ehrenfest said:Recently it has been really bothering me that physics is so unaxiomatic. See https://www.physicsforums.com/archive/index.php/t-223771.html. Do you think it is possible to construct a completely axiomatic approach to physics and by physics I really mean the heart of physics i.e. quantum field theory and quantum mechanics?
robphy said:Can you be more specific about what you want?
ehrenfest said:I want to put the theory of general relativity and quantum field theory into a computer, like http://en.wikipedia.org/wiki/Mizar_system. You're right though that they need to be unified first.
tgt said:Any physical theory dosen't give exact experimental results so there is no point in making them more axiomatic - in the name of physics. Maybe important in the name of mathematics, but not physics.
ehrenfest said:In my opinion, the point of physics is to construct theories that are consistent in two meanings: self-consistent and consistent with experiment. You're right the that making theories more self-consistent will not make them more consistent with experiment but still the first type of consistency is just as important as the second. Improving self-consistency will improve the "total" consistency and thus make our theories better. So, I strongly disagree that physics has nothing to gain by being more axiomatic.
of or pertaining to the use of axioms.Poop-Loops said:*sigh* what does "axiomatic" mean?
M-W said:1 : a maxim widely accepted on its intrinsic merit
2 : a statement accepted as true as the basis for argument or inference : postulate 1
3 : an established rule or principle or a self-evident truth
tgt said:Mathematical physicsts share your concerns. But for the genuine physicsts like Einstein and Feynman, not so. Not to mention any experimentalists.
Do you think it is possible to construct a completely axiomatic approach to mathematics?ehrenfest said:Do you think it is possible to construct a completely axiomatic approach to physics?
jimmysnyder said:Do you think it is possible to construct a completely axiomatic approach to mathematics?
ehrenfest said:Yes.
ehrenfest said:Feynmann and Einstein developed the groundwork of modern physics. When they were alive, the state of physics was not really advanced enough to admit an axiomatic approach. I think that now or in the near future, we will have enough experimental knowledge and mathematical tools to make an axiomatic approach possible. If they were still alive, I think they would work things out more rigorously.
ehrenfest said:Feynmann and Einstein developed the groundwork of modern physics. When they were alive, the state of physics was not really advanced enough to admit an axiomatic approach. I think that now or in the near future, we will have enough experimental knowledge and mathematical tools to make an axiomatic approach possible. If they were still alive, I think they would work things out more rigorously.
Mathematics is not completely axiomatic. There are insurmountable problems related to set theory. You can find information about this here: http://en.wikipedia.org/wiki/Foundations_of_mathematics" in the section entitled "Foundational crisis".ehrenfest said:Yes.
Take your choice, don't work from axiomatic systems, or bury your doubts. Mathematicians call it proof by intimidation.wiki said:In a sense, the crisis has not been resolved, but faded away: most mathematicians either do not work from axiomatic systems, or if they do, do not doubt the consistency of ZFC, generally their preferred axiomatic system.
ZapperZ said:But you don't know that for sure. So it seems that your deduction here isn't based on any "axiomatic approach" either.
This thread is rather puzzling. If you buy Popper's assertion that experiments cannot prove a theory, but rather can only falsify it, then there is no way that you can come up with any "axiom" to physics. While we accept conservation laws to be valid, we have no derivation to show that they are always true, which is why we continue to do experiments to look for when such-and-such conservation laws are falsified. Have you ever considered such a thing?
Zz.
ehrenfest said:I think we should take concepts in physics that are most consistent with experiment and most important and call them axioms and formally derive the rest of physics on top of them. There is probably even some axiom that could precede the conservation laws.
You may think physics has already done this but in that case I challenge you to give me a set of axioms that works.
jimmysnyder said:Mathematics is not completely axiomatic. There are insurmountable problems related to set theory. You can find information about this here: http://en.wikipedia.org/wiki/Foundations_of_mathematics" in the section entitled "Foundational crisis".
I quote a small excerpt:
Take your choice, don't work from axiomatic systems, or bury your doubts. Mathematicians call it proof by intimidation.
ZapperZ said:There's nothing to indicate that what you said here is true.
Tell me how you can derive superconductivity by starting from the Hamiltonian of every individual electrons in a metal.
Zz.
ZapperZ said:There's nothing to indicate that what you said here is true.
jimmysnyder said:In the popularizations of physics (like The Elegant Universe, by Brian Greene) it is not unusual to read that as of now, that QM as it is understood, is not compatible with GR as it is understood. String theory is an attempt to resolve this, but has not yet succeeded in doing so, has it? If in the pursuit of the question in this thread, we were to come up with an axiomatic system for all of physics (or even a non-axiomatic one) we would get a Nobel prize for it. No?
It says (not basically says) "they do not doubt the consistency of ZFC."ehrenfest said:Please read the emboldened part again. It basically says that axiomatic systems are possible.
ehrenfest said:You would make approximations using statistics and limits just as we do now. However, then you would know that what you start out with is not an approximation itself but something logically firm.
ZapperZ said:How did you go from "make approximations" to "is not an approximation itself but something logically firm"?
Zz.
You will find a statement like that in almost any introduction to abstract algebra, general topology, or analysis. The rest of the book is quite axiomatic, but when it comes to sets, the thing that is being studied, all is swept under the rug. Mathematicians close their eyes to the problem. But they do it with their eyes open and you should do the same.Herstein said:1. Set Theory. We shall not attempt a formal definition of a set nor shall we try to lay the groundwork for an axiomatic theory of sets.
ehrenfest said:With a system of axioms, we would do the same things except this time we would be more confident in our results. In a consistent axiomatic system, the results we obtain would not depend on the first principles we chose if we do the calculations correctly. That is a major benefit.
ZapperZ said:I have no idea what you just said here, or maybe I do, but this really is nothing more than "empty promises". I'd like to see you do this rather than just saying that it can be done, which really is what you have been saying in this thread but without anything to back your claim.
Zz.
