Contribution to the OEIS - A395743

 A395743

Sum of the cumulative number of previous occurrences of the digits of n in the sequence 1..n excluding the current occurrence of each digit.

0

0, 0, 0, 0, 0, 0, 0, 0, 0, 1, 5, 5, 6, 7, 8, 9, 10, 11, 12, 3, 15, 9, 8, 9, 10, 11, 12, 13, 14, 5, 17, 18, 13, 11, 12, 13, 14, 15, 16, 7, 19, 20, 21, 17, 14, 15, 16, 17, 18, 9, 21, 22, 23, 24, 21, 17, 18, 19, 20, 11, 23, 24, 25, 26, 27, 25, 20, 21, 22, 13

(list; graph; refs; listen; history; edit; text; internal format)

OFFSET

1,11

COMMENTS

This sequence is the exclusive counterpart to A343644. While A343644 counts the occurrences of digits in the range [1,n], a(n) counts only the occurrences strictly preceding each digit of n. Formally a(n) = A343644(n) - A055642(n). Thus, this sequence represents the exclusive scan of digit occurrences, whereas A343644 is the inclusive scan. a(n) = 0 for all single-digit n as it measures the cumulative repetition of digits at the exact moment n is formed.

LINKS

Vincenzo Manto, Table of n, a(n) for n = 1..10000

FORMULA

a(n) = Sum_{i=1..k} C(d_i), where d_1, d_2, ..., d_k are the digits of n, and C(d_i) is the number of times digit d_i has appeared in the concatenation of all integers from 1 to n-1 plus the digits of n to the left of d_i.

a(n) = A343644(n) - A055642(n).

EXAMPLE

For n = 11:

The digits are '1' and '1'.

- First '1': Appeared previously in {1, 10} -> count = 2.

- Second '1': Appeared previously in {1, 10} AND as the first digit of 11 -> count = 3.

a(11) = 2 + 3 = 5.

For n = 12:

The digits are '1' and '2'.

- Digit '1': Appeared in {1, 10, 11 (twice)} -> count = 4.

- Digit '2': Appeared in {2} -> count = 1.

a(12) = 4 + 1 = 5.

MATHEMATICA

a[n_]:=Module[{sm=0, id=IntegerDigits[n], d=IntegerDigits/@Range[n-1]//Flatten}, Do[sm=sm+Count[Join[d, Take[id, i-1]], id[[i]]], {i, IntegerLength[n]}]; sm]; Array[a, 70]

PROG

(Python)

def generate_sequence(limit):

seq = []

counts = [0] * 10

for n in range(1, limit + 1):

v = 0

s = str(n)

for char in s:

d = ord(char) - 48

v += counts[d]

counts[d] += 1

seq.append(v)

return seq

print(generate_sequence(70))

CROSSREFS

Cf. A007953, A343644, A055642.

Sequence in context: A152481 A157276 A010486 * A298185 A329082 A111423

Adjacent sequences: A395738 A395740 A395741 * A395744 A395745 A395746

KEYWORD

nonn,base,easy,new

AUTHOR

Vincenzo Manto and James C. McMahon, May 05 2026

STATUS

approved

16670, A Saintly Number

 

(Image: By Unknown author - http://santuarioeucaristico.blogspot.hu/2010/08/sao-maximiliano-kolbe-14-de-agosto.html, Public Domain, https://commons.wikimedia.org/w/index.php?curid=42823235)

In 1941, a prisoner at the Auschwitz concentration camp escaped. In retaliation, the officials at the camp selected ten prisoners who would be starved to death. One of the selected prisoners, Franciszek Gajowniczek, a Polish Catholic, cried out, "My wife! My children!" Upon hearing his pleas, a Franciscan Friar, Maximilian Maria Kolbe, volunteered to take the place of Gajowniczek. 

In the following weeks, each time the guards checked on him, he was standing or kneeling in the middle of the cell, calmly looking at those who entered. After the group had been starved and deprived of water for two weeks, only Kolbe and three others remained alive.

Impatient to empty the bunker, the guards gave the four remaining prisoners lethal injections of carbolic acid. Kolbe is said to have raised his left arm and calmly waited for it. Maximilian Kolbe died on 14 August 1941. He was cremated on 15 August, which happened to be the feast day of the Assumption of Mary.

Kolbe was canonized by Pope John Paul II on 10 October 1982.

Gajowniczek was transferred from Auschwitz to Sachsenhausen concentration camp on 25 October 1944. He was liberated there by the Allies, after spending five years, five months, and nine days in concentration camps in total. He reunited with his wife Helena, six months later in Rawa Mazowiecka. 

Saint Maximilian Kolbe's prisoner number at Auschwitz was 16670.

Top Italian Mathematicians

 

(Image: Designed by Kubanek / Freepikw.freepik.com )

1. Fibonacci (Leonardo of Pisa, c. 1170–1240)
   Often regarded as the most influential medieval European mathematician. He introduced the Hindu-Arabic numeral system (including zero) to the Western world in his book Liber Abaci, revolutionizing commerce, science, and calculation. He is best known for the Fibonacci sequence (0, 1, 1, 2, 3, 5, 8, ...), which appears in nature, art, and modern applications like computer algorithms and biology.
   Also see: Fibonacci Day, Speed Limits, The Creator
   
   
   (Image: By Hans-Peter Postel - Own work, CC BY 2.5, https://commons.wikimedia.org/w/index.php?curid=1739679)
   
   
   
   
   
2. Joseph-Louis Lagrange (Giuseppe Luigi Lagrangia, 1736–1813)
   A towering figure in mathematical analysis, celestial mechanics, and number theory. Born in Turin (then part of the Kingdom of Sardinia), he worked extensively in France and is considered one of the greatest mathematicians of the 18th century. Key contributions include Lagrangian mechanics (foundational to classical physics), the Lagrange multiplier method in optimization, and major advances in algebra and the calculus of variations. He is frequently ranked among the top Italians in historical popularity indices.
   
   
   (Image: Public Domain - https://commons.wikimedia.org/wiki/File:Lagrange_crop.jpg)
   
   
3. Gerolamo Cardano (1501–1576)
   A Renaissance polymath whose Ars Magna (1545) was the first major Latin treatise on algebra, introducing solutions to cubic and quartic equations (building on earlier Italian work by del Ferro, Tartaglia, and Ferrari). He also made pioneering contributions to probability theory and is noted for his broad influence on mathematics, medicine, and philosophy during the Italian Renaissance.
   
   
   (Image: Ginko Edizioni)
   
   
   
4. Galileo Galilei (1564–1642)
   While primarily remembered as a physicist and astronomer, Galileo was a profound mathematician who applied rigorous mathematical methods to the study of motion, falling bodies, and kinematics—laying groundwork for modern physics and the scientific method. His work on geometry, proportions, and experimental mathematics bridged the Renaissance and the Scientific Revolution. Many lists of great Italian mathematicians include him for his mathematical innovations in mechanics.
   
   
   (Image: Public Domain - https://en.wikipedia.org/wiki/Galileo_Galilei#/media/File:Galileo_Galilei_(1564-1642)_RMG_BHC2700.tiff)
   
   
   
5. Vito Volterra (1860–1940) 
   Vito Volterra is renowned for his work in functional analysis (integral equations, Volterra operators) and mathematical biology (predator-prey models, now foundational in ecology).
   
   
   
   
   (Image: By Unknown author - http://www.phys.uniroma1.it/DipWeb/dottorato/SCUO_VOLTERRA/scuola_volterra.html, Public Domain, https://commons.wikimedia.org/w/index.php?curid=16117839 )

Other Notable Mentions

• Luca Pacioli (c. 1447–1517): "Father of accounting" and popularizer of double-entry bookkeeping; collaborator with Leonardo da Vinci.
• Bonaventura Cavalieri and Evangelista Torricelli: 17th-century pioneers in indivisibles and early calculus ideas.
• Scipione del Ferro, Niccolò Tartaglia, and Lodovico Ferrari: Solved cubic and quartic equations in the Renaissance.
• Maria Gaetana Agnesi (1718–1799): Early female mathematician known for the "witch of Agnesi" curve and comprehensive calculus text.
• Gregorio Ricci-Curbastro developed the tensor calculus (with Tullio Levi-Civita), which became essential for Einstein's general relativity and differential geometry. Other strong contenders for this spot include Giuseppe Peano (axiomatization of natural numbers and mathematical logic) and Ennio de Giorgi or Enrico Bombieri (Fields Medalist) for more modern contributions.

Modern-era figures like Enrico Bombieri (Fields Medal 1974) and Eugenio Calabi also rank highly in specialized fields but are less "all-time" dominant than the historical giants. Other current figures include:

• Alfio Quarteroni (born May 30, 1952, in Ripalta Cremasca, Italy) is a prominent Italian mathematician specializing in numerical analysis, scientific computing, and mathematical modeling.
• Professor Piergiorgio Odifreddi (born 1950 in Cuneo, Italy) is an Italian mathematician, logician, and popular science writer specializing in mathematical logic, recursion theory (computability theory), and the foundations of mathematics. He is Professor Emeritus of Mathematical Logic at the University of Turin, where he taught for many years, and has held visiting positions at institutions such as Cornell University and the University of California, Berkeley.
• Professor Roberto Renò (born in Italy) is an Italian mathematician and quantitative finance expert specializing in financial econometrics, volatility modeling, asset pricing, and statistical methods for financial markets. He holds a PhD in Financial Mathematics from the Scuola Normale Superiore in Pisa (2005, magna cum laude) and a degree in Physics from the University of Pisa.