Mathematical Meanderings

Saturday, 16 May 2026

The Subjective Passage of Time

I was interested in how the subjective passage of time changes as we age and Gemini outlined two main theories that are described below:

Mathematical Proportionality: The Logarithmic and Square Root Models of Subjective Time

The ubiquitous feeling that time accelerates as a function of biological aging is a well-documented and globally recognized psychological phenomenon. To explain why a single year feels interminable to a young child but fleets by seemingly in an instant for an older adult, chronobiologists and mathematical psychologists rely on several quantitative models that map subjective experience against objective physical duration. The most prominent foundational framework for this is the Proportional Theory of time perception.

The Proportional Theory posits that human beings perceive the passage of time relative to the total amount of time they have already accumulated in their lifespan. In this framework, the subjective weight of any given duration is inversely proportional to the observer's total lived age. When a child is one year old, a single year represents one hundred percent of their entire lived, conscious experience. By the time an individual reaches ten years of age, a single year represents only ten percent of their life; at fifty years old, it represents a mere two percent. Consequently, as the mathematical denominator of lived experience grows progressively larger, each new unit of chronological time constitutes a progressively smaller fraction of the whole. This shifting ratio directly results in the psychological sensation that the "present" time is relatively short in comparison to the totality of the lifespan.

Within the academic literature, there are two primary quantitative models utilized to express this proportional phenomenon mathematically, each with distinct implications for the human experience of aging.

The first is the Real-Time Proportional Model, which formalizes the intuitive understanding of proportional time by positing that the passage of subjective time (denoted as $S$) relative to actual physical time (denoted as $R$) is inversely proportional to a person's total real age. This relationship is defined by the following differential equation:

$$\frac{dS}{dR} = \frac{K}{R}$$

Where $K$ represents a specific constant of proportionality. When this equation is integrated to determine the change in subjective time between two distinct points in real physical time ($R_1$ and $R_2$), the result is a logarithmic relationship:

$$S_2 - S_1 = K(\log R_2 - \log R_1) = K \log\left(\frac{R_2}{R_1}\right)$$

This logarithmic model dictates a severe, exponential "thinning out" of perceived time as an individual ages. Under this paradigm, a single day represents a mathematically massive proportion of a young person's life compared to an older person's. For instance, one day is approximately 1/4,000 of the entire life of an 11-year-old child, but only 1/20,000 of the life of a 55-year-old adult. Thus, according to this strict formulation, the 55-year-old experiences a year passing approximately five times faster than the 11-year-old does.

Furthermore, this logarithmic model dictates that periods of life where the end age is exactly twice the start age will feel quantitatively equal in subjective duration. Under this rule, the subjective duration experienced between ages 5 to 10 feels exactly equal to the duration experienced between 10 to 20, which in turn feels equal to the span from 20 to 40, and equally, the massive chronological span from 40 to 80. The fundamental limitation of this model, however, is its mathematical failure at the earliest stages of human life; calculating the period from age 0 to any subsequent age would imply an infinite passage of subjective time, which contradicts human biological reality.

To resolve the mathematical and phenomenological limitations of the real-time model, researchers developed the Subjective-Time Proportional Model, commonly referred to as Lemlich's Model. Proposed by Lemlich, this paradigm posits that the passage of subjective time is not inversely proportional to real, chronological age, but rather to the total subjective time the individual has already experienced up to that point. The governing differential equation for this model is:

$$\frac{dS}{dR} = \frac{K}{S}$$

By integrating this equation and applying the necessary boundary condition that subjective time is zero when real time is zero ($S = 0$ when $R = 0$), the mathematical formula yields a square root function:

$$S = \sqrt{2KR}$$

This result indicates that the actual rate of subjective time passage ($dS/dR$) is equal to $\sqrt{K / 2R}$. In Lemlich's model, time appears to pass in proportion to the square root of the perceiver's real age. Consequently, the acceleration of time across the lifespan is less aggressive and severe than in the logarithmic model. Under these conditions, a 55-year-old would experience time passing approximately 2.25 times faster than an 11-year-old, as opposed to the five times faster predicted by the real-time model.

The periods of life that feel quantitatively equal under Lemlich's model do not follow a doubling sequence, but rather follow a square sequence. The following table illustrates the epochs of human life that would feel subjectively equal in duration according to this model:

Subjective Epoch	Chronological Age Range	Total Real Years Passed in Epoch
Epoch 1	Ages 0 – 1	1 Year
Epoch 2	Ages 1 – 4	3 Years
Epoch 3	Ages 4 – 9	5 Years
Epoch 4	Ages 9 – 16	7 Years
Epoch 5	Ages 16 – 25	9 Years
Epoch 6	Ages 25 – 36	11 Years
Epoch 7	Ages 36 – 49	13 Years
Epoch 8	Ages 49 – 64	15 Years
Epoch 9	Ages 64 – 81	17 Years
Epoch 10	Ages 81 – 100	19 Years
Epoch 11	Ages 100 – 121	21 Years

Empirical psychological studies assessing time perception in subjects have provided substantial support for this model. When participants were asked to estimate durations at a quarter of their current age, their responses consistently aligned with the predictions of this square-root model far more accurately than the real-time logarithmic model.

A profound and somewhat melancholic consequence of the Lemlich model is its mathematical implication for human mortality and the perception of the future. The model dictates that the fraction of subjective life remaining is always less than the fraction of real physical life remaining. However, mathematically, it ensures that the subjective time remaining is always more than one half of the real life remaining. This provides a robust quantitative framework for why the later decades of life, despite encompassing significant chronological spans, feel experientially compressed into a rapid twilight.

The Calculus Behind Lemlich's Model

The preceding section outlined the final results of Lemlich's square root model. The following section explains the underlying mathematics and provides a step-by-step derivation demonstrating exactly how that final formula is calculated using calculus.

To derive the final rate of subjective time passage, we use separation of variables to integrate the initial differential equation, apply the boundary condition to find the specific solution, and then express the rate purely in terms of real time.

1. Separation of Variables

We begin with Lemlich's initial differential equation, which states that the rate of change of subjective time ($S$) with respect to real chronological time ($R$) is inversely proportional to the subjective time accumulated so far:

$$\frac{dS}{dR} = \frac{K}{S}$$

Here, $K$ is a constant of proportionality. To solve this, we separate the variables to group the $S$ terms on one side and the $R$ terms on the other. Multiply both sides by $S$ and $dR$:

$$S \, dS = K \, dR$$

2. Integration

Next, we integrate both sides of the equation:

$$\int S \, dS = \int K \, dR$$

Using the basic power rule for integration on the left side, and recognizing $K$ as a constant on the right side, we get:

$$\frac{S^2}{2} = KR + C$$

where $C$ represents the constant of integration.

3. Applying the Boundary Condition

To find the exact value of $C$, we apply the provided boundary condition: subjective time is zero when real time is zero ($S = 0$ when $R = 0$). Substituting these values into our integrated equation:

$$\frac{0^2}{2} = K(0) + C \implies C = 0$$

Substituting $C = 0$ back into our equation gives the specific solution:

$$\frac{S^2}{2} = KR$$

4. Solving for Subjective Time ($S$)

To express total accumulated subjective time as a function of real time, we isolate $S$. First, multiply both sides by 2:

$$S^2 = 2KR$$

Taking the square root of both sides yields the formula for accumulated subjective time:

$$S = \sqrt{2KR}$$

5. Calculating the Final Rate of Subjective Time Passage

The final step is to determine the rate of subjective time passage ($dS/dR$) expressed entirely in terms of real time ($R$). The most straightforward method is to substitute our new expression for $S$ back into the original differential equation.

The original differential equation is:

$$\frac{dS}{dR} = \frac{K}{S}$$

Substitute the derived formula $S = \sqrt{2KR}$ into the denominator:

$$\frac{dS}{dR} = \frac{K}{\sqrt{2KR}}$$

To simplify this into the final square root form, we can rewrite the $K$ in the numerator as $\sqrt{K^2}$:

$$\frac{dS}{dR} = \frac{\sqrt{K^2}}{\sqrt{2KR}}$$

Combine the numerator and denominator under a single square root:

$$\frac{dS}{dR} = \sqrt{\frac{K^2}{2KR}}$$

Finally, cancel one $K$ from the numerator and the denominator:

$$\frac{dS}{dR} = \sqrt{\frac{K}{2R}}$$

This final mathematical result confirms the model's hypothesis: as real chronological age ($R$) increases, the rate at which subjective time is perceived to pass ($dS/dR$) continually decreases according to an inverse square root curve.

Tuesday, 12 May 2026

Heegner Numbers

My diurnal age today is $ \textbf{28163} $, a prime number, as is $ \textbf{163} $, the number formed by its last three digits. The latter number is quite famous in higher mathematics but I always forget why so I got Gemini to remind me.

The special quality of 163 that places it firmly in the realm of higher mathematics is that it is the largest of the nine Heegner numbers.
In algebraic number theory, a Heegner number is a square-free positive integer $d$ such that the imaginary quadratic field $\mathbb{Q}(\sqrt{-d})$ has class number $1$. Equivalently, this means the ring of integers of this field exhibits unique factorization. The complete set of Heegner numbers (cataloged as OEIS sequence A003173) is $1, 2, 3, 7, 11, 19, 43, 67$, and $163$.
The fact that $163$ ends this sequence leads to two profound and famous mathematical consequences: Ramanujan's constant and the deep structure behind Euler's prime-generating polynomial.
Ramanujan's Constant and Almost-Integers
Because 163 is the largest Heegner number, it produces an astonishing "almost-integer" when placed in the exponential function $e^{\pi \sqrt{d}}$. Specifically:
$$e^{\pi \sqrt{163}} \approx 262537412640768743.99999999999925007...$$
This is widely known as Ramanujan's constant. The reason this number is so staggeringly close to an integer is not a coincidence, but a direct result of the properties of the modular $j$-function.
For any Heegner number $d$, the $j$-invariant of the associated elliptic curve is an exact integer. For $d=163$, the $j$-invariant is exactly $-(640320)^3$.
The Fourier series expansion of the $j$-function in terms of $q = e^{2\pi i \tau}$ is:
$$j(\tau) = \frac{1}{q} + 744 + 196884q + 21493760q^2 + \dots$$
When we evaluate this at $\tau = \frac{1 + \sqrt{-163}}{2}$, $q$ becomes $-e^{-\pi \sqrt{163}}$. Because $163$ is very large, the higher-order terms ($196884q$, etc.) become infinitesimally small. By equating the exact integer $j$-invariant with the first two terms of the expansion, we get:
$$-(640320)^3 \approx -e^{\pi \sqrt{163}} + 744$$
Rearranging this yields:
$$e^{\pi \sqrt{163}} \approx (640320)^3 + 744 = 262537412640768744$$
Euler's Prime-Generating Polynomial
In 1772, Leonhard Euler published the famous quadratic polynomial $n^2 + n + 41$, which yields prime numbers for every integer $n$ from $0$ to $39$.
The remarkable prime-generating efficiency of this polynomial is directly tied to the field $\mathbb{Q}(\sqrt{-163})$. The discriminant of the polynomial $x^2 + x + 41$ is $1^2 - 4(1)(41) = -163$.
Rabinowitsch's theorem states that for $d \equiv 3 \pmod 4$, the polynomial $n^2 + n + \frac{d+1}{4}$ will output primes for all integers $n = 0, 1, \dots, \frac{d-3}{4}$ if and only if $d$ is a Heegner number. Because $163$ is the largest Heegner number, $\frac{163+1}{4} = 41$, making Euler's polynomial the absolute optimal case for this specific phenomenon. There is no other polynomial of this form that will generate a longer string of consecutive primes.

Photo of Kurt Heegner, this photo was taken at the
terrace of his mother's home in Berlin in the 1930s

I only partially understand the mathematics involved. The story behind Heegner, after whom the numbers are named, is as follows:

The name attached to these numbers belongs to Kurt Heegner (1893–1965), and his story is one of the most famous and somewhat tragic examples of an "outsider" solving a major mathematical problem but dying before receiving recognition.
Here is the history of the man and why the numbers bear his name:
A Private Scholar, Not an Academic
Kurt Heegner was a German mathematician, physicist, and radio engineer. He was born and lived in Berlin for most of his life. Unlike the vast majority of names attached to profound mathematical discoveries, Heegner was not a professional academic. He held no university chair and spent much of his career working in radio engineering and patenting electronic circuits. Mathematics was a pursuit he undertook independently as a private scholar.
Gauss's Class Number Problem
The origin of the Heegner numbers dates back to 1801, when Carl Friedrich Gauss published his foundational text Disquisitiones Arithmeticae. Gauss conjectured that there were exactly nine imaginary quadratic fields with class number 1 (which correspond to the nine numbers $1, 2, 3, 7, 11, 19, 43, 67$, and $163$). For a century and a half, proving that there was no tenth number remained one of the outstanding unsolved problems in number theory.
The 1952 Proof and Rejection
In 1952, Heegner published a paper in a reputable mathematical journal claiming to have finally proven Gauss's conjecture. Heegner's approach was highly unorthodox for the time; he used complex modular functions (specifically building on the earlier work of Heinrich Weber) and Diophantine equations.
Unfortunately, the mathematical establishment completely dismissed his work. Reviewers found his paper dense, unconventional, and difficult to follow. It was widely concluded that his proof contained a fatal gap and was incomplete. Because Heegner was an unknown amateur without academic credentials to vouch for him, the mathematical community effectively ignored his publication, and the problem was still considered unsolved. Heegner died in 1965 without ever seeing his work accepted.
Posthumous Vindication
The story changed dramatically in 1966 and 1967. Two mathematicians, Alan Baker and Harold Stark, independently published universally accepted proofs of Gauss's conjecture using entirely different methods. Stark's proof, in particular, was celebrated as a major breakthrough.
However, in 1968, the British mathematician Bryan Birch (of the Birch and Swinnerton-Dyer conjecture) and Harold Stark himself decided to look back at Heegner's dismissed 1952 paper. Upon careful re-examination, they realized that Heegner’s proof was actually completely correct.
The supposed "gap" in Heegner's logic was not a flaw; he had simply omitted the details of a specific theorem from Weber's work, assuming the reader would know it. Once that theorem was explicitly applied, Heegner's proof was airtight. Stark and Birch brought this to the attention of the mathematical community, establishing that Heegner had successfully solved the problem 15 years before anyone else.
Legacy
To honor his undisputed priority and to rectify the community's failure to recognize a brilliant piece of mathematics during his lifetime, the nine numbers of Gauss's conjecture were formally named Heegner numbers. Furthermore, the points he used on elliptic curves to construct his proof are now known in modern arithmetic geometry as Heegner points, which remain a highly active and critical area of research in number theory today.

Saturday, 9 May 2026

Horadam Sequences

A Horadam sequence is a generalization of the Fibonacci numbers defined by the four constants ($p,q,r,s$) and the definitions $H_0=p$ and $H_1=q$ together with the linear recurrence equation for $n>1$:$$H_n=sH_{n-1}+rH_{n-2}$$Specific values of $r$ and $s$ lead to well known sequences:

Fibonacci Numbers: $F_n=F_{n-1}+F_{n-2}\\ \text{ where }n \geq 2, F_0=0, F_1=1$
Lucus Number: $L_n=L_{n-1}+L_{n-2} \\ \text{ where } n \geq 2, L_0=2, L_1=1$
Pell Numbers: $P_n=2P_{n-1}+P_{n-2} \\ \text{ where } n \geq 2, P_0=0, P_1=1$
Pell-Lucus Numbers: $Q_n=2Q_{n-1}+Q_{n-2} \\ \text{ where } n \geq 2, Q_0=Q_1=1$
Jacobsthal Numbers: $J_n=J_{n-1}+2J_{n-2} \\ \text{ where } n \geq 2, J_0=0, J_1=1 $
Jacobsthal-Lucas Numbers: $ j_n=j_{n-1}+2j_{n-2} \\ \text{ where } n \geq 2, j_0=j_1=2$

Today I turned 28160 days old and this number is a member of OEIS A085449:

A085449: Horadam sequence (0,1,4,2)

The numbers indicate that the sequence is generated as follows for $n>1$:$$H_n=2H_{n-1}+4H_{n-2}$$with $H_0=0$, $H_1=1$, $r=4$ and $s=2$

The sequence begins: 0, 1, 2, 8, 24, 80, 256, 832, 2688, 8704, 28160

The generating function is:$$ \frac{x}{1-2x-4x^2}$$The progressive ratios between successive terms approach the following number:$$ \frac{H_n}{H_{n-1}} \rightarrow 2\phi = \sqrt{5}+ 1 \text{ as }n \text{ gets larger}$$In the general case we have:$$ \frac{H_n}{H_{n-1}} \rightarrow \frac{r}{s} \phi = \frac{r}{s} (\sqrt{5}+ 1) \text{ as }n \text{ gets larger}$$Oddly, the name Horadam does not appear in the MacTutor biographies of mathematicians but Gemini provided the following summary of his life and work:

Alwyn Francis ("Horrie") Horadam (1923–2016)

Alwyn Francis ("Horrie") Horadam was a prominent Australian mathematician best known for his extensive work in number theory and for generalizing second-order linear recurrences.

Here is a comprehensive overview of his life, career, and the mathematical sequences that bear his name.

Early Life and Education

Horadam was born on March 22, 1923, to a family of dairy farmers in the rural settlement of Scotts Flat in the Hunter Valley of New South Wales, Australia. His dedication to education was evident early on; during the Great Depression, he traveled 110 kilometers round-trip by train every day just to attend high school in Maitland, all while managing farm duties before and after his commute.

He went on to graduate with First Class Honours in Mathematics from the University of Sydney in 1944. He later earned a BEd from the University of Melbourne and a PhD from the University of Sydney, focusing his early doctoral research on Clifford geometry in complex projective spaces.

Academic Career at UNE

Horadam spent nearly his entire 40-year academic career at the University of New England (UNE) in Armidale, New South Wales. Starting as a lecturer in 1947, he eventually progressed to Professor of Mathematics and served as the Dean of the Faculty of Science.

Beyond his research, he was widely regarded as a deeply committed and generous educator. He served on the New South Wales Junior School Mathematics Committee for 25 continuous years, co-authored several high school mathematics textbooks, and maintained an open-door policy for his university students throughout his tenure.

The Horadam Sequence

While Horadam's early interests included geometry and algebra, his most lasting mathematical legacy lies in number theory—specifically, his generalization of integer sequences. Introduced in a series of papers in the 1960s, the Horadam sequence, commonly denoted as W_n(a, b; p, q), provides a unified framework for second-order linear recurrences.

The sequence is defined by two initial conditions:

W₀ = a
W₁ = b

And the recurrence relation for n ≥ 2:

W_n = pW_n-1 - qW_n-2

(Note: Depending on the specific convention used in various literature, the recurrence is sometimes written as W_n = pW_n-1 + qW_n-2.)

By altering the four parameters (a, b, p, q), the Horadam sequence acts as a parent to many famous recursive sequences:

Fibonacci Numbers: Generated by setting a=0, b=1, p=1, and q=-1.
Lucas Numbers: Generated by setting a=2, b=1, p=1, and q=-1.
Pell Numbers: Generated by setting a=0, b=1, p=2, and q=-1.

This generalization allowed mathematicians to prove broad identities and Binet-style formulas that apply universally to all these sequences at once, rather than analyzing them in isolation.

Legacy in Sequence Analysis

Horadam's generalizations paved the way for modern, systematic analysis of recurrence relations. He was a foundation and sustaining member of the Fibonacci Association and served extensively on the editorial board of the Fibonacci Quarterly. Over his lifetime, he published widely on combinatorial structures, generating functions, and sequence periodicities.

He continued his research well into his retirement, publishing his final papers in 2006. Horadam passed away in Armidale in 2016 at the age of 93, leaving behind a profound legacy in both Australian mathematical education and global number theory.

Interestingly his wife was a fellow mathematician and clearly an impressive woman:

Eleanor Mollie Horadam (née Spedding) (1921–2002)

Eleanor Mollie Horadam was a highly accomplished mathematician in her own right, with a fascinating career and a lasting legacy in Australian academia. She was the wife of Alwyn Francis Horadam.

Early Life and World War II

Born on June 29, 1921, in Yorkshire, England, to a suffragette mother and a pharmacist father, Mollie demonstrated early academic brilliance. She studied the Mathematical Tripos at Girton College, Cambridge, earning her BA in 1942. However, because Cambridge did not allow women to receive degrees at public graduation ceremonies at the time, she was not publicly conferred her degree until she returned on a sabbatical in 1956.

During World War II, she worked in the Stress Group at Rolls-Royce, performing stress-strain analyses on jet engines. While working by day, she took night classes in engineering at the University of London, ultimately earning a First Class Honours degree. During this time, she even outpaced early computing; when told it would take weeks to run a stress problem on the newly constructed Mark 1 computer in Manchester, she manually proved the exact mathematical solution much faster.

Move to Australia and Academic Career

Dissatisfied with post-war England's lack of opportunities and preference for promoting less-qualified men, Mollie emigrated alone to Australia in 1949 to take up a lectureship in mathematics and physics at the New England University College (which later became the University of New England, or UNE). It was here that she met fellow mathematics lecturer Alwyn Horadam, whom she married in 1950.

Mollie became a trailblazer for women in Australian academia. She successfully lobbied UNE to update its maternity policies, which allowed her to retain her lecturing position while raising their three daughters—a highly unusual achievement for the era. One of their daughters, Kathy Horadam, also went on to become a prominent Australian mathematician and Emeritus Professor at RMIT.

Mathematical Contributions

Inspired by lectures from J.E. Littlewood during her 1956 sabbatical at Cambridge, Mollie shifted her focus to number theory at the age of 35. Over the next decade, she published more than 30 research papers, primarily focusing on the number theory of generalised integers and generalised prime numbers. This extensive body of research earned her a PhD by Prior Publication from UNE in 1965, leading to her promotion to Senior Lecturer. She also authored the textbook Principles of Mathematics for Economists.

In 1970, she broke another barrier by becoming the first female Sub-Dean of a faculty (Science) at UNE. Following her academic retirement in 1982, she established a successful commercial business dealing in antique silver. She was admitted as a Fellow of the University of New England in 1995. Mollie passed away in Armidale in 2002 at the age of 80, remembered as a pioneering intellect, a community leader, and a resilient force in a predominantly male profession.

Their eldest daughter followed in her parents' footsteps:

Alwyn and Mollie Horadam had three daughters: Kathryn (Kathy), Kerry, and Alanna. They also had a total of five granddaughters and one grandson.

The most publicly known of their children is their daughter Kathryn Jennifer Horadam (born in 1951 in Armidale), who followed in her parents' footsteps to become a highly accomplished and internationally recognized mathematician.

Kathryn Horadam's Career and Contributions

Education: She studied mathematics at the Australian National University, earning her bachelor's degree in 1972 and completing her PhD in 1977 with a dissertation titled The Homology of Groupnets.
Academic Career: She built a long and distinguished career at the Royal Melbourne Institute of Technology (RMIT), where she worked for over 30 years. She became a full professor of mathematics there in 1995 and currently holds the title of Emeritus Professor.
Research Focus: She is best known for her specialized research on Hadamard matrices and their applications in information security (keeping digital data safe). Outside of academia, she applied this expertise by working for three years with Australia's Defence Science and Technology Group.
Publications: She authored the comprehensive text Hadamard Matrices and Their Applications, published by Princeton University Press in 2007.
Recognition: Her impact on mathematics has been widely celebrated. She became a fellow of the Institute of Combinatorics and its Applications in 1991 and a fellow of the Australian Mathematical Society in 2001. In 2011, RMIT hosted a special international workshop on Hadamard matrices specifically in honor of her 60th birthday, with the resulting papers published in a special 2013 issue of the Australasian Journal of Combinatorics.

While Kathy pursued a high-profile academic career in mathematics like her parents, public details regarding the specific careers and lives of Kerry and Alanna are not prominently featured in public or academic records.

Friday, 8 May 2026

Zeroless Tetranacci Numbers

In a post titled, Sequences Formed By Removing Zeros, from January 2023, I wrote that "It's interesting to consider what happens to a sequence if a certain rule is applied but with the stipulation that any zeros arising must be removed". In that post I looked at the zeroless Fibonacci sequence that falls into a repeating loop with a confirmed period of 912.

The zeroless Tribonacci sequence falls into a much larger repeating loop with a confirmed period of 300,056,874. It reaches this cycle at index 208,666,297. However, it is not known whether the zeroless Tetranacci sequences cycles or not but, if it does, then $s+p > 10^{10}$ where $s$ and $p$ are the starting index and period of the cycle, respectively.

A371916: zeroless analog of tetranacci numbers.

The initial members are:

1, 1, 1, 1, 4, 7, 13, 25, 49, 94, 181, 349, 673, 1297, 25, 2344, 4339, 85, 6793, 13561, 24778, 45217, 9349, 9295, 88639, 1525, 1888, 11347, 13399, 28159, 54793, 17698, 11449, 11299, 95239, 135685, 253672, 495895, 98491, 983743, 183181, 176131, 1441546, 278461, 279319, 2175457

Figure 1 shows a plot of the first 100 terms:

Figure 1: permalink

Like the zeroless Fibonacci and Tribonacci sequences the ratio between successive terms of the zeroless Tetranacci sequence never approaches a limit. With no suppression of zeros, the following are the convergences:

Fibonacci: $\phi = \frac{1+\sqrt{5}}{2} \text{ which is }\approx 1.61803$
Tribonacci: the real root of $x^3 - x^2 - x - 1 = 0 \text{ which is } \approx 1.83929$
Tetranacci: the real root of $x^4 - x^3 - x^2 - x - 1 = 0 \text{ which is }\approx 1.92756$

Wednesday, 6 May 2026

Pandigital Products

Yesterday I turned 28156 days old and this number has an interesting property:$$28156 = 4 \times 7039$$The factorisation shown is not the prime factorisation but, looking at both sides of the equation, it can be seen that each of the digits from 0 to 9 occurs exactly once. This makes the number a member of OEIS A370970:

A370970: numbers $k$ which have a factorization $k = f_1 \times f_2 \times \ldots \times f_n $ where the digits of ${k, f_1, f_2, \ldots, f_n}$ together give $0,1, \ldots ,9$ exactly once.

Here is the complete list of terms:

8596 = 2 x 14 x 307
8790 = 2 x 3 x 1465
9360 = 2 x 4 x 15 x 78
9380 = 2 x 5 x 14 x 67
9870 = 2 x 3 x 1645
10752 = 3 x 4 x 896
12780 = 4 x 5 x 639
14760 = 5 x 9 x 328
14820 = 5 x 39 x 76
15628 = 4 x 3907
15678 = 39 x 402
16038 = 27 x 594 = 54 x 297
16704 = 9 x 32 x 58
17082 = 3 x 5694
17820 = 36 x 495 = 45 x 396
17920 = 8 x 35 x 64
18720 = 4 x 5 x 936
19084 = 52 x 367
19240 = 8 x 37 x 65
20457 = 3 x 6819
20574 = 6 x 9 x 381
20754 = 3 x 6918
21658 = 7 x 3094
24056 = 8 x 31 x 97
24507 = 3 x 8169
25803 = 9 x 47 x 61
26180 = 4 x 7 x 935
26910 = 78 x 345
27504 = 3 x 9168
28156 = 4 x 7039
28651 = 7 x 4093
30296 = 7 x 8 x 541
30576 = 8 x 42 x 91
30752 = 4 x 8 x 961
31920 = 5 x 76 x 84
32760 = 8 x 45 x 91
32890 = 46 x 715
34902 = 6 x 5817
36508 = 4 x 9127
47320 = 8 x 65 x 91
58401 = 63 x 927
65128 = 7 x 9304

65821 = 7 x 9403

These numbers are few and far between as can be seen and 28156 in particular recurs with permuted digits as 15628, 21658, 28651, 65128 and 65821.

Friday, 1 May 2026

Cartesian Product versus Self-Convolution

I asked Gemini the following:

How does the self convolution of a set A differ from the Cartesian product of the set with itself (A x A)?

This was the response:

To understand the difference between the Cartesian product of a set and its self-convolution, we have to look at what mathematical object each operation produces. In short: the Cartesian product generates a new set of raw pairs, while the convolution generates a sequence that counts the frequencies of their sums.

Here is a full breakdown of how these two concepts differ and how they ultimately connect.

1. The Cartesian Product: Structural Pairing
The Cartesian product of a set $A$ with itself, denoted as $A \times A$, is an operation strictly within set theory.
It takes the elements of $A$ and creates a new set containing every possible ordered pair $(x, y)$, where both $x$ and $y$ are elements of $A$.
$$A \times A = \{(x, y) \mid x \in A \text{ and } y \in A\}$$

Nature: It is purely structural. It does not add, multiply, or combine the values of the elements; it merely groups them side-by-side in a 2D grid.
Size: If set $A$ contains $k$ elements, the Cartesian product $A \times A$ will always contain exactly $k^2$ elements.

2. The Self-Convolution: Frequency of Sums
Strictly speaking, you cannot convolve a "set" directly; convolution is an operation applied to functions or sequences. When mathematicians refer to the convolution of a set $A$, they are actually referring to the discrete convolution of the set's indicator sequence (also called the characteristic function).
Let $1_A(x)$ be a sequence where the value is $1$ if $x$ is in set $A$, and $0$ if it is not. The self-convolution of this sequence produces a new sequence, $c_n$:
$$c_n = \sum_{i+j=n} 1_A(i) \cdot 1_A(j)$$

Nature: It is an arithmetic and combinatorial operation. The resulting sequence $c_n$ tells you exactly how many times the integer $n$ can be expressed as the sum of two elements from set $A$.
Size: The result is not a finite set of pairs, but an infinite sequence of integers (though it will be mostly zeros if $A$ is a finite set).

3. The Core Difference
The Cartesian product asks: "What are all the possible ways to pick two elements from this set?"
The Convolution asks: "If I add those two elements together, how many pairs produce a sum of $n$?"
If you imagine the Cartesian product as a square grid of pairs, the convolution is the result of drawing diagonal lines through that grid (where $x + y = n$) and counting how many pairs fall on each diagonal.
4. A Concrete Example
Let’s define a set of integers: $A = \{1, 2, 4\}$
The Cartesian Product ($A \times A$) creates a set of $3^2 = 9$ ordered pairs:
$A \times A = \{(1,1), (1,2), (1,4), (2,1), (2,2), (2,4), (4,1), (4,2), (4,4)\}$
The Self-Convolution maps the sums of these pairs to their frequencies. Let's add the elements of each pair together:

Sums to 2: $(1,1) \rightarrow$ 1 pair
Sums to 3: $(1,2), (2,1) \rightarrow$ 2 pairs
Sums to 4: $(2,2) \rightarrow$ 1 pair
Sums to 5: $(1,4), (4,1) \rightarrow$ 2 pairs
Sums to 6: $(2,4), (4,2) \rightarrow$ 2 pairs
Sums to 7: None $\rightarrow$ 0 pairs
Sums to 8: $(4,4) \rightarrow$ 1 pair

The resulting convolution sequence $c_n$ (starting from index $n=0$) would look like this:
$0, 0, 1, 2, 1, 2, 2, 0, 1, 0, 0, 0...$
5. The Generating Function Connection
Because you are working with tools like SageMath, the most elegant way to see the relationship between these two concepts is through generating functions.
If you turn set $A$ into a polynomial where the elements of the set are the exponents, you get:
$$f(x) = x^1 + x^2 + x^4$$
When you square this polynomial (which is the algebraic equivalent of the Cartesian product), you get:
$$f(x)^2 = (x^1 + x^2 + x^4) \cdot (x^1 + x^2 + x^4)$$
$$f(x)^2 = x^2 + 2x^3 + x^4 + 2x^5 + 2x^6 + x^8$$
Look at the coefficients of the expanded polynomial: $1, 2, 1, 2, 2, 1$. These are the exact non-zero values of our convolution sequence. The Cartesian product dictates the terms being multiplied, but the mathematical simplification of gathering like-terms is the act of convolution.

Convolutions Revisited

On the 12th October 2025, I created a post titled A Practical Example of a Convolution which began as follows:

Over the past decade, for some reason, I've chosen to ignore convolutions. Whenever they were mentioned in an OEIS sequence, I simply skipped over the reference. However, I'm now attempting to redress that neglect and to that end I was lucky to find two excellent YouTube videos about convolutions made by 3Blue1Brown (this guy has 7.76 million subscribers and for good reason).

I finished the post by saying:

This post is simply the first in what I hope will be a series of posts relating to convolutions. As I've already discovered, convolutions linked to Fourier transforms and Laplace transformations so it's a big topic to investigate but at least I've finally made a start.

Unfortunately there was no future series of posts relating to convolutions but I was reminded of them once again thanks to the number associated with my diurnal age today: $ \textbf{28152}$. It is a member of OEIS A014342:

A014342: Convolution of primes with themselves.

The initial members are:

4, 12, 29, 58, 111, 188, 305, 462, 679, 968, 1337, 1806, 2391, 3104, 3953, 4978, 6175, 7568, 9185, 11030, 13143, 15516, 18177, 21150, 24471, $ \textbf{28152}$, 32197, 36678, 41543, 46828, 52621, 58874, 65659, 73000, 80949, 89462, 98631, 108396, 118869, 130102, 142071

This time around I got Gemini to explain how the convolution was calculated:

In the context of integer sequences like those found in the OEIS, a convolution (specifically, a discrete Cauchy convolution) is a mathematical way of combining two sequences to create a third. When a sequence is convolved with itself, you are multiplying its terms together in a symmetrical, sliding window and summing the results.
Here is the full breakdown of how this works for OEIS A014342.
The Formula
First, let's establish our base sequence, which is the sequence of prime numbers, denoted as p_n:

p₁ = 2
p₂ = 3
p₃ = 5
p₄ = 7
p₅ = 11
...and so on.

The n-th term of the convolved sequence, let's call it c_n, is calculated by taking the sum of the products of two primes whose indices add up to n + 1.
The formal equation looks like this:
c_n = Σ (p_i × p_n-i+1)
(summed from i = 1 to n)
In simpler terms: to find the n-th number in your sequence, you line up the first n primes going forward, line up the exact same n primes going backward, multiply the overlapping pairs, and add those products together.
Step-by-Step Calculation
Here is how the first few members of the sequence are calculated using this method.
1st Term (n = 1):
We only use the first prime (p₁ = 2).
c₁ = (p₁ × p₁)
c₁ = (2 × 2)
c₁ = 4
2nd Term (n = 2):
We use the first two primes (2 and 3). We pair the first with the second, and the second with the first.
c₂ = (p₁ × p₂) + (p₂ × p₁)
c₂ = (2 × 3) + (3 × 2)
c₂ = 6 + 6
c₂ = 12
3rd Term (n = 3):
We use the first three primes (2, 3, and 5). Notice how the indices always add up to 4 (n + 1).
c₃ = (p₁ × p₃) + (p₂ × p₂) + (p₃ × p₁)
c₃ = (2 × 5) + (3 × 3) + (5 × 2)
c₃ = 10 + 9 + 10
c₃ = 29
4th Term (n = 4):
We use the first four primes (2, 3, 5, and 7).
c₄ = (p₁ × p₄) + (p₂ × p₃) + (p₃ × p₂) + (p₄ × p₁)
c₄ = (2 × 7) + (3 × 5) + (5 × 3) + (7 × 2)
c₄ = 14 + 15 + 15 + 14
c₄ = 58
5th Term (n = 5):
We use the first five primes (2, 3, 5, 7, and 11).
c₅ = (p₁ × p₅) + (p₂ × p₄) + (p₃ × p₃) + (p₄ × p₂) + (p₅ × p₁)
c₅ = (2 × 11) + (3 × 7) + (5 × 5) + (7 × 3) + (11 × 2)
c₅ = 22 + 21 + 25 + 21 + 22
c₅ = 111
The Pattern
As you calculate further into the sequence, this symmetrical "folding" action continues. You are always starting at the outer edges of your chosen set of primes and working your way inward to the middle, multiplying the pairs and summing them up. This specific operation is incredibly common in polynomials, probability theory, and signal processing, but when applied purely to integer sequences like the primes, it yields the exact sequence you provided.

Remember that SageMath makes it very easy to determine self-convolutions due to its formula convolutions(A, A) where A is any given set.