So Kant concluded vs. the Second Antinomy that matter is indefinitely divisible, so he would have taken issue with the idea that the Planck scale is the absolute limit, here. At first, I was thinking he would have favored a preon model (and indeed beyond this), but another option I've considered is leaning on the analogy between scalar fields and fractals, and saying that the metrodynamic character of a scalar/quasi-fractal structure is good enough to "fill space to infinity," thus satisfying Kant's other no-perfect-voids parameter (his argument was something like: a perfect (physical) void would be void of causation from itself; so it could not possibly cause us to perceive itself; so it is not an object of possible experience).
However, the technical description of scalar fields, if I understand what I'm reading, is more like a field of intensive degrees. The analogy/example I've seen is a temperature map. But intensive degrees, in Kant's pre-model of the universe, are originally located in the anticipations of perception. He does talk about degrees of consciousness vanishingly smaller and smaller to potential infinity, and seems to correlate this issue with apperception's zero-dimensional reality vs. external physical space, yet at the same time allowing that the soul (as the an sich of apperception) "might, for all we know" be capable of diminishing to nothingness intensively nevertheless. Now QFT in general seems like it could be framed in at least neo-Kantian terms as carrying through strongly the third analogy of experience (of the community of substance), so then quantum scalar fields moreover would be joint applications of the anticipations and the analogies, perhaps.
Still, then, where has Kantian matter gone? I am tempted to say: he only says that matter is indefinitely divisible, though, after all. I wish I could remember the name, but I think there was a physicist who actually did think as such: for him, the limit imposed by the Planck scale was not objectively absolute through and through, but simply the place we had reached in our descent to now, and ought not be thought of more strictly than that (although strictly so within the confines of our present theory, even so).
Kant's indefinitude claim overall In the SEP article on Kant's critique of metaphysics, it says at one point:
Obviously, the success of the proofs depends on the legitimacy of the exclusive disjunction agreed to by both parties. Both parties, that is, assume that “there is a world,” and that it is, for example, “either finite or infinite.” Herein lies the problem, according to Kant. The world is, for Kant, neither finite nor infinite. The opposition between these two alternatives is merely dialectical. In the cosmological debates, each party to the dispute falls prey to the ambiguity in the idea of the world.
Another SEP article on infinitesimals says:
And for appearances, Kant maintains, divisions into parts are not completable in experience, with the result that such divisions can be considered, in a startling phrase, “neither finite nor infinite”. It follows that, for appearances, both Thesis and Antithesis are false.
Later in the Critique Kant enlarges on the issue of divisibility, asserting that, while each part generated by a sequence of divisions of an intuited whole is given with the whole, the sequence’s incompletability prevents it from forming a whole; a fortiori no such sequence can be claimed to be actually infinite.
In the first Critique proper, the issue is actually more nuanced when it comes to the divisibility of matter. At first, Kant outlines a description of the divisibility regress that does not proceed ad indefinitum, but outright ad infinitum. However, he goes on to maintain that we are not given an empirically real infinite set of parts of matter, and in the presentation of the Second Antinomy he discourses on the propriety of the phrases compositum reale and compositum ideale with respect to the mereological structure of space, favoring the latter as a vague possibility but holding that, with respect to empirical reality, the former is simply incorrect (space is not an absolute whole in itself, but as a relative whole in itself it is prior to its given parts). So the empirically real elements of the regress are indefinite in quantity, or in other words there is no absolute division of matter obtainable at any moment in empirically real time, so there is no basis for holding that we have ever divided matter into a finite number of parts beyond which further division is metaphysically impossible. There is no basis for holding that there are an actually infinite number of parts of matter given in experience, even if the transcendental question from which the divisibility regress emerges is an authentic object of reason and presents to transcendental reflection as infinite in itself. {Hence Kant goes on elsewhere to refer to the focus imaginarius, as a sort of 'real question' built into the a priori mind, but which, thought of as a cosmological wh-term in the mind, can never be assigned an infinitely complete semantic value.}
