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Letters on Wave Mechanics: Correspondence with H. A. Lorentz, Max Planck, and Erwin Schrodinger

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by Albert Einstein


  The conception of a world that really exists is based on there being a far-reaching common experience of many individuals, in fact of all individuals who come into the same or a similar situation with respect to the object concerned. Perhaps instead of “common experience” one should say “experiences that can be transformed into each other in a simple way”. This proper basis of reality is set aside as trivial by the positivists when they always want to speak only in the form: if “I” make a measurement then “I” “find” this or that. (And that is to be the only reality.)

  It seems to me that what I call the construction of an external world that really exists is identical with what you call the describability of the individual situation that occurs only once—different as the phrasing may be. For it is just because they prohibit our asking what really “is”, that is, which state of affairs really occurs in the individual case, that the positivists succeed in making us settle for a kind of collective description. They accuse us of metaphysical heresy if we want to adhere to this “reality”. That should be countered by saying that the metaphysical significance of this reality does not matter to us at all. It comes about for us as, so to speak, the intersection pattern of the determinations of many—indeed of all conceivable—individual observers. It is a condensation of their findings for economy of thought, which would fall apart without any connections if we wanted to give up this mode of thought before we have found an equivalent that at least yields the same thing. The present quantum mechanics supplies no equivalent. It is not conscious of the problem at all; it passes it by with blithe disinterest.

  It is probably justified in requiring a transformation of the image of the real world as it has been constructed in the last 300 years, since the re-awakening of physics, based on the discovery of Galileo and Newton that bodies determine each other’s accelerations. That was taken into account in that we interpreted the velocity as well as the position as instantaneous properties of anything real. That worked for a while. And now it seems to work no longer. One must therefore go back 300 years and reflect on how one could have proceeded differently at that time, and how the whole subsequent development would then be modified. No wonder that puts us into boundless confusion!

  Warmest regards!

  Yours,

  E. Schrödinger

  18. Einstein to Schrödinger

  22 XII 1950

  Dear Schrödinger,

  You are the only contemporary physicist, besides Laue, who sees that one cannot get around the assumption of reality—if only one is honest. Most of them simply do not see what sort of risky game they are playing with reality—reality as something independent of what is experimentally established. They somehow believe that the quantum theory provides a description of reality, and even a complete description; this interpretation is, however, refuted, most elegantly by your system of radioactive atom + Geiger counter + amplifier + charge of gun powder + cat in a box, in which the ψ-function of the system contains the cat both alive and blown to bits. Is the state of the cat to be created only when a physicist investigates the situation at some definite time? Nobody really doubts that the presence or absence of the cat is something independent of the act of observation. But then the description by means of the ψ-function is certainly incomplete, and there must be a more complete description. If one wants to consider the quantum theory as final (in principle), then one must believe that a more complete description would be useless because there would be no laws for it. If that were so then physics could only claim the interest of shopkeepers and engineers; the whole thing would be a wretched bungle.

  You are completely right to emphasize that the complete description cannot be built on the concept of acceleration, nor, it seems to me, can it be built on the particle concept. Only one of the tools of our trade remains—the field concept, but God knows whether this will stand firm. I think it is worthwhile to hold on to this, i.e. the continuum, as long as one has no really sound arguments against it.

  But it seems certain to me that the fundamentally statistical character of the theory is simply a consequence of the incompleteness of the description. This says nothing about the deterministic character of the theory; that is a thoroughly nebulous concept anyway, so long as one does not know how much has to be given in order to determine the initial state (“cut”).

  It is rather rough to see that we are still in the stage of our swaddling clothes, and it is not surprising that the fellows struggle against admitting it (even to themselves).

  Best regards!

  Yours,

  A. Einstein

  19. Lorentz to Schrödinger

  Haarlem

  27 May 1926

  Dear Colleague,

  I am finally getting around to answering your letter and to thanking you very much for kindly sending me the proof sheets of your three articles, all of which I have in fact received. Reading these has been a real pleasure to me. Of course the time for a final judgment has not come yet, and there are still many difficulties, it seems to me, about which I shall get to speak immediately. But even if it should turn out that a satisfactory solution cannot be reached in this way, one would still admire the sagacity that shows forth from your considerations, and one would still venture to hope that your efforts will contribute in a fundamental way to penetrating these mysterious matters.

  I was particularly pleased with the way in which you really construct the appropriate matrices and show that these satisfy the equations of motion. This dispels a misgiving that the works of Heisenberg, Born, and Jordan, as well as Pauli’s, had inspired in me: namely, that I could not see clearly that in the case of the H-atom, for example, a solution of the equations of motion can really be specified. With your clever observation that the operators q and commute or do not commute with each other in a similar way to the q and p in the matrix calculation, I began to see the point. In spite of everything it remains a marvel that equations in which the q’s and p’s originally signified coordinates and momenta, can be satisfied when one interprets these symbols as things that have quite another meaning, and only remotely recall those coordinates and momenta. If I had to choose now between your wave mechanics and the matrix mechanics, I would give the preference to the former, because of its greater intuitive clarity, so long as one only has to deal with the three coordinates x,y,z. If, however, there are more degrees of freedom, then I cannot interpret the waves and vibrations physically, and I must therefore decide in favor of matrix mechanics. But your way of thinking has the advantage for this case too that it brings us closer to the real solution of the equations; the eigenvalue problem is the same in principle for a higher dimensional q-space as it is for a three dimensional space.

  There is another point in addition where your methods seem to me to be superior. Experiment acquaints us with situations in which an atom persists in one of its stationary states for a certain time, and we often have to deal with quite definite transitions from one such state to another. Therefore we need to be able to represent these stationary states, every individual one of them, and to investigate them theoretically. Now a matrix is the summary of all possible transitions and it cannot at all be analyzed into pieces. In your theory, on the other hand, each of the states corresponding to the various eigenvalues E plays its own role.

  Now permit me to make several comments in which, however, you probably will not find much new.

  1. In your wave equation (I limit myself to the H-atom)

  E is a constant independent of the coordinates; there are as many wave problems as there are energy values E, and of course the eigenvalues E are to be particularly considered here since only for these can the boundary conditions be satisfied. Your calculation of the eigenvalues* shows that one must understand E to be the energy of the electron, in the sense that the energy is set equal to zero when the electron is at rest at an infinite distance from the nucleus. Putting it another way, at any point x,y,z is the kinetic energy that the electron would have at that point for the prescr
ibed value of E. This kinetic energy corresponds to the velocity

  2. Since Equation (1) contains no time derivative one can only derive from it the wave length at a definite point; one has, namely,

  varying from point to point.

  The velocity of propagation, ω, of the waves, and the frequency, ν , related to it by the equation

  cannot be derived from (1). A certain amount of arbitrariness remains here.

  Now it is one of the basic ideas of your theory (and a very beautiful one) that the velocity, u, of the electron should be equal to the “group velocity”. This requires the relationship

  and if one takes this into consideration one can also determine ν and ω.

  Concerning equation (5) it is to be observed first, that we want to consider ν, ω, and u as all positive, and second, that at a definite point λ, u (and ω) can vary with ν, as follows from (2) and (3), because these quantities are somehow related to E. In carrying out the differentiation with respect to ν that appears in (5) one must, however, abandon the eigenvalues E. There does not seem to be anything against this; one can very readily imagine states (travelling waves) which do indeed satisfy the wave equation, but do not satisfy all boundary conditions.

  From (4) and (5) it follows that

  and therefore

  and

  Since “const.” means independent of E, we can set the constant equal to where E0 is not only independent of E but also of x,y,z . Thus,

  By this means the condition that the frequency be equal at all points of the field is satisfied. Further, from (3) and (4),*

  3. Your conjecture that the transformation which our dynamics will have to undergo will be similar to the transition from ray optics to wave optics sounds very tempting, but I have some doubts about it.

  If I have understood you correctly, then a “particle”, an electron for example, would be comparable to a wave packet which moves with the group velocity.

  But a wave packet can never stay together and remain confined to a small volume in the long run. The slightest dispersion in the medium will pull it apart in the direction of propagation, and even without that dispersion it will always spread more and more in the transverse direction. Because of this unavoidable blurring a wave packet does not seem to me to be very suitable for representing things to which we want to ascribe a rather permanent individual existence.

  As you yourself remark, the blurring in question is far advanced in the field of the H-atom. A wave packet can hold together for some time only if its dimensions are large compared to the wave length. Since, however, the wave length determined by (3) is of the order of magnitude of the Bohr elliptic orbit, there can be no question of having a wave packet that is small compared to the dimensions of such an ellipse and which is moving along this line.

  Naturally, if you assign a large positive value to the constant E in (6) and (2), (one can think of E = mc2), you can reach an arbitrarily high frequency ν with correspondingly large propagation velocity ω, but you cannot change the wave length given by (3) at all.* 4. If we decide to dissolve the electron completely, so to speak, and to replace it by a system of waves this has both an advantage and a disadvantage.

  The disadvantage, and it is indeed a serious one, is this: whatever we assume about the electron in the hydrogen atom we must also assume for all electrons in all atoms; we must replace them all by systems of waves. But then how am I to understand the phenomena of photoelectricity and the emission of electrons from heated metals? The particles appear here quite clearly and without alteration; once dissolved, how could they condense again?

  I do not mean to say by this that there cannot be many metamorphoses in the interior of atoms. If one wants to imagine that electrons are not always little planets that circle about the nucleus, and if one can accomplish something by such an idea, then I have nothing against it. But if we take a wave packet as model of the electron, then by doing so we block the way to restoring matters. Because it is indeed asking a lot to require that a wave packet should condense itself again once it has lost its shape.

  The advantage that I spoke of consists of the following: if the electron continues to persist in a circular or elliptic orbit, one would then expect that in the wave equation, (1), (I am considering a point at which the electron is not located), there will appear not only the term e2/r that depends on the field of the nucleus, but also a similar term that refers to the electric field of the electron. One field is as good as the other and they are of the same order of magnitude. But if equation (1) is changed this way the calculation of the eigenvalues of E would break down and would give rise to unspeakable complications. If the electron as such is no longer there then one can more readily be satisfied that only the term depending on the nuclear charge appears in the equation.

  5. We will now replace Bohr’s stationary states with energies E1, E2, etc. by “stationary wave systems” with frequencies

  By giving the term E0 a large positive value you can make these fundamental frequencies so high that they cannot be observed at all. (You can also assume that they are incapable of radiating, i.e. that there is no connection at all between the field which consists of the corresponding system of waves and the ordinary electromagnetic field, even though they both fill the same volume.) The observed radiations have the frequencies

  and the question arises as to how to account for this. Two ways suggest themselves to us—beats and combination tones.

  There is not much to be said about the first. Let us suppose that we knew the fundamental equations from which the wave equation (1) results; I mean the true “equations of motion” which do not contain E at all, but contain time derivatives instead. If these fundamental equations are also linear then the superposition of two solutions, ψ1 = a1 cos (2 πν1t + b1) and ψ2 = a2 cos (2 πν2t + b2) will lead to beats; no instrument (resonator, grating) whose operation is completely determined by linear equations would respond to these beats as it would to vibrations of frequency ν1–ν2 · One can always imagine that somehow or other, although the process remains obscure for the present, a vibration takes place with the emission of radiation whose period corresponds to the frequency of the intensity maxima.

  We can examine the origin of combination tones in somewhat more detail. To begin with, it is necessary that the fundamental equation be non-linear, but that is also sufficient. If, for example, a fundamental equation contains a term involving ψ2, and if the vibrations that denoted by ψ1 and ψ2 are present at the same time, then as a consequence a term of the form

  will appear, where the first quantity just represents the difference tone. In order to understand quite clearly how this leads to radiation, however, one would have to take account of the connection between the vibrating system and the electromagnetic field. As far as the term denoting a sum in (9) is concerned one can assume that it cannot be made observable because of its high frequency ν1 + ν2.

  In addition one can also understand absorption pretty well if one uses combination tones, which would be difficult to manage if one wanted to reduce optical phenomena to beats.

  Let us suppose that the first vibrational state, ψ1 = a1 cos (2 πν1t " b1) is already present in the atom and that now a force with frequency ν2-ν1 acts on it (incident light). This can excite vibrations like

  ψ′ = á cos [2π (ν2–ν1)t +b′]

  (provided that the resonance is not strong). As a result the quantity

  will appear in the term containing ψ2 in the fundamental equation, and one can consider both of its parts as expressions for certain forces that excite vibrations of frequencies ν2 and 2 ν1–ν2 · The first of these, because its frequency coincides with the second characteristic vibration, can set the system into sympathetic oscillation (in this proper mode), and a part of the energy of the incident light is finally used for this. The force whose frequency is 2 ν1–ν2 can remain ineffective because it corresponds to none of the characteristic vibrations of the system.

  Naturally one could possibly try
to pursue this kind of approach further.

  What I do not like very much about this interpretation of radiation as produced by sum and difference oscillations is that the radiation is considered to be something of secondary importance, as something that depends on terms in the fundamental equations that one even neglects in first approximations (in deriving the wave equation (1).) Is it not really much simpler to hold onto Bohr’s stationary states and then perhaps to assume that a Planck oscillator of frequency (ν2–ν1) is present, (the atom could turn into one), and finally that this absorbs the energy h(ν2–ν1) in a quantum jump 2 → 1 and then it calmly radiates?

  6. Perhaps I may add that many years ago, when the laws of spectra were not yet known, my compatriot V. A. Julius20 observed that in spectra containing many lines there are many pairs of lines for which Δν is almost the same. A probabilistic calculation, (similar to the one which served to prove that double stars are not accidental apparent approaches), then showed him that the number of differences Δν that differed from each other by less than a definite quantity , is much larger than one should expect according to the laws of chance. After he had shown the reality of the equations Δν = Δ′ν=Δ″ ν=… this way he arrived at the idea that many spectral lines might originate in sum and difference oscillations.

 

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