as a placeholder so that I do not need to be personally located at a particular place in order to start counting from that location. The zero sometimesrepresents me standing stationary or is my marker for where I am imagining I am standing stationary. I could of course be speaking on behalf of another object other than myself.

"Also, do you have any insights about ordinal arithmetic? There certainly we are talking about "counting" in some sense. However, it is infinite counting which I am not sure is easy to represent with physical things. What are we counting then?"

No I don't, but, I do know that we receive all information from a storm of photons impacting upon us. Those photons along with all the other photons in the universe add up to a countable number. Furthermore, each photon delivers an incremental measure of change of velocity of a particle of matter. The photons are tiny bits of information. Out of that wild mix of photons arriving from innumerable sources, we know by innate means how to discern patterns of importance to us. Those patterns form in our minds. While they are there, we can imagine that they are continuous and perhaps even infinite, but, in no case did those photons originate from a source that is either continuous or infinite. My point is that there is much math that is useful to apply to the patterns that we imagine in our minds and then there is the math that applies to the source of our original information. I think that those maths are not the same maths.

"...You encourage me to read your essay... ."

That would be great, but, it might appear to be one very wild ride. :) I can't be right unless theoretical physics is wrong beginning with its treatment of mass in f=ma. After I eliminate the indefinable status of mass, there are great changes in store. I have publicly written about and presented many of those changes. I think I am on the correct path, but, let me know what you think. Thank you.

James Putnam

You have titled perfectly, also made some honorary effort of gatherings.

-With regards,

Miss. Sujatha Jagannathan

Dear Yafet,

Your short and well structured essay is interesting. I agree that the concept of meaning is very relevant in this discussion about the comparison of maths and physics. Let me know if I understand you well that meaning arises in a context. You can find in my essay, p.6, a Frege's quote "Never ask for the meaning of a word in isolation, but only in the context of a sentence". Contextuality is a very important concept in QM.

You talk about a multiplicity of meanings of string theory (ST), this often taken as a weakness of ST but it seems that your opinion is different. I wonder if it is not precisely the multiplicity of meanings of QM that makes this theory so rich. The philosopher Popper considers QM as non falsifiable may be as ST.

I hope you will have time to go through my 'moonshine' topic.

Best,

Michel

Yafet,

Are you familiar with the Wittgenstein-Turing colloquy at Cambridge in the late 30s re: building a bridge so it won't fall down? Cuts to the core of the whole mathematics vis-a-vis physics debate.

Dear Yafet,

Thank you for a short, to the point and well argued essay: I have read more than half the essays in this contest, and yours is one of my favorites. As a fan of Wittgenstein, I totally agree with you when you say:

"The main shift one would like to achieve is to move from the dichotomy of "true" and "false" propositions to the notions of 'sense' and 'nonsense'."

I quite liked your analysis of the question "What kind of endeavor is string theory?" in the closing paragraphs of your essay.

I find it strange that your essay has attracted so few votes so far. I hope that the rating I will give it will move it higher in the community rankings, and will give it a better chance to get noticed.

All the best,

Marc

P.S. My essay tackles the philosophical question of the ultimate relationship between "All of mathematics" and "All of physical existence": I hope it makes more "sense" than "nonsense"... ;)

Hi Yafet,

I think understanding what mathematics really is all about will definitely inform physicists, so I thank you for you thought-provoking essay. Thoughts about Euclidean geometry come to mind as an area of Mathematics that you might have considered to be "hardened" at one point... that is, until Non-Euclidean geometry came along. Even the terms "point" and "line" can take on different meanings if one imagines different non-Euclidean spaces. Should physicists not be concerned about philosophical discussions around the meaning of symbols they write down, so long as most of their peers can extract the essence of what their formulas and definitions are suggesting?

Please check out my Digital Physics movie essay if you get the chance. There are some questions posed at the end of the essay that may interest you. Here is a couple that came to mind after reading your essay.

12) If I created a very simple formal system in which almost every statement was undecidable, and then I took advantage of this fact by choosing some of the most counterintuitive independent statements to add as axioms, is there any value in physicists studying this area of mathematics?

13) On the other hand, how can some statements in a formal system be considered more intuitive or self-evident than others if any string of symbols should be looked at as being devoid of meaning?

Thanks,

Jon

You are doing very well in this contest, but, you need 3 more ratings at the least. Hopefully, after receiving them, you will remain in the top 30. If not then you will need to work to get more ratings. I think that your essay can continue to rate high enough to enter into the finals.

James Putnam

Dear Yafet,

Yours is a very subtle essay that gets to one of my favorite philosophical themes: Meaning.

I have noticed that many times discussions fail to get to satisfactory conclusions because the participants do not seem to recognize that while they are using the same words, they attach different meanings to them, and a particular example comes up right in this contest: Your discussion of the meaning of the proposition 1+1=2 is exactly apropos to Edwin Klingman's (and his proponents) claim that he "debunked" Bell's theorem, which is at best (i.e. if correct) a more complicated version of your example of the two drops merging into one not being an applicable real-world example of the mathematics.

I am surprised by the low response rate to your essay. If I may speculate, perhaps the title of your essay turned off some people because to most people the answer to the question it poses seemed so obvious that they didn't bother to see your argument that it really isn't if one is completely divested from the world we live in (again your merging-drops world is a great example). The subtlety of your argument may have escaped some, or perhaps your subtle criticism of ordinal arithmetic and string theory at the end might have antagonized others.

Be that as it may, I found your essay a very thoughtful exploration of meaning in relation to mathematics and physics.

Best wishes,

Armin

Yafet,

Really nice essay. I think it is important and most difficult to understand the relation of physics and mathematics by simple examples. I basically agree with all your are saying in your excellent essay.

One thing you left out in your analysis is the Kantian question: "What did we already accept in order to think that mathematics or physics is possible?"

You say that: "The truth of a mathematical propositions is independent of any physical phenomena." I would say, that in order to be able to do mathematics some physical conditions have to be met: constancy of certain phenomena. Maybe also the structure of time.

In physics the situation similar, when we say, that physics is an empirical science. The structure of time seems to be a precondition of experience.

Maybe also the conservation of energy (Time translation invariance): Once Heisenberg heard about an experiment that showed, that the energy was not conserved. He reacted instantaneously: "Impossible!" How could he know that? How comes that some physical (empirical) statements although empirical seem always to hold true in our experience? The Kantian response to that is: because they are preconditions of objective experience to be possible.

Again I think you wrote a great essay and I would love you could read mine and comment on it.

Best regards,

Luca

Dear Yafet,

It appears that my comment and your response disappeared before I had a chance to see what your response was (except for the beginning, which can be seen in the side bar). I wonder whether the moderator can reinstate them?

Armin

Hi Yafet,

your reply on my comment also got lost before I had the chance to watch the video you posted. Maybe you could repost it.

You are right, Heisenberg believed only that energy conservation holds. But it is as right as we cannot have absolute certainity of anything. But also we cannot doubt everything. So if we believe physics is possible, we might believe that the laws of physics are time translation invariant and from that energy will be conserved.

However you might like the film "The Oxford Murders". A film about a serial killing involving a Wittgenstein expert. Where the induction problem plays an eminent role.

Best

Luca