I wrote two unrelated blog posts this morning, one about the math paper H = W and one about a joke putting numbers into the D&D alignment matrix.

I used Grok to look up the reference to the H = W paper, and to confirm that the alignment matrix originated with Dungeons & Dragons [1]. I didn’t start a new chat when I asked a new question, but Grok felt obligated to connect the two queries. Near the end of the response to my D&D query, Grok added a section “Connection to Sobolev Spaces Query” with the following content:

While the alignment system and Sobolev spaces (from your previous query about the “H = W” paper) are unrelated mathematically, both reflect efforts to create structured frameworks for complex systems—alignments for character ethics, Sobolev spaces for function analysis. The “Neutral” alignment, like the regularity of distributions, represents a balanced or intermediate state, bridging extremes (Law/Chaos or regular/singular distributions).

Emphasis in the original.

On the one hand this is nonsense. On the other hand, Sobolev spaces and the D&D alignment matrix are structured frameworks for complex systems!

Grok’s response reminds me of when I would doze off while studying and my brain would find marvelous nonsensical connections between everything that I had been studying, such as a way to integrate French verbs.

Aligning functions

Classifying functions into the D&D alignment grid is silly, but what if we were to do it anyway? Here’s my quick take.

The good and lawful functions have classical definitions. C is the space of continuous functions, C² the space of functions with two continuous derivatives, and C^∞ the space of infinitely differentiable functions.

The function W classified as chaotic good is Weierstrass’ example of a nowhere differentiable, everywhere continuous function.

The true neutral functions W^k,p (no relation to the Weierstrass W) are the Sobolev spaces from the earlier post. The larger the k, the more regular the functions. L^p  is W^k,p with k = 0. These functions are not necessarily defined pointwise but only modulo a set of measure zero.

The function 1_ℚ is the indicator function of the rationals, i.e. the function that equals 1 if a number is rational and 0 if it is irrational.

Here δ is Dirac’s delta “function” and δ is its nth derivative. This is a generalized function, not a function in any classical sense, and taking its derivative only makes it worse.

[1] The original 1974 version of D&D had one axis: lawful, neutral, and chaotic. In 1977 the game added the second axis: good, neutral, and evil.

Dan Piponi posted a chart like the one below on Mastodon.

At the risk of making a joke not funny by explaining it, I’d like to explain Dan’s table.

The alignment matrix above comes from Dungeons & Dragons and has become a kind of meme.

The number neutral good number φ is the golden ratio, (1 + √5)/2 = 1.6180339….

Presumably readers of this blog have heard of π. Perhaps it ended up in the chaotic column because it is believed to be (but hasn’t been proven to be) a “normal number,” i.e. the distribution of its digits are normal when expressed in any base.

The number δ = 4.6692016… above is Feigenbaum’s constant, something I touched on three weeks ago. I suppose putting it in the chaos column is a kind of pun because the number comes up in chaos theory. It is believed that δ is transcendental, but there’s no proof that it’s even irrational.

The number Ω is Chaitin’s constant. In some loose sense, this number is the probability that a randomly generated program will halt. It is a normal number, but it is also uncomputable. The smallest program to compute the first n bits of Ω must have length O(n) and so no program of any fixed length can crank out the bits of Ω.

Rayo’s number is truly evil. It is said to be the largest named number. Here’s the definition:

The smallest number bigger than any finite number named by an expression in any language of first-order set theory in which the language uses only a googol symbols or less.

You could parameterize Rayo’s definition by replacing googol (= 10¹⁰⁰) with an integer n. The sequence Rayo(n) starts out small enough. According to OEIS Rayo(30) = 2 because

the 30 symbol formula “(∃x_1(x_1∈x_0)∧(¬∃x_1(∃x_2((x_2∈x_1∧x_1∈x_0)))))” uniquely defines the number 1, while smaller formulae can only define the number 0, the smallest being the 10 symbol “(¬∃x_1(x_1∈x_0))”.

OEIS does not give the value of Rayo(n) for any n > 30, presumably because it would be very difficult to compute even Rayo(31).

If you change the coefficients of a polynomial a little bit, do you change the location of its zeros a little bit? In other words, do the roots of a polynomial depend continuously on its coefficients?

You would think so, and you’d be right. Sorta.

It’s easy to see that small change to a coefficient could result in a qualitative change, such as a double root splitting into two distinct roots close together, or a real root acquiring a small imaginary part. But it’s also possible that a small change to a coefficient could cause roots to move quite a bit.

Wilkinson’s polynomial

Wilkinson’s polynomial is a famous example that makes this all clear.

Define

w(x) = (x − 1)(x − 2)(x − 3)…(x − 20) = x²⁰ − 210x¹⁹ + …

and

W(x) = w(x) − 2⁻²³ x¹⁹

so that the difference between the two polynomials is that the coefficient of x¹⁹ in the former is −210 and in the latter the coefficient is −210.0000001192.

Surely the roots of w(x) and W(x) are close together. But they’re not!

The roots of w are clearly 1, 2, 3, …, 20. But the roots of W are substantially different. Or at least some are substantially different. About half the roots didn’t move much, but the other half moved a lot. If we order the roots by their real part, the 16th root splits into two roots, 16.7308 ± 2.81263 i.

Here’s the Mathematica code that produced the plot above.

    w[x_] := Product[(x - i), {i, 1, 20}]
    W[x_] := w[x] - 2^-23 x^19
    roots = NSolve[W[x] == 0, x]
    ComplexListPlot[x /. roots]

A tiny change to one coefficient creates a change in the roots that is seven orders of magnitude larger. Wilkinson described this discovery as “traumatic.”

Modulus of continuity

The zeros of a polynomial do depend continuously on the parameters, but the modulus of continuity might be enormous.

Given some desired tolerance ε on how much the zeros are allowed to move, you can specify a corresponding degree of accuracy δ on the coefficients to meet that tolerance, but you might have to have extreme accuracy on the coefficients to have moderate accuracy on the roots. The modulus of continuity is essentially the ratio ε/δ, and this ratio might be very large. In the example above it’s roughly 8,400,000.

In terms of the δ-ε definition of continuity, for every ε there is a δ. But that δ might have to be orders of magnitude smaller than ε.

Modulus of continuity is an important concept. In applications, it might not matter that a function is continuous if the modulus of continuity is enormous. In that case the function may be discontinuous for practical purposes.

Continuity is a discrete concept—a function is either continuous or it’s not—but modulus of continuity is a continuous concept, and this distinction can resolve some apparent paradoxes.

For example, consider the sequence of functions f_n(x) = xⁿ on the interval [0, 1].  For every n, f_n is continuous, but the limit is not a continuous function: the limit equals 0 for x < 1 and equals 1 at x = 1.

But this makes sense in terms of modulus of continuity. The modulus of continuity of f_n(x) is n. So while the sequence is continuous for large n, it is becoming “less continuous” in the sense that the modulus of continuity is increasing.