The Mandelbrot set is the set of complex numbers c such that iterations of

f(z) = z² + c

remain bounded. But how do you know an iteration will remain bounded? You know when it becomes unbounded—if |z| > 2 then the point isn’t coming back—but how do you know whether an iteration will never become unbounded? You don’t.

So in practice, software to draw Mandelbrot sets will iterate some maximum number of times, say 5000 times, and count a point as part of the set if it hasn’t diverged yet. And for the purposes of creating pretty graphics, that’s good enough. If you want to compute the area of the Mandelbrot set, that’s not good enough.

A reasonable thing to do is to look at the distribution of escape times. Then maybe you can say that if an iteration hasn’t escaped after N steps, there’s a probability less than ε that it will escape in the future, and make ε small enough to satisfy the accuracy of your calculation.

The distribution of escape times drops off really quickly at first, as demonstrated here. Unfortunately, after this initial rapid drop off, it settles into a slow decline typical of a fat-tailed distribution. This is not atypical: a fat-tailed distribution might initially drop off faster than a thin-tailed distribution, such as the comparison between a Cauchy and a normal distribution.

The plot above groups escape times into buckets of 1,000. It starts after the initial rapid decline and shows the fat-tailed region. This was based on 100,000,000 randomly generated values of c.

To estimate the probability of an iteration escaping after having remained bounded for N steps, you need to know the probability mass in the entire tail. So, dear reader, what is the sum of the areas in the bars not shown above and not calculated? It’s not like a normal-ish distribution when you can say with reasonable confidence that the mass after a certain point is negligible.

This matters because the maximum number of iterations is in the inner loop of any program to plot the Mandelbrot set or estimate its area. If 5,000 isn’t enough, then use 50,000 as the maximum, making the program run 10x longer. But what if 50,000 isn’t enough? OK, make it 100,000, doubling the runtime again, but is that enough?

Maybe there has been work on fitting a distribution to escape times, which would allow you to estimate the amount of probability mass in the tail. But I’m just naively hacking away at this for fun, not aware of literature in the area. I’ve looked for relevant papers, but haven’t found anything.

This post will connect a couple posts from yesterday and explore storing data in images.

Connections

There’s a connection between two blog posts that I wrote yesterday that I only realized today.

The first post was about the probability of sending money to a wrong Bitcoin address by mistyping. Checksums make it extremely unlikely that a typo would result in an invalid address. And if somehow you got past the checksum, you would very likely send money to an unused address rather than an unintended used address.

The second post was about QR codes that embed images. I give a couple examples in the post. The first is a QR code that looks like the symbol for a chess king that links to my Kingwood Data Privacy site. The second is a QR code that looks like the icon for @CompSciFact and links to that account’s page on X.

Someone responded to the first post saying that nobody types in Bitcoin addresses; they scan QR codes. The second post suggests QR codes are very robust. I wrote the post just having fun with the novelty of using QR codes in an unintended way, but there is a pragmatic point as well. The fact that you can play with the pixel sizes enough to create images means that there is a lot of safety margin in QR codes.

If you send Bitcoin by scanning a QR code, it’s very likely that you will scan the code correctly. The individual pixels are robust, and QR codes have checksums built in. If somehow you managed to incorrectly scan a QR code for an address, bypassing QR code checksums, then the protections mentioned in the typo post come into play. The checksums in a Bitcoin address apply whether mistype or mis-scan an address.

Storing data on paper

QR codes are a way to store a relatively small amount of data in an image. How much data could you store in an image the size of a sheet of paper?

Ondřej Čertík did an experiment to find out. He wanted to see how much data he could store on a piece of paper using a regular printer and reliably retrieve the data using a phone camera. You can find his results here.

QR code internals

I’ve thought about blogging about how the error detection and correction in QR codes works, but it’s too complicated. I like writing fairly short articles, and QR error correction is too complicated to describe in say 300 words. Other people have written long articles on how it works, and you can find these articles if you’re interested.

It might be possible to write a short article about why it takes a long article to describe QR code error correction. That is, it might be possible to describe briefly the reasons why the algorithm is so complicated. I imagine part of the complexity is just historical contingency, but I also imagine the problem has some intrinsic complexity that isn’t obvious at first glance.

Ondřej used Golay codes for error correction, and it worked fairly well. It would be interesting to compare the robustness of QR codes to a design that simply used Golay codes.

From Bitcoin to Jupiter

James Burke hosted a BBC series called Connections in which he would trace unexpected lines of connections. For example, I recall watching one episode in which he traced the connection between a touchstone and nuclear weapons.

In this post we’ve connected Jupiter to Bitcoin. How? Bitcoin addresses lead to a discussion of QR codes, which lead to discussing Ondřej’s experiment, which led to Golay codes, which were used on a Voyager probe to Jupiter.

I saw a post by Dave Richeson on Mastodon about making QR codes that look like images. Turns out you can shrink a black square in a QR code by up to a factor of three while keeping the code usable. This gives you the wiggle room to create dithered images.

I tried a few examples using this software. The code works with photos, but it works really well with simpler images like the ones below.

Here’s one for my data privacy company, Kingwood Data Privacy LLC.

And here’s one for my account @CompSciFact on X.

Today I learned that the size and shape of a punch card

was chosen to be the same as US paper money at the time.

At the time a US bank note had dimensions 3.25″ by 7.375″. This was sometime prior to 1929 [1] when the size of a bank note changed to 2.61″ by 6.14″. Here’s a current US dollar to scale.

Thinking about how US bank notes shrank in size made me think about how they shrank in purchasing power as measured by the Consumer Price Index. I chose 1861 as my baseline because that’s when the US chose the bank note dimensions above.

Here’s a plot.

Curiously, the ratio of purchasing power to area in 1940 almost returned to what it had been in the 1800s.

In 2025, $1 has about 3% of the purchasing power of $1 in 1861. To maintain the same purchasing power per square inch, a $1 note in 2025 should have an area of 0.72 square inches. To maintain the current aspect ratio, this would be 0.55″ by 1.3″.

Related posts

• Largest bank note denominations
• Taylor series and the Argentine Peso

[1] Punch cards have been around longer than electronic computers. Their first large-scale application was tabulating the 1890 US census.