What Is Reductionism?


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What Is Reductionism?
Philosophy
How Laplace's demon knows about Eddington's table
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Introduction

In 1927, the physicist Arthur Stanley Eddington gave the Gifford Lectures at the University of Edinburgh. In his introduction he talked about his two tables. First, the table of his everyday experience, the kind of table we’re all acquainted with through ordinary sensory experience. It has extension, color, a certain texture, solidity, and is comparatively permanent and substantial. But there is also the scientific table, the one we’ve discovered only recently. This table is mostly empty space. Sparsely scattered in that space are clusters of elementary particles, buzzing around like a swarm of bees.

For a long time people only knew about the first table, the one they were immediately acquainted with through their sensory experience. To learn about the scientific table, it was not sufficient to simply look at it, we had to do years of scientific research. But let us imagine a person in the converse situation: she only knows about the scientific table. She has all the physical knowledge to be had, but she lacks the knowledge ordinary sensory experience provides. How would she come to know about the first table? Would it be necessary for her to do additional empirical research, or could she simply “read off” all the facts about the first table from her knowledge of the scientific table? In his 1814 Philosophical Essay on Probabilities, Pierre Simon Laplace outlines an idea which is relevant for answering this question:

“An intellect which at a certain moment would know all forces that set nature in motion, and all positions of all items of which nature is composed, if this intellect were also vast enough to submit these data to analysis, it would embrace in a single formula the movements of the greatest bodies of the universe and those of the tiniest atom; for such an intellect nothing would be uncertain and the future just like the past would be present before its eyes.”

Laplace suggests that, given sufficient knowledge of the present state of all physical entities, their properties, and relations, an intellect without any cognitive limitations would be able to deduce all the truths about the past and future of the universe from his background knowledge alone. Such an intellect would have to be vastly superior to ours in order to do the necessary calculations and analyse all of its knowledge, and perhaps for this reason it has later become known as Laplace’s demon.

It is plausible that ordinary humans couldn’t read off all the facts about the first table from facts about the second table: the amount of data to analyse is just too big. But it is also plausible that Laplace’s demon, not subjected to the cognitive limitations of us petty humans, would be able to do exactly that: simply by calculating how clusters of elementary particles interact with other particles and thereby effectively running a simulation of reality in his mind, he could see, from the simulated perspective of macroscopic beings such as humans, that the elementary particles corresponds to Eddington’s first table. [1]

But how can it be that the demon can know about the existence of things like tables just by knowing plenty of facts about microphysics? How can knowledge about one kind of stuff, namely a bunch of elementary particles, generate knowledge about another kind of stuff, namely ordinary tables? The reason for this is that the first table is, in a sense, “nothing over and above” the second table, it can be reduced to it. Tables just are clouds of elementary particles. If tables just are clouds of elementary particles acting in particular ways, then it’s not surprising that we can recover the truth of a statement formulated in table-vocabulary from statements formulated in microphysics-vocabulary, for both contain reference to the same part of reality – just under different forms of representations. [2] (Some philosophers have complained that such just-is talk is ungrammatical and mysterious. Such worries are unwarranted, there are perfectly intelligible ways in which such terminology can be made precise. Other philosophers worry that this solution runs into problems related to contingent identity since the table may be identical with some elementary particles at one time and with other elementary particles at a later time. But certain semantic theories offer solutions to these problems, see Erhardt 2014, p. 63 ff.)

The History of Science is a History of Successful Reductions

The point generalizes. Knowledge about the chemical structure of the transparent liquid in our seas and lakes allows us to deduce knowledge about water, namely that it is H2O. Knowledge about the values of the individual pixels in Conway’s Game of Life allows us to deduce knowledge about the existence of gliders [3]. This is because gliders just are pattern in pixels and water just is arrangements of H2O molecules.

Much of the history of science can be seen as steady progress in showing how big things such as cows, cars, and comets can be reduced to small things such as molecules and quarks. A good illustration of this is the case of vitalism. Vitalism is the view that the bodily behavior of organisms cannot be explained by the mechanical and biological function of organs alone, that we must also posit an irreducible and invisible “life-force” to explain the empirical data.

Vitalism seemed like a viable option in the 17th century because of pessimism that the then known mechanical functions alone could account for complicated behavior of organisms and phenomena such as replication and regeneration of lost parts. Given the biological knowledge of those days, it may have seemed plausible that mechanical organs by themselves, as a matter of empirical fact, could not collectively perform the complicated functions of an organism, and that some additional thing was needed to do the remaining functional work.

It turned out they were wrong: progress in biology and chemistry revealed more and more how these complicated functions are performed by biological organs in a mechanical fashion. We now know, for example, the mechanisms behind the regeneration of lost parts.

The Standard for Successful Reduction

How do we know that we can reduce digestion to certain complicated chemical processes in the human body, but we can’t reduce the phenomenon of, say, geomagnetic storms to complicated chemical processes in the human body? Or to put it more generally: what are the standards for successful reduction?

Philosophers have suggested and discussed a variety of criteria, which are best understood as corresponding to different concepts of reduction to avoid pointless verbal disputes. But the most useful criterion is the one illustrated in Laplace’s demon’s knowledge of Eddington’s first table: a priori derivability. The demon can come to know all the table-facts from all the microphysics-facts simply by running a kind of simulation of the microphysical facts in his mind and then taking the point of view of macroscopical beings in that simulation and applying their concepts, in our case the concept “table”, to the simulated world. Simply by knowing microphysical facts and analyzing those facts the right way, he can know about table-facts, so in this sense he can deduce them a priori from microphysical facts.

This gives us the right result for both digestion and geomagnetic storms: Knowing the right chemical facts about the human body will allow us to deduce facts about digestion, at least in principle, given enough cognitive power. But knowing the same chemical facts will tell us nothing about geomagnetic storms, not even in principle. (Apart, perhaps, from some general laws of physics we might learn from studying the chemical facts involved in digestion. These laws might also be relevant for geomagnetic storms.)

To avoid undesired results, such as the reducibility of any mathematical truth to any other truth [4], we could introduce further constraints, for example that the a priori derivability is asymmetric. Economic truths are a priori derivable from microphysical truths but not the other way around. The same economic laws can be implemented in a number of distinct microphysical systems, so knowing economic truths does not tell us much about microphysics. Or we could require that the conditional with the reduction base in the antecedent and the facts to be reduced in the consequent is knowable a priori, without neither the antecedent nor the consequent being knowable a priori. Neither the microphysical structure of this universe is knowable a priori, nor its structure at the level of biology, but it is knowable a priori that if there is a universe with this microphysical structure, then it will have this biological structure.

(The criterion of asymmetric a priori derivability blocks the traditional philosophical objections against reductionism.)

The Scope and Structure of Reductionism

This conception has wide-ranging consequences: pretty much everything can be reduced to microphysics. All the special sciences such as biology or economics deal with phenomena which are reducible to what physicists study. Laplace’s demon, if provided with a complete description of all the microphysical facts of the universe and knowledge of all the relevant concepts would not just know about Eddington’s first table, he would know about cows, cars, and comets as well. The synthetic theory of evolution might be an important theory for us humans who couldn’t possibly compute all the microphysical facts, but for Laplace’s demon it would be epistemically superfluous – it would be deducible from his microphysical knowledge alone.

Since reduction is asymmetric – economics is reducible to physics but not the other way around – we naturally get an interesting hierarchy of the sciences. At the bottom level we get fundamental physics (and perhaps psychophysics, see next section), then we get chemistry which is reducible to physics, biology which is reducible to chemistry, and so on. Since each of the higher-level sciences is according to our criterion presumably also directly reducible to physics, reducibility turns out to be an asymmetric and transitive relation.

The Repugnant Conclusion: Fundamental Consciousness

Are there any cases where reduction to microphysics fails? Cases which have been discussed in the literature are moral truths, modal truths (truths about what is impossible, contingent, and necessary), truths about consciousness, and some others. It seems plausible that the only case where reduction possibly fails is in the case of consciousness: arguably not even Laplace’s demon would know about consciousness if provided solely with all the microphysical facts. He would know all the behavioural and functional facts concerning humans, but that wouldn’t help him distinguish philosophical zombies from conscious beings. We might have to postulate consciousness as fundamental along with charge and spin to arrive at a complete theory. If that is the case the ultimate theory will not just relate different fundamental physical properties to each other, it will also relate basic elements of consciousness to physical properties. For many people this would be a repugnant conclusion (wouldn’t it be neat to have just physics as the fundamental theory?), and it is fair to say that the reducibility of consciousness is one of the big remaining questions for the project of global reductionism.

Footnotes

1. For a thorough defence of this view see Chalmers 2012, chapter 3.

2. The claim here is only that it is less surprising that we can recover the truth of a statement formulated in table-vocabulary from statements formulated in microphysics-vocabulary if the two are co-referential. It would still be good to have a detailed account of the mechanism behind this process to make sure that this is indeed possible. For such an account see Erhardt 2014, p72 ff.

3. Gregg Rosenberg has an exellent discussion of cellular automata such as Conway’s Game of Life in chapter two of his book A Place For Consciousness (Rosenberg 2004), where he also relates them to reductionism about consciousness, the topic of the last section of this post.

4. If mathematical truths are a priori and knowable without empirical investigation, and “if A then B” is always true if B is true, then we can plug any mathematical truth into B and thus “derive” it from A, whatever A may be. The same holds for logical tautologies, we can “derive” them from any other truth. Other cases we would presumably not want to classify as cases of reduction are those where the consequent follows from the antecedent in virtue of logic alone, e.g. “if water boils, then either water boils or grass is blue”. One way to avoid that these cases count as reductions is to restrict the antecedent and the consequent to atomic sentences.

References

Chalmers, D. J. (2003). Consciousness and its Place in Nature.

Chalmers, D. J. (2012). Constructing the world. Oxford University Press.

Fodor, J. A. (1974). Special sciences (or: the disunity of science as a working hypothesis). Synthese, 28(2), 97-115.

Kim, J. (1992). Multiple realization and the metaphysics of reduction. Philosophy and Phenomenological Research, 1-26.

Rosenberg, G. (2004). A Place for Consciousness: Probing the Deep Structure of the Natural World: Probing the Deep Structure of the Natural World. Oxford University Press.

This article has 7 comments

  1. Interessanter Text, aber es erscheint hier so, als wäre es unumstritten, dass der Lauf der Welt durch deterministische Gesetze bestimmt ist. Aber zum Beispiel in der Quantenmechanik können nur Wahrscheinlichkeitsaussagen gemacht werden.. Oder verstehe ich die Aussage dieses Textes falsch?

  2. Das Gedankenexperiment mit Laplaces Dämon geht in der Tat vom Determinismus aus. Falls der Determinismus nicht zutrifft, müsste man die Analyse auf Wahrscheinlichkeitsaussagen beschränken, was das Beispiel zugegebenermassen weniger eindrücklich machen würde! Die ursprüngliche Interpretation der Quantenmechanik ist indeterministisch, allerdings kommt der Indeterminismus dort vom Kollaps-Postulat, welches dafür kritisiert wird, dass es willkürlich eingeführt wurde. Interpretationen wie Many Worlds sind hingegen deterministisch, siehe: http://plato.stanford.edu/entries/determinism-causal/#QuaMec. Die Frage zum Determinismus scheint also noch einigermassen umstritten, aber ich glaube im verlinkten Artikel zumindest eine schwache Tendenz hin zum Determinismus wahrzunehmen.

  3. @Salome: Determinismus wird nur als Illustration verwendet um zu erklären, was ein Laplacescher Dämon ist. Für den Reduktionismus ist es aber nicht wichtig, ob der Determinismus wahr ist. Der Reduktionist glaubt, dass für jeden einzelnen Zeitpunkt t sich alle makroskopischen Fakten über Tische und Tiere (etc.) aus mikroskopischen Fakten über Elementarteilechen ableiten lassen. Das heisst aber nicht, dass ich makroskopische Fakten zum Zeitpunkt t2 aus mikroskopischen Fakten zum Zeitpunkt t1 ableiten kann, und deshalb ist Reduktionismus kompatibel sowohl mit Determinismus wie auch mit Indeterminismus.

  4. ‘If mathematical truths are a priori and knowable without empirical investigation, and “if A then B” is always true if B is true, then we can plug any mathematical truth into B and thus “derive” it from A, whatever A may be. The same holds for logical tautologies, we can “derive” them from any other truth.’

    Nice post overall, but this bit seems odd to me. Why should this be any kind of problem for reductionism, such that it’s worth trying to complicate the concept to incorporate it? It’s not like anyone’s claiming Laplace’s demon has an easy job – deriving any arbitrarily chosen part of maths from another seems not obviously more or less complicated than deriving any arbitrarily chosen part of the everyday world from its reduction.

    • Jonathan Erhardt
      Monday 2 March 2015, 8:37 am / Reply

      Hey Sasha,

      thanks for the comment! I agree with you that we don’t have to amend the criterion in order to exclude these cases. We could simply classify these cases as reductions if we prefer a slick and simple concept of reduction.

      I guess the reason I find it attractive to complicate the concept is because, intuitively, I’d apply the concept of reduction only to cases where some facts obtain in virtue of some other facts. Digestion-facts obtain in virtue of certain chemical facts, and this is why I’d say digestion can be reduced to certain chemical processes. In the case of mathematics it does not seem that this criterion is satisfied. It doesn’t seem that “2+2=4″ is true in virtue of “grass is green” being true, yet the statement “if grass is green, then 2+2=4″ satisfies the simple criterion of reduction. So, my reason to complicate the definition of reduction is to get a closer match to the pre-theoretic notion of reduction.

      • I wonder if we’re equivocating between two meanings of ‘a priori derivability’?

        Sense a), which you use in this reply is something like ‘logical consistency, as demonstrable by truth tables’.

        Sense b), which I read into your OP is ‘provable from the other datum’.

        I’m pretty sure that these aren’t the same things (I think that’s part of what Godel proved), and it seems like ‘if grass is green, then 2+2=4′ satisfies only the former.

        • You are right, I intended to use it in the second sense. More precicely, I took B to be a priori derivable from A if and only if the conditional “if A then B” is itself a priori, i.e. knowable without additional empirical knowledge. On this criterion “if grass is green, then 2+2=4″ satisfies the criterion, since the conditional can be known a priori. In this sense any mathematical or logical truth is provable from any other sentence, since a material conditional is always true if its consequent is true. So maybe it is slightly misleading to say “provable from the other datum”, since that might imply a closer connection between A and B than what I have in mind (perhaps more along the lines of an indicative conditional). I tried to emphasize this by putting “derive” in quotation marks, but I should have made it clearer. Thanks for pointing that out! And let me know if I misunderstood your point!

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