Dear Hippolyte,

thank you for your kind words; I am glad that you found some of my ideas interesting.

I am especially thankful for the references you pointed out to me. In fact, I was aware neither of Breuer's theorem nor of Zwick's paper, nut they look of the utmost interest to me. I will surely scrutinise their ideas. On spot, from what you wrote me, I am not sure if the classical measurement problem stem from the same motivations as mine -I never considere the self reference problem which seems central to the argument of Zwick- but surely it's nice to see that others had similar ides from different paths.

I will gladly read your essay and comment on its dedicated page soon.

All the best,

Flavio

Dear Flavio,

what an interesting topic. I was happy to see, you have a contribution in the contest. The problem of the origin of randomness, which is not merely epistemic is a big puzzle to me. The investigation of indeterministic classical physics is interesting in order to see, where the structural/conceptual differences are between classical and quantum physics. And to recognize that it is not the randomness itself nor the collapse part of the measurement problem - which I am not so sure if this is a real problem - that make the difference.

However, I am not sure you can reach with your approach beyond an epistemic randomness (hidden variable theory). If epistemic limits should have an influence on the ontological status of things - and I would be willing to follow that - that would need a good explanation. As I - and I think most physicist - are trained to accept Laplace's view and in fact imagine the underlying world to be like that. I call this in my essay 'simplistic realism'.

In my essay I study the conceptual structure of scientific theories - specifically of physics. From there one additional randomness might occur, which I would like to share. In the view I put forward quantities and objects are only definable within closed systems, i.e. if systems and objects are separable from the environment. Imagine if forces outside the system would constantly be shaking the system around, never could any law or concept manifest in that system. But separability necessarily is always only an approximation. Hence the deterministic laws hold only approximately. The environment would create small random fluctuations impeding strictly deterministic laws. (May one could connect this to Tejinder's theory in this contest.)

I do not think this explains true randomness. Nor do I think, it is in conflict with classical physics. That's fine for me. The goal in my essay was a bit to reconcile our realistic imagination of the world with our epistemic necessities.

Luca

Hi Flavio,

I take it this excellent essay more or less summarizes your development of Gisin's application of constructive maths to classical mechanics? I'd be interested to know how you might see Brouwer's intuitionistic philosophy in relation to this mathematically indeterminate approach.

As I understand it, his intuitionism was derived from Kantian intuition (anschauung, intuitus) as intuiting/apprehending/perceiving the forms of sensibility, space, and time given in empirical (phenomenal) experience. From that perspective we intuit/perceive phenomenal patterns in our empirical experience of the world (thus information is physical!), and the constructive mathematics is based on that empirically intuited pattern perception. The formal, intersubjective communication of these empirical patterns (or information) is effected in that constructive mathematics, for which classical mechanics thus becomes necessarily indeterminate, at least from this intuitionist (also phenomenological) perspective.

What is objectively real in this sense are the phenomenal patterns themselves (or real patterns cf. Dennett) as given in empirical/phenomenal experience, rather than say, the Laplace demon's idealized external world of point particles with infinitely precise, initial physical conditions. Does this mean intuitionism, in your view, must reject the notion of a classical world defined as 'objective external reality' in favour of the actual empirical experience of such a merely potential reality? Or can potentia remain an idealized unobservable continuum from which our discrete actualitas emerges?

Best regards,

Malcolm Riddoch

Je suit, nous sommes Wigner!

    Dear Flavio,

    Congratulations on the well-organized essay on the new notation of the randomness. As you visited my essay, I really enjoyed learning this. In the past essay contest, I wrote the essay on information to be finally published in the book. On this essay, the FIQ is not discussed. However, one-bit is not enough to well defined. Therefore, we seem to need more than two bits on the well-defined FIQ.

    Also, from your perspective, how do you understand the integrated information theory (IIT)? Since mathematical formulation of IIT, the conditional probability related to the certain randomness is implicitly assumed. What do you think?

    Best wishes,

    Yutaka

      Flavio - Thanks. A coherent, well-written essay bringing a key, and incorrect, premise of classical physics to light. Your discussion and critique of the principle of infinite precision is impressive and should, if widely read, put the notion of classical determinism to bed permanently.

      Where I was disappointed however, was in the very limited perspective your essay gives to the much broader epistemological issues of incompleteness and undecideability. These issues also point to invalid premises in our conceptual views and understanding of the world. I've taken a stab at these broader issues and would be very grateful if you gave my essay a look.

      Sincerely - George Gantz: The Door That Has No Key. https://fqxi.org/community/forum/topic/3494

        Dear George, thank you for your feedback and your constructive criticisms. Indeed I believe that undecideability and perhaps (but I am not really sure) even incompleteness play a central role in the foundations of science. My work and my priorities, hence the focus of my essay, are however on determinism and predictability at the moment. But I will be glad to read what you have to say about it.

        All the best,

        Flavio

        Dear Yutaka,

        thanks for your kind appreciation!

        As for your question, I am unfortunately not familiar at all with ITT.

        Best wishes,

        Flavio

        Dear Flavio,

        It appears that the following differences in ideas on determinism and on information may require clarification.

        1. Principle of infinite precision: Ontological - there exists an actual value of every physical quantity, with its infinite determined digits (in any arbitrary numerical base)... It is only when its formalism is complemented with this principle that classical physics becomes deterministic.

        An argument may be constructed against infinite precision describable as sequence of infinite digits. Value of pi in, say, binary digits does have infinite expansion, but it is just a point on a real line. And in the units of pi, its value is just 1. So, a system may have a state that corresponds to pi, infinite digits are not needed to construct infinite precision. What can be said instead is that not all points on real line may be traversed by the state of a physical system. Irrationality of numbers is relative to unit of measures as all datum. Also, one has to give a mechanism by which indeterminism can be realized in physical systems. Both the points are dealt with in my essay (Mother of all existence).

        2. Though following Rovelli, you have discussed quantization of space, yet a distinction is warranted. Usually, we do not interpret classical dynamical expressions as quantized, it does not necessarily mean that one cannot think of deterministic quantized changes in observable spaces. This statement has nothing to do with quantum physics of superposition and entanglement -- quantization can exist in classical domain too, e.g., at Planck's scale as you refer. Since we do not have quantization limited precise measuring instruments the possibility of quantized determinism does exist -- this is only for arguments sake. Then all measures get translated into integers, which will avoid the requirement of infinite precision. It is like spring loaded switch, which can be either on or off only by classical function, or checker board like time and space. The determinism must be killed with some other arguments. Therefore, the statement, "This clearly shows that the principle of infinite precision is a necessary condition for determinism", does not hold. The classical quantization seems to directly oppose the statement, "as soon as one realizes that the mathematical real numbers are not really real, i.e. they have no physical significance, then one concludes that classical physics is not deterministic."

        3. You state -- This view goes under the name of Landauer's principle, in short, "information is physical". In Ref. [13], Gisin gave sound arguments to support the claim that "a finite volume of space cannot contain more than a finite amount of information".

        Landauer's principle refers to how all information are represented by states of matter, referring to what they mean or express. But in Gisin's view information is reduced to quantity of information in bits, losing the reference to the meaning. This is an example of why we have not been able to construct mechanism of processing of semantics of information as brain does. Moreover, physicists' interpretation of information content of a system being its own state description causes so many issues with the reality of information. If it was to be so, then no matter what information processing results from interaction, an information can never be anything but the description of physical state. This is how physicists have artificially created a barrier between this interpretation of information and what a physical device like brain does in dealing with the semantics of information. Instead, the reality of information relates to what an observable state of a system causally correlates with, as dealt with in my essay. A single elemental state of a system may represent the information of very high level structured and abstract semantics if processing is organized in modular hierarchy as is also evident from neuronal processing in the brain. It is bizarre that physicists are blinded to this apparent reality.

        It is because of Gisin's like interpretation that requires information to have certain amount of physical space. Moreover, such interpretation also runs in opposition to the fact that even in artificially designed devices, information is assigned to and coded by the states of registers (systems), not to and by the registers themselves. Physicists and computer scientists have hijacked the term information to mean amount of information measurable in bits leaving the most apparent phenomena of all to us humans, semantic processing in the brain unresolved.

        Rajiv

        Wonderful essay, Flavio! Probably the best I've read so far, in fact (and I've read a lot...). Well written, full of lovely ideas about determinism and indeterminism in physics, and a clever take on the central question of the essay contest.

        I still wonder whether classical physics "is" deterministic, a la the views expressed by Boltzmann and Exner you quoted at the beginning of your essay. But I guess this is a non-question, since physics isn't classical anyway. And even if it were classical, (i) it's hard to imagine a way to experimentally distinguish between determinism and indeterminism, and (ii) whether such a description is useful in a world where measurements provide only finite information is another question all together. You seem to take the view that this indeterminate view is more useful, which I agree with.

        Your essay also makes me wonder about the possible different interpretations of classical mechanics. I see you've already thought about this a bit (e.g. you mention in section 3C a classical analogue to objective collapse models, and you mention in footnote 8 a possible analogue to the Everettian interpretation). Has someone written about this? If not, we should write an article about it! There are already many different mathematical formulations of classical mechanics (e.g. the amusing Koopman-von Neumann formulation, involving a Hilbert space and operators); perhaps the issue of the different interpretations has been overlooked.

        Some miscellaneous comments/questions:

        In a classical world, what prevents knowing an arbitrarily large number of digits of some observable? If I take more and more time and measure more and more carefully, can't I measure more and more accurately, in principle?

        Stability property of measurement: I understand what you're getting at, but can't consecutive measurements have slightly different values? I guess it depends on what you mean by a digit being "determined". Determined in the sense of being reliably to known to be some value? As you know, there is uncertainty in later digits of some measurements (and less trivial measurements may have more than one uncertain digit, in practice).

        Also, how does this uncertainty affect ideas about the arrow of time? Stochastic theories are not time reversible, in a certain technical sense.

        John

        P.S. A book that was recommended to me a few months ago may be up your alley: "Reductionism, Emergence and Levels of Reality" by Chibbaro et al.

          Dear Flavio

          Thanks for your wonderful essay that deals quite beautifully with several delicious subtleties!

          I do have a few questions/comments. (Perhaps if I were less busy, I would find answers by studying your references, but, sadly, that will not be possible for me any time soon.)

          1) (Perhaps important) You have, I believe, misidentified "real numbers" as the culprit in your "principle of infinite precision." I take "infinite precision" to refer to the precision of the limit of a hypothetical infinite string of ever-more precise measurements. If your spacetime is modeled by any topological space that is dense, you will have the potential for an "infinite precision" problem. It springs from spacetime being dense, rather than from it being continuous. This means that as far as the principle of infinite precision is concerned, rational numbers have the same potential as real numbers. For example, you can build your "Figure 1" argument equally well on a small piece of the rational number line.

          Perhaps it's important to add that it is clear that none of the above impacts your nicely constructed, alternative model of classical mechanics. So perhaps it's of no real consequence.

          2) (Probably quite minor) Near the top of page 5 you say (statement 1) "Note again that without REAL NUMBERS, one cannot any longer uphold determinism." Even if we change that to (statement 1a) "... without INFINITE PRECISION, one cannot...." it appears to be incorrect, and it is certainly not justified (or even broached) by anything you say earlier in the essay. Everything earlier was more along the lines of the inverse (statement 2) ".....WITH real numbers one cannot avoid determinism." And in addition, statement 2 is also all you need or use for everything later in the essay. So statement 1 appears to be just an odd extraneous claim that appears to be of no importance for your essay. Or am I missing something?

          3) (I seem to be lost, here.) You cite Landauer's Principle but, I guess I'm confused. I see nothing there to justify singling out information from any other real world concept that can also be treated mathematically. To be sure, one can make a case against Platonic Ideals "existing" in any meaningful way, but is the statement "information is physical" in some way independent of the more pedestrian idea that "all circles, all parallel lines, .... all geometry is physical" or "all counting is physical" or, etc...??? It seems almost capricious to single out information. OK. What am I missing?

          John S

            Dear John,

            thanks so much for your kind feedback. You already know how highly I think of your essay as well.

            As for your questions comments: "(i) it's hard to imagine a way to experimentally distinguish between determinism and indeterminism". Indeed, there are sound arguments whuich say that it's not only hard, but impossible (see references [41-42] in my essay).

            As for the different interpretations of quantum mechanics, a central feature is trying to interpret the measurement problem. If classical physics is regarded as indeterministic, like in my model, there is also a classical measurement problem to be explained. We have discussion in more detail this issue in my paper with Nicolas Gisin on this topic. However, to my knowledge no systematic discussion on different interpretations of classical physics has been attempted.

            Thank you again and all the best,

            Flavio

            p.s. thanks for the reference!

            Dear flavio. Wow.one of the best essays I've read and rated this season. I particularly like your expose on the measurement problem.i too was also particurlary interested in our human nature and limits that lead to the 3uns here https://fqxi.org/community/forum/topic/3525.please take your time to review. all the Best in the contest.

              Dear Michael,

              thanks for your kind words.

              In fact, I have read and (positively) rated your essay already. I will try to leave a comment on the dedicated page soon.

              Cheers,

              Flavio

              Dear John S,

              thank you for your appreciative feedback and your interesting comments. I reply point-by-point:

              1) I am not sure if I understand your comment fully. However, there are two main arguments expressed in my essay, independent but related: (i) information-theoretic arguments (Landauer's principle, Bekenstein bound, etc.) point at the fact that the information content encoded in a finite region should also be finite. And in this the only problematic mathematical entities are the uncomputable real numbers. On the other hand, (2) there is the problem of infinite precision and determinism. Only with infinite precise physical states (i.e. mathematical points in phase space) does the formalism of classical physics become deteministic. Combine (i) and (ii) and it is reasonable to get to my conclusion.

              2) As I express in my essay, classical formalism is composed of two things: dynamical equations and physical states. I maintain that the physical state have a certain interpretational freedom that should comply with operational (and other higher) physical principles. However, I pointed out that there is an implicit and strong assumption in standard classical physics, namely that the states are real numbers. If you remove this feature, but maintain the same dynamical equations, we end up in an indeterministic alternative. So, I still think that what you called statement 1, "Note again that without REAL NUMBERS, one cannot any longer uphold determinism" if taken out of context should be clarified as "Note again that without real numbers, one cannot any longer uphold determinism, provided the dynamical equations of physics are still in place".

              3) The difference is that I take information to come prior with respecct to its mathematical formalization (historically this came very late, if compared to theconcept per se). Thus, I think that the formalization of the concept of information should take into account this and provide an operational meaning to such a concept.

              All the best,

              Flavio

              Intuitionism (not intuitivism) refers to a so called Urintuition, to the counting. Real numbers are uncountable even in the sense of they cannot be arranged one to one along the natural numbers. In principle, already the old Greeks were aware of this calamity. Accordingly, Brouwer's constructivism was merely a bit more complicated but not superior. I suggest calculating as if because I don't expect any practical progress from putting mathematics on new basics. Of course, abandoning idolization of Cantor's alephs in excess of aleph one might be overdue.

              Well, in contrast to the mentally tangible dot, Euclid's point is an ideal fiction.

              The original meaning of being infinite is likewise quite different from Leibniz's mathematical infinity.Nonetheless calculate as if.

              I indirectly asked for imaginable consequences in science.Given you are right or wrong. Does it matter?

              Eckard Blumschein

              " Or can potentia remain an idealized unobservable continuum from which our discrete actualitas emerges?"

              Or put another way ... can the unobservable potentiality of quantum states best be described by the continuum of real numbers whereas our discrete actuality is a constructive/intuitionistic concern?

              And what implications might this real vs natural number distinction have for the 'from potential to actual' measurement problem?

              m

              Hi Flavio...

              Thanks for providing a broader conceptual framework in witch to structure the classical Indeterminate/Determinate discussion, and for "relaxing" prior constraints on reductionism that seemingly denied initial state condition analysis.

              In that a digital processor's capacity to "determine" is a measure of its intelligence, info processing specific language is highly applicable to the discussion, and analysis of an initial state condition, in terms of a geometry framework that facilitates spatial minimum/indivisible unit (QI) addressing for mapping emergence of an intelligent network... i.e. network root architecture... suggest Causality is deterministic, but not a random process... i.e. it must be resolved.

              REF: Cause Energy Pulsed Emergence as Space-Time Energy http://www.uqsmatrixmechanix.com/UQSMarcelMLTD.jpg

              REF: Unified Quantization of a Sphere (UQS) http://www.uqsmatrixmechanix.com/UQSOSE.jpg

              REF: UQS Directionally Unbiased Point Source QE Emission www.uqsmatrixmechanix.com/UQST-TVNH.php

              If, as per Stephen Wolfram REF:

              "Finally we may have a path to the fundamental theory of physics and its beautiful" https://writings.stephenwolfram.com/2020/04/finally-we-may-have-a-path-to-the-fundamental-theory-of-physics-and-its-beautiful,

              one can conceptualize discrete 3D Space, and spatially defined Energy quanta, then in a manner analogous to the evolving logic functionality of conventional digital processors, Causality, utilizing a fundamental info process, that on each Q-tick pulse, apparently harmoniously resolves emission and field wide distribution of minimum/indivisible spatially defined Energy quanta (QE), which facilitates an intelligence that emerges as a consequence of logic derived from sequential resolve of QE distribution within the minimum/indivisible address (QI) mapped spatial network, would likely develop logic circuits to monitor what occurs locally... i.e. Space-Time Energy events within the perception range of the monitoring entity.

              Given a concise differentiation between PHYSICAL and META-PHYSICAL... i.e. PHYSICAL as occupying Space and META-PHYSICAL as Spaceless.. if the monitoring PHYSICAL logic circuit... e.g. humankind... can not perceive the Space-Time PHYSICAL scale at which system intelligence resolves distribution of QE/QI for the entire field, on each Q-Tick, this does not verify that Causality is indeterminate, nor does it imply that Causal META-PHYSICAL processes do not exist, but if the monitoring entity's "self-awareness", as distinct from "system-awareness", is of the opinion that the system is indeterminate... i.e. not intelligent... that entity can not conceptualize utilization of system intelligence, by PHYSICAL and/or META-PHYSICAL means.

              In an environment in which an inability to process decisions is constraining functionality of one's Reality, if one can conceptualize an emerging intelligent network, the possibility of accessing that intelligence becomes a passion... i.e. resurgence of Laplace Demon???

              REF: - Topic: "Modeling Universal Intelligence" by Sue Lingo

              Thanks Flavio, for your thought provoking essay, and I am looking forward to your thoughtful comments on my essay.

              Sue Lingo

              UQS Author/Logician

              www.uqsmatrixmechanix.com

              • [deleted]

              Ahem

              Hi Flavio,

              Fantastic essay! I see this builds on your work with Gisin. It is interesting to note that many years ago I made similar arguments about precision in classical physics. In fact, in Bohm's book on Quantum Theory (before he set about devising Bohmian mechanics), he makes a related argument regarding waves. There's an interesting relationship here to locality in that one can argue that some classically imprecise quantities stem from the non-locality of certain concepts, e.g. even in classical physics a wave is a non-local concept.

              At any rate, I think the faith in infinite precision in classical physics has its origin in the development of calculus. I'll e-mail you a few links about this, but the basic idea is that one develops a certain faith in precision if one accepts the physical truth of infinitesimals. This is actually even a debate in mathematics itself as it led Abraham Robinson to develop non-standard analysis in the 1960s.

              I am still a little fuzzy on the concept of an FIQ. I mean, while it clearly functions differently in your theory than a real number, it appears to still be based on the same basis as real numbers, i.e. the idea that numbers are ultimately an outgrowth of the notion of counting. Bertrand Russell discusses this in his book on the philosophy of mathematics.

              Anyway, this is good stuff and we'll have to chat about it further at some point.