Dudeney number

In number theory, a Dudeney number in a given number base $b$ is a natural number equal to the perfect cube of another natural number such that the digit sum of the first natural number is equal to the second. The name derives from Henry Dudeney, who noted the existence of these numbers in one of his puzzles, Root Extraction, where a professor in retirement at Colney Hatch postulates this as a general method for root extraction.

Mathematical definition

Let $n$ be a natural number. We define the Dudeney function for base $b>1$ and power $p>0$ $F_{p,b}:\mathbb {N} \rightarrow \mathbb {N}$ to be the following:

F_{p,b}(n)=\sum _{i=0}^{k-1}{\frac {n^{p}{\bmod {b^{i+1}}}-n^{p}{\bmod {b}}^{i}}{b^{i}}}

where $k=p\left(\lfloor \log _{b}{n}\rfloor +1\right)$ is the $p$ times the number of digits in the number in base $b$ .

A natural number $n$ is a Dudeney root if it is a fixed point for $F_{p,b}$ , which occurs if $F_{p,b}(n)=n$ . The natural number $m=n^{p}$ is a generalised Dudeney number,^[1] and for $p=3$ , the numbers are known as Dudeney numbers. $0$ and $1$ are trivial Dudeney numbers for all $b$ and $p$ , all other trivial Dudeney numbers are nontrivial trivial Dudeney numbers.

For $p=3$ and $b=10$ , there are exactly six such integers (sequence A061209 in the OEIS): $1,512,4913,5832,17576,19683$

A natural number $n$ is a sociable Dudeney root if it is a periodic point for $F_{p,b}$ , where $F_{p,b}^{k}(n)=n$ for a positive integer $k$ , and forms a cycle of period $k$ . A Dudeney root is a sociable Dudeney root with $k=1$ , and a amicable Dudeney root is a sociable Dudeney root with $k=2$ . Sociable Dudeney numbers and amicable Dudeney numbers are the powers of their respective roots.

The number of iterations $i$ needed for $F_{p,b}^{i}(n)$ to reach a fixed point is the Dudeney function's persistence of $n$ , and undefined if it never reaches a fixed point.

It can be shown that given a number base $b$ and power $p$ , the maximum Dudeney root has to satisfy this bound:

n\leq (b-1)(1+p+\log _{b}{n^{p}})=(b-1)(1+p+p\log _{b}{n}))

implying a finite number of Dudeney roots and Dudeney numbers for each order $p$ and base $b$ .^[2]

$F_{1,b}$ is the digit sum. The only Dudeney numbers are the single-digit numbers in base $b$ , and there are no periodic points with prime period greater than 1.

Dudeney numbers, roots, and cycles of F_p,b for specific p and b

All numbers are represented in base $b$ .

$p$	$b$	Nontrivial Dudeney roots $n$	Nontrivial Dudeney numbers $m=n^{p}$	Cycles of $F_{p,b}(n)$	Amicable/Sociable Dudeney numbers
2	2	$\varnothing$	$\varnothing$	$\varnothing$	$\varnothing$
2	3	2	11	$\varnothing$	$\varnothing$
2	4	3	21	$\varnothing$	$\varnothing$
2	5	4	31	$\varnothing$	$\varnothing$
2	6	5	41	$\varnothing$	$\varnothing$
2	7	3, 4, 6	12, 22, 51	$\varnothing$	$\varnothing$
2	8	7	61	2 → 4 → 2	4 → 20 → 4
2	9	8	71	$\varnothing$	$\varnothing$
2	10	9	81	13 → 16 → 13	169 → 256 → 169
2	11	5, 6, A	23, 33, 91	$\varnothing$	$\varnothing$
2	12	B	A1	9 → 13 → 14 → 12	69 → 169 → 194 → 144
2	13	4, 9, C, 13	13, 63, B1, 1E6	$\varnothing$	$\varnothing$
2	14	D	C1	9 → 12 → 9	5B → 144 → 5B
2	15	7, 8, E, 16	34, 44, D1, 169	2 → 4 → 2 9 → B → 9	4 → 11 → 4 56 → 81 → 56
2	16	6, A, F	24, 64, E1	$\varnothing$	$\varnothing$
3	2	$\varnothing$	$\varnothing$	$\varnothing$	$\varnothing$
3	3	11, 22	2101, 200222	12 → 21 → 12	11122 → 110201 → 11122
3	4	2, 12, 13, 21, 22	20, 3120, 11113, 23121, 33220	$\varnothing$	$\varnothing$
3	5	3, 13, 14, 22, 23	102, 4022, 10404, 23403, 32242	12 → 21 → 12	2333 → 20311 → 2333
3	6	13, 15, 23, 24	3213, 10055, 23343, 30544	11 → 12 → 11	1331 → 2212 → 1331
3	7	2, 4, 11, 12, 14, 15, 21, 22	11, 121, 1331, 2061, 3611, 5016, 12561, 14641	25 → 34 → 25	25666 → 63361 → 25666
3	8	6, 15, 16	330, 4225, 5270	17 → 26 → 17	6457 → 24630 → 6457
3	9	3, 7, 16, 17, 25	30, 421, 4560, 5551, 17618	5 → 14 → 5 12 → 21 → 12 18 → 27 → 18	148 → 3011 → 148 1738 → 6859 → 1738 6658 → 15625 → 6658
3	10	8, 17, 18, 26, 27	512, 4913, 5832, 17576, 19683	19 → 28 → 19	6859 → 21952 → 6859
3	11	5, 9, 13, 15, 18, 22	104, 603, 2075, 3094, 5176, A428	8 → 11 → 8 A → 19 → A 14 → 23 → 14 16 → 21 → 16	426 → 1331 → 426 82A → 6013 → 82A 2599 → 10815 → 2599 3767 → 12167 → 3767
3	12	19, 1A, 1B, 28, 29, 2A	5439, 61B4, 705B, 16B68, 18969, 1A8B4	8 → 15 → 16 → 11 → 8 13 → 18 → 21 → 14 → 13	368 → 2A15 → 3460 → 1331 → 368 1B53 → 4768 → 9061 → 2454 → 1B53
4	2	11, 101	1010001, 1001110001	$\varnothing$	$\varnothing$
4	3	11	100111	22 → 101 → 22	12121201 → 111201101 → 12121201
4	4	3, 13, 21, 31	1101, 211201, 1212201, 12332101	$\varnothing$	$\varnothing$
4	5	4, 14, 22, 23, 31	2011, 202221, 1130421, 1403221, 4044121	$\varnothing$	$\varnothing$
4	6	24, 32, 42	1223224, 3232424, 13443344	14 → 23 → 14	114144 → 1030213 → 114144
5	2	110, 111, 1001	1111001100000, 100000110100111, 1110011010101001	$\varnothing$	$\varnothing$
5	3	101	12002011201	22 → 121 → 112 → 110 → 22	1122221122 → 1222021101011 → 1000022202102 → 110122100000 → 1122221122
5	4	2, 22	200, 120122200	21 → 33 → 102 → 30 → 21	32122221 → 2321121033 → 13031110200 → 330300000 → 32122221
6	2	110	1011011001000000	111 → 1001 → 1010 → 111	11100101110010001 → 10000001101111110001 → 11110100001001000000 → 11100101110010001
6	3	$\varnothing$	$\varnothing$	101 → 112 → 121 → 101	1212210202001 → 112011112120201 → 1011120101000101 → 1212210202001

Extension to negative integers

Dudeney numbers can be extended to the negative integers by use of a signed-digit representation to represent each integer.

Programming example

The example below implements the Dudeney function described in the definition above to search for Dudeney roots, numbers and cycles in Python.

def dudeneyf(x: int, p: int, b: int) -> int:
    """Dudeney function."""
    y = pow(x, p)
    total = 0
    while y > 0:
        total = total + y % b
        y = y // b
    return total

def dudeneyf_cycle(x: int, p: int, b: int) -> List:
    seen = []
    while x not in seen:
        seen.append(x)
        x = dudeneyf(x, p, b)
    cycle = []
    while x not in cycle:
        cycle.append(x)
        x = dudeneyf(x, p, b)
    return cycle

References

H. E. Dudeney, 536 Puzzles & Curious Problems, Souvenir Press, London, 1968, p 36, #120.

External links

Generalized Dudeney Numbers
Proving There are Only Six Dudeney Numbers Archived 2013-10-20 at the Wayback Machine

Classes of natural numbers

Powers and related numbers
Achilles Power of 2 Power of 3 Power of 10 Square Cube Fourth power Fifth power Sixth power Seventh power Eighth power Perfect power Powerful Prime power

Of the form a × 2^b ± 1
Cullen Double Mersenne Fermat Mersenne Proth Thabit Woodall

Other polynomial numbers
Hilbert Idoneal Leyland Loeschian Lucky numbers of Euler

Recursively defined numbers
Fibonacci Jacobsthal Leonardo Lucas Padovan Pell Perrin

Possessing a specific set of other numbers
Amenable Congruent Knödel Riesel Sierpiński

Expressible via specific sums
Nonhypotenuse Polite Practical Primary pseudoperfect Ulam Wolstenholme

Figurate numbers

2-dimensional

centered	Centered triangular Centered square Centered pentagonal Centered hexagonal Centered heptagonal Centered octagonal Centered nonagonal Centered decagonal Star
non-centered	Triangular Square Square triangular Pentagonal Hexagonal Heptagonal Octagonal Nonagonal Decagonal Dodecagonal

3-dimensional

centered	Centered tetrahedral Centered cube Centered octahedral Centered dodecahedral Centered icosahedral
non-centered	Tetrahedral Cubic Octahedral Dodecahedral Icosahedral Stella octangula
pyramidal	Square pyramidal

4-dimensional

non-centered	Pentatope Squared triangular Tesseractic

Combinatorial numbers
Bell Cake Catalan Dedekind Delannoy Euler Eulerian Fuss–Catalan Lah Lazy caterer's sequence Lobb Motzkin Narayana Ordered Bell Schröder Schröder–Hipparchus Stirling first Stirling second Telephone number Wedderburn–Etherington

Primes
Wieferich Wall–Sun–Sun Wolstenholme prime Wilson

Pseudoprimes
Carmichael number Catalan pseudoprime Elliptic pseudoprime Euler pseudoprime Euler–Jacobi pseudoprime Fermat pseudoprime Frobenius pseudoprime Lucas pseudoprime Lucas–Carmichael number Somer–Lucas pseudoprime Strong pseudoprime

Arithmetic functions and dynamics

Divisor functions	Abundant Almost perfect Arithmetic Betrothed Colossally abundant Deficient Descartes Hemiperfect Highly abundant Highly composite Hyperperfect Multiply perfect Perfect Practical Primitive abundant Quasiperfect Refactorable Semiperfect Sublime Superabundant Superior highly composite Superperfect
Prime omega functions	Almost prime Semiprime
Euler's totient function	Highly cototient Highly totient Noncototient Nontotient Perfect totient Sparsely totient
Aliquot sequences	Amicable Perfect Sociable Untouchable
Primorial	Euclid Fortunate

Other prime factor or divisor related numbers
Blum Cyclic Erdős–Nicolas Erdős–Woods Friendly Giuga Harmonic divisor Jordan–Pólya Lucas–Carmichael Pronic Regular Rough Smooth Sphenic Størmer Super-Poulet Zeisel

Numeral system-dependent numbers

Arithmetic functions
and dynamics

Persistence
- Additive
- Multiplicative

Digit sum	Digit sum Digital root Self Sum-product
Digit product	Multiplicative digital root Sum-product
Coding-related	Meertens
Other	Dudeney Factorion Kaprekar Kaprekar's constant Keith Lychrel Narcissistic Perfect digit-to-digit invariant Perfect digital invariant Happy