How much will a cable sag? A simple approximation

Posted on by John

Suppose you have a cable of length 2s suspended from two poles of equal height a distance 2x apart. Assuming the cable hangs in the shape of a catenary, how much does it sag in the middle?

If the cable were pulled perfectly taut, we would have s = x and there would be no sag. But in general, s > x and the cable is somewhat lower in the middle than on the two ends. The sag is the difference between the height at the end points and the height in the middle.

The equation of a catenary is

y = a cosh(t/a)

and the length of the catenary between t = −x and t = x is

2s = 2a sinh(x/a).

You could solve this equation for a and the sag will be

g = a cosh(x/a) − a.

Solving for a given s is not an insurmountable problem, but there is a simple approximation for g that has an error of less than 1%. This approximation, given in [1], is

g² = (s − x)(sx/2).

To visualize the error, I set x = 1 and let a vary to produce the plot below.

The relative error is always less than 1/117. It peaks somewhere around x = 1/3 and decreases from there, the error getting smaller as a increases (i.e. the cable is pulled tighter).

Related posts

[1] J. S. Frame. An approximation for the dip of a catenary. Pi Mu Epsilon Journal, Vol. 1, No. 2 (April 1950), pp. 44–46

Unique letter patterns in words

Posted on by John

The word Mississippi has a unique pattern of letters. If you were solving a cryptogram puzzle and saw ZVFFVFFVCCV you might guess that the word is Mississippi.

Is the pattern of letters in Mississippi literally unique or just uncommon? What is the shortest word with a unique letter pattern? The longest word?

We can answer these questions by looking at normalized cryptograms, a sort of word signature. These are formed by replacing the first letter in a word with ‘A’, the next unique letter with ‘B’, etc. The normalized cryptogram of Mississippi is ABCCBCCBDDB.

The set of English words is fuzzy, but for my purposes I will take “words” to mean the entries in the dictionary file american-english on my Linux box, removing words that contain apostrophes or triple letters. I computed the cryptogram of each word, then looked for those that only appear once.

Relative to the list of words I used, yes, Mississippi is unique.

The shortest word with a unique cryptogram is eerie. [1]

The longest word with a unique cryptogram is ambidextrously. Every letter in this 14-letter word appears only once.

[1] Update: eerie is a five-letter example, but there are more. Jack Kennedy pointed out amass, llama, and mamma in the comments. I noticed eerie because its cryptogram comes first in alphabetical order.

How to Organize Technical Research?

Posted on by Wayne Joubert

 

64 million scientific papers have been published since 1996 [1].

Assuming you can actually find the information you want in the first place—how can you organize your findings to be able to recall and use them later?

It’s not a trifling question. Discoveries often come from uniting different obscure pieces of information in a new way, possibly from very disparate sources.

Many software tools are used today for notetaking and organizing information, including simple text files and folders, Evernote, GitHub, wikis, Miro, mymind, Synthical and Notion—to name a diverse few.

AI tools can help, though they can’t always recall correctly and get it right, and their ability to find connections between ideas is elementary. But they are getting better [2,3].

One perspective was presented by Jared O’Neal of Argonne National Laboratory, from the standpoint of laboratory notebooks used by teams of experimental scientists [4]. His experience was that as problems become more complex and larger, researchers must invent new tools and processes to cope with the complexity—thus “reinventing the lab notebook.”

While acknowledging the value of paper notebooks, he found electronic methods essential because of distributed teammates. In his view many streams of notes are probably necessary, using tools such as GitLab and Jupyter notebooks. Crucial is the actual discipline and methodology of notetaking, for example a hierarchical organization of notes (separating high-level overview and low-level details) that are carefully written to be understandable to others.

A totally different case is the research methodology of 19th century scientist Michael Faraday. He is not to be taken lightly, being called by some “the best experimentalist in the history of science” (and so, perhaps, even compared to today) [5].

A fascinating paper [6] documents Faraday’s development of “a highly structured set of retrieval strategies as dynamic aids during his scientific research.” He recorded a staggering 30,000 experiments over his lifetime. He used 12 different kinds of record-keeping media, including lab notebooks proper, idea books, loose slips, retrieval sheets and work sheets. Often he would combine ideas from different slips of paper to organize his discoveries. Notably, his process to some degree varied over his lifetime.

Certain motifs emerge from these examples: the value of well-organized notes as memory aids; the need to thoughtfully innovate one’s notetaking methods to find what works best; the freedom to use multiple media, not restricted to a single notetaking tool or format.

Do you have a favorite method for organizing your research? If so, please share in the comments below.

References

[1] How Many Journal Articles Have Been Published? https://publishingstate.com/how-many-journal-articles-have-been-published/2023/

[2] “Multimodal prompting with a 44-minute movie | Gemini 1.5 Pro Demo,” https://www.youtube.com/watch?v=wa0MT8OwHuk

[3] Geoffrey Hinton, “CBMM10 Panel: Research on Intelligence in the Age of AI,” https://www.youtube.com/watch?v=Gg-w_n9NJIE&t=4706s

[4] Jared O’Neal, “Lab Notebooks For Computational Mathematics, Sciences, Engineering: One Ex-experimentalist’s Perspective,” Dec. 14, 2022, https://www.exascaleproject.org/event/labnotebooks/

[5] “Michael Faraday,” https://dlab.epfl.ch/wikispeedia/wpcd/wp/m/Michael_Faraday.htm

[6] Tweney, R.D. and Ayala, C.D., 2015. Memory and the construction of scientific meaning: Michael Faraday’s use of notebooks and records. Memory Studies8(4), pp.422-439. https://www.researchgate.net/profile/Ryan-Tweney/publication/279216243_Memory_and_the_construction_of_scientific_meaning_Michael_Faraday’s_use_of_notebooks_and_records/links/5783aac708ae3f355b4a1ca5/Memory-and-the-construction-of-scientific-meaning-Michael-Faradays-use-of-notebooks-and-records.pdf

A surprising result about surprise index

Posted on by John

Surprise index

Warren Weaver [1] introduced what he called the surprise index to quantify how surprising an event is. At first it might seem that the probability of an event is enough for this purpose: the lower the probability of an event, the more surprise when it occurs. But Weaver’s notion is more subtle than this.

Let X be a discrete random variable taking non-negative integer values such that

\text{Prob}(X = i) = p_i

Then the surprise index of the ith event is defined as

S_i = \frac{\sum_{j=0}^\infty p_j^2 }{p_i}

Note that if X takes on values 0, 1, 2, … N−1 all with equal probability 1/N, then Si = 1, independent of N. If N is very large, each outcome is rare but not surprising: because all events are equally rare, no specific event is surprising.

Now let X be the number of legs a human selected at random has. Then p2 ≈ 1, and so the numerator in the definition of Si is approximately 1 and S2 is approximately 1, but Si is large for any value of i ≠ 2.

The hard part of calculating the surprise index is computing the sum in the numerator. This is the same calculation that occurs in many contexts: Friedman’s index of coincidence, collision entropy in physics, Renyi entropy in information theory, etc.

Poisson surprise index

Weaver comments that he tried calculating his surprise index for Poisson and binomial random variables and had to admit defeat. As he colorfully says in a footnote:

I have spent a few hours trying to discover that someone else had summed these series and spent substantially more trying to do it myself; I can only report failure, and a conviction that it is a dreadfully sticky mess.

A few years later, however, R. M. Redheffer [2] was able to solve the Poisson case. His derivation is extremely terse. Redheffer starts with the generating function for the Poisson

e^{-\lambda} e^{\lambda x} = \sum p_mx^m

and then says

Let x = eiθ; then eiθ; multiply; integrate from 0 to 2π and simplify slightly to obtain

\sum p_m^2 = (e^{2\lambda}/\pi) \int_0^\pi e^{2\lambda \cos \theta}\, d\theta

The integral on the right is recognized as the zero-order Bessel function …

Redheffer then “recognizes” an expression involving a Bessel function. Redheffer acknowledges in a footnote at a colleague M. V. Cerrillo was responsible for recognizing the Bessel function.

It is surprising that the problem Weaver describes as a “dreadfully sticky mess” has a simple solution. It is also surprising that a Bessel function would pop up in this context. Bessel functions arise frequently in solving differential equations but not that often in probability and statistics.

Unpacking Redheffer’s derivation

When Redheffer says “Let x = eiθ; then eiθ; multiply; integrate from 0 to 2π” he means that we should evaluate both sides of the equation for the Poisson generating function equation at these two values of x, multiply the results, and average the both sides over the interval [0, 2π].

On the right hand side this means calculating

\frac{1}{2\pi} \int_0^{2\pi}\left(\sum_{m=0}^\infty p_m \exp(im\theta)\right) \left(\sum_{n=0}^\infty p_n \exp(-in\theta)\right)\, d\theta

This reduces to

\sum_{m=0}^\infty p_m^2

because

alt=

i.e. the integral evaluates to 1 when m = n but otherwise equals zero.

On the left hand side we have

\begin{align*} \frac{1}{2\pi} \int_0^{2\pi} \exp(-2\lambda) \exp(\lambda(e^{i\theta} + e^{-i\theta})) \, d\theta &= \frac{1}{2\pi} \int_0^{2\pi} \exp(-2\lambda) \exp(2 \cos \theta) \, d\theta \\ &= \frac{e^{-2\lambda}}{\pi} \int_0^{\pi} \exp(2 \cos \theta) \, d\theta \end{align*}

Cerrillo’s contribution was to recognize the integral as the Bessel function J0 evaluated at -2iλ or equivalently the modified Bessel function I0 evaluated at -2λ. This follows directly from equations 9.1.18 and 9.6.16 in Abramowitz and Stegun.

Putting it all together we have

\frac{\pi}{e^{2\lambda}}\sum_{m=0}^\infty p_m^2 = \int_0^{\pi} \exp(2 \cos \theta) \, d\theta = J_0(-2i\lambda ) = I_0(-2\lambda )

Using the asymptotic properties of I0 Redheffer notes that for large values of λ,

\sum_{m=0}^\infty p_m^2 \sim \frac{1}{2\sqrt{\pi\lambda}}

[1] Warren Weaver, “Probability, rarity, interest, and surprise,” The Scientific Monthly, Vol 67 (1948), p. 390.

[2] R. M. Redheffer. A Note on the Surprise Index. The Annals of Mathematical Statistics, Mar., 1951, Vol. 22, No. 1 pp. 128ndash;130.

Estimating an author’s vocabulary

Posted on by John

How would you estimate the size of an author’s vocabulary? Suppose you have a analyzed the author’s available works and found n words, x of which are unique. Then you know the author’s vocabulary was at least x, but it’s reasonable to assume that the author may have know words he never used in writing, or that at least not in works you have access to.

Brainerd [1] suggested the following estimator based on a Markov chain model of language. The estimated vocabulary is the number N satisfying the equation

\sum_{j=0}^{x-1}\left(1 - \frac{j}{N}\right)^{-1} = n

The left side is a decreasing function of N, so you could solve the equation by finding a values of N that make the sum smaller and larger than n, then use a bisection algorithm.

We can see that the model is qualitatively reasonable. If every word is unique, i.e. x = n, then the solution is N = ∞. If you haven’t seen any repetition, you the author could keep writing new words indefinitely. As the amount of repetition increases, the estimate of N decreases.

Brainerd’s model is simple, but it tends to underestimate vocabulary. More complicated models might do a better job.

Problems analogous to estimating vocabulary size come up in other applications. For example, an ecologist might want to estimate the number of new species left to be found based on the number of species seen so far. In my work in data privacy I occasionally have to estimate diversity in a population based on diversity in a sample. Both of these examples are analogous to estimating potential new words based on the words you’ve seen.

[1] Brainerd, B. On the relation between types and tokes in literary text, J. Appl. Prob. 9, pp. 507-5

Detecting the language of encrypted text

Posted on by John

Imagine you are a code breaker living a century ago. You’ve intercepted a message, and you go through your bag of tricks, starting with the simplest techniques first. Maybe the message has been encrypted using a simple substitution cipher, so you start with that.

Simple substitution ciphers can be broken by frequency analysis: the most common letter probably corresponds to E, the next most common letter probably corresponds to T, etc. But that’s only for English prose. Maybe the message was composed in French. Or maybe it was composed in Japanese, then transliterated into the Latin alphabet so it could be transmitted via Morse code. You’d like to know what language the message was written in before you try identifying letters via their frequency.

William Friedman’s idea was to compute a statistic, what he dubbed the index of coincidence, to infer the probable language of the source. Since this statistic only depends on symbol frequencies, it gives the same value whether computed on clear text or text encrypted with simple substitution. It also gives the same value if the text has been run through a transposition cipher as well.

(Classical cryptanalysis techniques, such as computing the index of coincidence, are completely useless against modern cryptography. And yet ideas from classical cryptanalysis are still useful for other applications. Here’s an example that came up in a consulting project recently.)

As I mentioned at the top of the post, you’d try breaking the simplest encryption first. If the index of coincidence is lower than you’d expect for a natural language, you might suspect that the message has been encrypted using polyalphabetic substitution. That is, instead of using one substitution alphabet for every letter, maybe the message has been encrypted using a cycle of n different alphabets, such as the Vigenère cypher.

How would you break such a cipher? First, you’d like to know what n is. How would you do that? By trial and error. Try splitting the text into groups of letters according to their position mod n, then compute the index of coincidence again for each group. If the index statistics are much larger when n = 7, you’re probably looking a message encrypted with a key of length 7.

The source language would still leave its signature. If the message was encrypted by cycling through seven scrambled alphabets, each group of seven letters would most likely have the statistical distribution of the language used in the clear text.

Friedman’s index of coincidence, published in 1922, was one statistic that could be computed based on letter frequencies, one that worked well in practice, but you could try other statistics, and presumably people did. The index of coincidence is essentially Rényi entropy with parameter α = 2. You might try different values of α.

If the approach above doesn’t work, you might suspect that the text was not encrypted one letter at a time, even using multiple alphabets. Maybe pairs of letters were encrypted, as in the Playfair cipher. You could test this hypothesis by looking that the frequencies of pairs of letters in the encrypted text, calculating an index of coincidence (or some other statistic) based on pairs of letters.

Here again letter pair frequencies may suggest the original language. It might not distinguish Spanish from Portuguese, for example, but it would distinguish Japanese written in Roman letters from English.

Blow up in finite time

Posted on by John

A few years ago I wrote a post about approximating the solution to a differential equation even though the solution did not exist. You can ask a numerical method for a solution at a point past where the solution blows up to infinity, and it will dutifully give you a finite solution. The result is meaningless, but will give a result anyway.

The more you can know about the solution to a differential equation before you attempt to solve it numerically the better. At a minimum, you’d like to know whether there even is a solution before you compute it. Unfortunately, a lot of theorems along these lines are local in nature: the theorem assures you that a solution exists in some interval, but doesn’t say how big that interval might be.

Here’s a nice theorem from [1] that tells you that a solution is going to blow up in finite time, and it even tells you what that time is.

The initial value problem

y′ = g(y)

with y(0) = y0 with g(y) > 0 blows up at T if and only if the integral

\int_{y_0}^\infty \frac{1}{g(t)} \, dt
converges to T.

Note that it is not necessary to first find a solution then see whether the solution blows up.

Note also that an upper (or lower) bound on the integral gives you an upper (or lower) bound on T. So the theorem is still useful if the integral is hard to evaluate.

This theorem applies only to autonomous differential equations, i.e. the right hand side of the equation depends only on the solution y and not on the solution’s argument t. The differential equation alluded to at the top of the post is not autonomous, and so the theorem above does not apply. There are non-autonomous extensions of the theorem presented here (see, for example, [2]) but I do not know of a theorem that would cover the differential equation presented here.

[1] Duff Campbell and Jared Williams. Exloring finite-time blow-up. Pi Mu Epsilon Journal, Spring 2003, Vol. 11, No. 8 (Spring 2003), pp. 423–428

[2] Jacob Hines. Exploring finite-time blow-up of separable differential equations. Pi Mu Epsilon Journal, Vol. 14, No. 9 (Fall 2018), pp. 565–572

Normal subgroups are subtle

Posted on by John

The definition of a subgroup is obvious, but the definition of a normal subgroup is subtle.

Widgets and subwidgets

The general pattern of widgets and subwidgets is that a widget is a set with some kind of structure, and a subwidget is a subset that has the same structure. This applies to vector spaces and subspaces, manifolds and submanifolds, lattices and sublattices, etc. Once you know the definition of a group, you can guess the definition of a subgroup.

But the definition of a normal subgroup is not something anyone would guess immediately after learning the definition of a group. The definition is not difficult, but its motivation isn’t obvious.

Standard definition

A subgroup H of a group G is a normal subgroup if for every gG,

g−1Hg = H.

That is, if h is an element of H, g−1hg is also an element of H. All subgroups of an Abelian group are normal because not only is g−1hg also an element of H, it’s the same element of H, i.e. g−1hg = h.

Alternative definition

There’s an equivalent definition of normal subgroup that I only ran across recently in a paper by Francis Masat [1]. A subgroup H of a group G is normal if for every pair of elements a and b such that ab is in H, ba is also in H. With this definition it’s obvious that every subgroup of an Abelian group is normal because ab = ba for any a and b.

It’s an easy exercise to show that Masat’s definition is equivalent to the usual definition. Masat’s definition seems a little more motivated. It’s requiring some vestige of commutativity. It says that a subgroup H of a non-Abelian group G has some structure in common with subgroups of normal groups if this weak replacement for commutativity holds.

Categories

Category theory has a way of defining subobjects in general that basically formalizes the notion of widgets and subwidgets above. It also has a way of formalizing normal subobjects, but this is more recent and more complicated.

The nLab page on normal subobjects says “The notion was found relatively late.” The page was last edited in 2016 and says it is “to be finished later.” Given how exhaustively thorough nLab is on common and even not-so-common topics, this implies that the idea of normal subobjects is not mainstream.

I found a recent paper that discusses normal subobjects [2] and suffice it to say it’s complicated. This suggests that although analogs of subgroups are common across mathematics, the idea of a normal subgroup is more or less unique to group theory.

Related posts

[1] Francis E. Masat. A Useful Characterization of a Normal Subgroup. Mathematics Magazine, May, 1979, Vol. 52, No. 3, pp. 171–173

[2] Dominique Bourn and Giuseppe Metere. A note on the categorical notions of normal subobject and of equivalence class. Theory and Applications of Categories, Vol 36, No. 3, 2021, pp. 65–101.

Finite differences and Pascal’s triangle

Posted on by John

The key to solving a lot of elementary what-number-comes-next puzzles is to take first or second differences. For example, if asked what the next item in the series

14, 29, 50, 77, 110, …

the answer (or at lest the answer the person posing the question is most likely looking for) is 149. You might discover this by first looking at the differences of the items:

15, 21, 27, 33, …

The differences all differ by 6, i.e. the second difference of the series is constant. From there you can infer that the next item in the original series will be 39 more than the previous, i.e. it will be 149.

We can apply the same technique for exploring series that are not artificial puzzles. For example, a one-page article by Harlan Brothers [1] asks what would happen if you looked at the products of elements in each row of Pascal’s triangle.

The products grow very quickly, which suggests we work on a log scale. Define

s(n) = \log \prod{k=0}^n \binom{n}{k}  = \sum_{k=0}^n \log \binom{n}{k}

Let’s use a little Python script to look at the first 10 elements in the series.

    from scipy.special import binom
    from numpy import vectorize, log

    def s(n):
        return sum([log(binom(n, k)) for k in range(n+1)])
    s = vectorize(s)

    n = range(1, 11)
    x = s(n)
    print(x)

This prints

0.
0.69314718
2.19722458
4.56434819
7.82404601
11.9953516
17.0915613
23.1224907
30.0956844
38.0171228

Following the strategy at the top of the post, let’s look at the first differences of the sequence with [2]

    y = x[1:] - x[:-1]
    print(y)

This prints

0.69314718
1.50407740
2.36712361
3.25969782
4.17130560
5.09620968
6.03092943
6.97319372
7.92143836

The first differences are increasing by about 0.9, i.e. the second differences are roughly constant. And if we look at the third differences, we find that they’re small and getting smaller the further out you go.

We can easily look further out in the sequence by changing range(1, 11) to range(1, 101). When we do, we find that the second difference are

…, 0.99488052, 0.9949324. 0.99498325

If we look even further out, looking at a thousand terms, the last of the second differences is

…, 0.99949883, 0.99949933, 0.99949983

We might speculate that the second differences are approaching 1 as n → ∞. And this is exactly what is proved in [1], though the author does not work on the log scale. The paper shows that the ratio of the ratio of consecutive lines converges to e. This is equivalent on a log scale to saying the second differences converge to 1.

[1] Harlan J. Brothers. Math Bite: Finding e in Pascal’s Triangle. Mathematics Magazine , Vol. 85, No. 1 (February 2012), p. 51

[2] In Python, array elements are numbered starting at 0, and x[1:] represents all but the first elements of x. The index −1 is a shorthand for the last element, so x{:-1] means all the elements of x up to (but not including) the last.

Archiving data on paper

Posted on by John

This is a guest post by Ondřej Čertík. Ondřej formerly worked at Los Alamos National Labs and now works for GSI Technologies. He is known in the Python community for starting the SymPy project and in the Fortran community for starting LFortran. — John

 

Ondřej Čertík

I finally got to experiment a bit with archiving data on a regular A4 or US Letter page using a regular printer and a phone camera to read it. It’s been bothering me for about 10 years. What is the maximum data size that we can store on the paper and reliably retrieve?

My setup

It seems it is limited by my camera, not my printer. This image stores 30KB of data. I printed it, took a photo with my iPhone, and then decoded and unpacked it using tar and bzip2. It correctly unpacks into 360KB of C++ files, 6305 lines.

I am using the Twibright Optar software.

It uses Golay codes (used by Voyager) that can fix 3 bad bits in each 24-bit code word (which contains 12-bit payload, and 12-bit parity bits). If there are 4 bad bits, the errors are detected, but cannot be corrected. In my experiment, there were 6 codewords which had 3 bad bits, and no codewords with more bad bits, so there was no data loss. It seems most of the bad bits were in the area where my phone cast a shadow on the paper, so possibly retaking the picture in broad daylight might help.

Bad bits

Here are the stats from the optar code:

7305 bits bad from 483840, bit error rate 1.5098%.

49.1855% black dirt, 50.8145% white dirt and 0 (0%) irreparable. Golay stats
===========
0 bad bits      13164
1 bad bit       6693
2 bad bits      297
3 bad bits      6
4 bad bits      0
total codewords 20160

The original setup can store 200KB of data. I tried it, it seems to print fine. But it’s really tiny, and my iPhone camera can’t read it well enough, so nothing is recovered. So I used larger pixels. The 30KB is what I was able to store and retrieve and from the stats above, it seems this is the limit.

Other possibilities

Competing products, such as this one only store 3-4KB/page, so my experiment above is 10x that.

One idea is to use a different error correction scheme. The Golay above only uses 50% to store data. If we could use 75% to store data, that gives us 50% more capacity.

Another idea to improve is to use colors, with 8 colors we get 3x larger capacity, with 16 colors we get 4x more. That would give us around 100KB/page with colors. Can we do better?

Comparison with other storage techniques

I think the closest to compare is floppy disks. The 5¼-inch floppy disk that I used as a kid could store 180 KB single side, 360KB both sides. The 3½-inch floppy disk could store 720 KB single side or 1.44MB both sides. We can also print on both sides of the paper, so let’s just compare single side for both:

  • Optar original (requires a good scanner): 200 KB
  • My experiment above (iPhone): 30 KB
  • Estimate with 8 colors: 120 KB
  • 5¼-inch floppy disk: 180 KB
  • 3½-inch floppy disk: 720 KB

It seems that the 5¼-inch floppy disk is a good target.

Applications

One application is to store this at the end of a book, so that you don’t need to distribute CDs or floppy disks (as used to be the habit), but you just put 10-20 pages to the appendix, this should be possible to decode even 100 years from now quite reliably.

Another application is just archiving any projects that I care about. I still have some floppy disks in my parents’ attic, and I am quite sure they are completely unreadable by now. While I also have some printouts on paper from the same era 30 years ago, and they are perfectly readable.

I think the requirement to use a regular iPhone is good (mine is a few years old, perhaps the newest one can do better?). If we allow scanners, then of course we can do better, but not many people have a high quality scanner at home, and there is no limit to it: GitHub’s Arctic Vault uses microfilm and high quality scanner. I want something that can be put into a book, or article on paper, something that anyone can decode with any phone, and that doesn’t require any special treatment to store.