Atarimaster wrote: ↑Fri Feb 16, 2024 1:23 pmMe, too.
Although including the American Polyconic gives me a bit of a headache…
Looking at it, the American polyconic produces some rather questionable world maps, but then, I guess that's why it's called the
American polyconic. It was never intended for whole-world maps. Still, if you
do make one that covers the whole world, it definitely looks lenticular to me, having clear similarities to other lenticular projections even if it has worse distortion. Being "bad" has never been a disqualifier of other map projection categories, as the central cylindrical projection is still cylindrical,
This is a problem with
all currently-proposed defintions of "lenticular", in that they largely talk about how the projection looks in normal-aspect world maps, and are dubious to apply to regional maps. To a degree this seems reasonable because in many cases you would be less inclined to use lenticular projections for regional maps in the first place (the smaller the region, the less it matters which projection you use, so there is more of an incentive to use mathematically-simple projections such as azimuthal or cylindrical, possibly in oblique aspect), however the example of the American polyconic proves that it does happen sometimes, so we need to have some way of classifying it.
daan wrote: ↑Fri Feb 16, 2024 3:08 pmDepending on interrupting along one meridian is already arbitrary.
Somewhat, but it's something that I think matters because it's such an obvious distinguishing feature from many other noteworthy projections, such as azimuthal projections (which are interrupted at only a point) and polyhedral projections (which are interrupted at far more than a meridian). The interruption is also an immediate tradeoff in terms of map quality: make the interruption too small, and distortion will increase over the rest of the map because you have a harder time pushing it all off to the interruption, but make the interruption too large, and you'll cut through important landforms.
Furthermore, choosing the make maps which are interrupted at exactly one meridian is something that people seem to keep doing again and again, for all sorts of maps that are otherwise quite different. Whether it's arbitrary or not, it seems to be a choice that humans are intuitively drawn to, in a way that "monotonically-decreasing length of parallels" isn't. It's also a feature that a layman can actually identify a map as possessing or not possessing at a glance, unlike monotonically-decreasing length of parallels, which can fool even experienced mapmakers if they don't feel like sitting down and doing the math, as we saw in your correction of Atarimaster concerning the Lagrange projection. (I mean, you probably
could design a map that looks close enough to meridian-interrupted to fool someone without actually being so, but I don't think any commonly-used map projections fit the bill.)
daan wrote: ↑Fri Feb 16, 2024 3:08 pmI do not intend conformal, or conformal-like, projections to fit into this bucket, partly because doing that enlarges the bucket to the point where it gains significant overlaps with other buckets,
Which buckets? You currently classify the Lagrange (both circular and not) and Eisenlohr projections as "miscellaneous", so they don't have a bucket.
I would say that aesthetically, Eisenlohr has more in common with Dietrich-Kitada, and circular Lagrange with circular Hammer, than they do with other "miscellaneous" projections, such as polyhedral ones (not currently a separate category on your site - in fact, a dodecahedron is your icon for miscellaneous projections as a whole), or the armadillo projection (okay, that's just a weird one, even by miscellaneous standards).
Both the Dietrich-Kitada and Hammer projections are identified by you as lenticular. (The
circular Hammer projection isn't explicitly identified, but given it's a simple affine rescaling of an equal-area projection, it surely has the same properties as the standard 2:1 Hammer projection. And while we're at it, non-circular Lagrange looks quite similar to Eisenlohr and by extension Dietrich-Kitada.)
Also speaking of buckets, if you just want equal-area projections, then we already have a term for those: "equal-area projections". We don't need another one. Though right now, you seem to be trying to do something along the lines of defining a category which includes "compromise projections which are closer to equal-area, but not compromise projections which are closer to conformal"?
daan wrote: ↑Fri Feb 16, 2024 4:08 pmDoes that make it useful? I would say it describes a large chunk of world projections created since the advent of the twentieth century that would otherwise not fit into existing categories, and so I think it’s useful as originally described, but I do think PeteD’s original posting on the topic brings up some unwelcome members to the category, members that could be ejected with simple clarifications. Why are they unwelcome? Because they already belong to other rigorous categories.
This is because the category you're trying to make just doesn't fit in with the other categories. It's trying to do something totally different.
There are (at least) three ways to categorize projections:
1. By construction method as it informs the basic structure of the map: azimuthal, cylindrical, conic, etc.
2. By aesthetic appearance, which, as you note, is too subjective to make for a particularly rigorous categorization system. (Often this is based more on the shape of the outer boundary of the map than on the shape of the graticules
inside the map.)
3. By satisfied mathematical properties, which can be hard ("equal-area", "conformal") or soft ("has area distortion below a certain threshold over the majority of the map", "minimizes the Airy-Kavrayskiy criterion for compromise projections").
If you define most of your categories by method 1, and then have one that's defined by method 3, then of course you're going to have overlap and gaps. That doesn't mean that both methods aren't useful, but they should be considered orthogonal axes. Certainly you
could have chosen to organize your projection list by equal-area, compromise-closer-to-equal-area, compromise-closer-to-conformal, conformal, worse-than-conformal (like gnomonic), and worse-than-equal-area (like orthographic) projections, but you didn't. You apparently care
only about the compromise-closer-to-equal-area category to the exclusion of all others, which are instead classified by construction instead of properties.