Carmichael function

Let a and n be coprime and let m be the smallest exponent with a^m ≡ 1 (mod n), then it holds that

${\displaystyle m\,|\,\lambda (n)}$.

That is, the order m := ord_n(a) of a unit a in the ring of integers modulo n divides λ(n) and

${\displaystyle \lambda (n)=\max\{\operatorname {ord} _{n}(a)\,\colon \,\gcd(a,n)=1\}}$

Suppose a^m ≡ 1 (mod n) for all numbers a coprime with n. Then λ(n) | m.

Proof: If m = kλ(n) + r with 0 ≤ r < λ(n), then

${\displaystyle a^{r}=1^{k}\cdot a^{r}\equiv \left(a^{\lambda (n)}\right)^{k}\cdot a^{r}=a^{k\lambda (n)+r}=a^{m}\equiv 1{\pmod {n}}}$

for all numbers a coprime with n. It follows r = 0, since r < λ(n) and λ(n) the minimal positive such number.

For a coprime to (powers of) 2 we have a = 1 + 2h for some h. Then,

${\displaystyle a^{2}=1+4h(h+1)=1+8C}$

where we take advantage of the fact that C := (h + 1)h/2 is an integer.

So, for k = 3, h an integer:

${\displaystyle {\begin{aligned}a^{2^{k-2}}&=1+2^{k}h\\a^{2^{k-1}}&=\left(1+2^{k}h\right)^{2}=1+2^{k+1}\left(h+2^{k-1}h^{2}\right)\end{aligned}}}$

By induction, when k ≥ 3, we have

${\displaystyle a^{2^{k-2}}\equiv 1{\pmod {2^{k}}}.}$

It provides that λ(2^k) is at most 2^{k − 2}.[1]

This follows from elementary group theory, because the exponent of any finite group must divide the order of the group. λ(n) is the exponent of the multiplicative group of integers modulo n while φ(n) is the order of that group.

We can thus view Carmichael's theorem as a sharpening of Euler's theorem.

${\displaystyle a\,|\,b\Rightarrow \lambda (a)\,|\,\lambda (b)}$

Proof. The result follows from the formula

${\displaystyle \lambda (n)=\operatorname {lcm} \left(\lambda \left(p_{1}^{r_{1}}\right),\lambda \left(p_{2}^{r_{2}}\right),\ldots ,\lambda \left(p_{k}^{r_{k}}\right)\right)}$

mentioned above.

For all positive integers a and b it holds that

${\displaystyle \lambda (\mathrm {lcm} (a,b))=\mathrm {lcm} (\lambda (a),\lambda (b))}$.

This is an immediate consequence of the recursive definition of the Carmichael function.

If n has maximum prime exponent r_max under prime factorization, then for all a (including those not coprime to n) and all r ≥ r_max,

${\displaystyle a^{r}\equiv a^{r+\lambda (n)}{\pmod {n}}.}$

In particular, for square-free n (r_max = 1), for all a we have

${\displaystyle a\equiv a^{\lambda (n)+1}{\pmod {n}}.}$

For any n ≥ 16:[2][3]

${\displaystyle {\frac {1}{n}}\sum _{i\leq n}\lambda (i)={\frac {n}{\ln n}}e^{B(1+o(1))\ln \ln n/(\ln \ln \ln n)}}$

(called Erdős approximation in the following) with the constant

${\displaystyle B:=e^{-\gamma }\prod _{p\in \mathbb {P} }\left({1-{\frac {1}{(p-1)^{2}(p+1)}}}\right)\approx 0.34537}$

and γ ≈ 0.57721, the Euler–Mascheroni constant.

The following table gives some overview over the first 2²⁶ – 1 = 67108863 values of the λ function, for both, the exact average and its Erdős-approximation.

Additionally given is some overview over the more easily accessible “logarithm over logarithm” values LoL(n) := ln λ(n)/ln n with

• LoL(n) > 4/5 ⇔ λ(n) > n^4/5.

There, the table entry in row number 26 at column

• % LoL > 4/5   → 60.49

indicates that 60.49% (≈ 40000000) of the integers 1 ≤ n ≤ 67108863 have λ(n) > n^4/5 meaning that the majority of the λ values is exponential in the length l := log₂(n) of the input n, namely

${\displaystyle \left(2^{\frac {4}{5}}\right)^{l}=2^{\frac {4l}{5}}=\left(2^{l}\right)^{\frac {4}{5}}=n^{\frac {4}{5}}.}$

ν	n = 2ν – 1	sum ${\displaystyle \sum _{i\leq n}\lambda (i)}$	average ${\displaystyle {\tfrac {1}{n}}\sum _{i\leq n}\lambda (i)}$	Erdős average	Erdős / exact average	LoL average	% LoL > 4/5	% LoL > 7/8
5	31	270	8.709677	68.643	7.8813	0.678244	41.94	35.48
6	63	964	15.301587	61.414	4.0136	0.699891	38.10	30.16
7	127	3574	28.141732	86.605	3.0774	0.717291	38.58	27.56
8	255	12994	50.956863	138.190	2.7119	0.730331	38.82	23.53
9	511	48032	93.996086	233.149	2.4804	0.740498	40.90	25.05
10	1023	178816	174.795699	406.145	2.3235	0.748482	41.45	26.98
11	2047	662952	323.865169	722.526	2.2309	0.754886	42.84	27.70
12	4095	2490948	608.290110	1304.810	2.1450	0.761027	43.74	28.11
13	8191	9382764	1145.496765	2383.263	2.0806	0.766571	44.33	28.60
14	16383	35504586	2167.160227	4392.129	2.0267	0.771695	46.10	29.52
15	32767	134736824	4111.967040	8153.054	1.9828	0.776437	47.21	29.15
16	65535	513758796	7839.456718	15225.430	1.9422	0.781064	49.13	28.17
17	131071	1964413592	14987.400660	28576.970	1.9067	0.785401	50.43	29.55
18	262143	7529218208	28721.797680	53869.760	1.8756	0.789561	51.17	30.67
19	524287	28935644342	55190.466940	101930.900	1.8469	0.793536	52.62	31.45
20	1048575	111393101150	106232.840900	193507.100	1.8215	0.797351	53.74	31.83
21	2097151	429685077652	204889.909000	368427.600	1.7982	0.801018	54.97	32.18
22	4194303	1660388309120	395867.515800	703289.400	1.7766	0.804543	56.24	33.65
23	8388607	6425917227352	766029.118700	1345633.000	1.7566	0.807936	57.19	34.32
24	16777215	24906872655990	1484565.386000	2580070.000	1.7379	0.811204	58.49	34.43
25	33554431	96666595865430	2880889.140000	4956372.000	1.7204	0.814351	59.52	35.76
26	67108863	375619048086576	5597160.066000	9537863.000	1.7041	0.817384	60.49	36.73

For all numbers N and all but o(N)[4] positive integers n ≤ N (a "prevailing" majority):

${\displaystyle \lambda (n)={\frac {n}{(\ln n)^{\ln \ln \ln n+A+o(1)}}}}$

with the constant[3]

${\displaystyle A:=-1+\sum _{p\in \mathbb {P} }{\frac {\ln p}{(p-1)^{2}}}\approx 0.2269688}$

For any sufficiently large number N and for any Δ ≥ (ln ln N)³, there are at most

${\displaystyle N\exp \left(-0.69(\Delta \ln \Delta )^{\frac {1}{3}}\right)}$

positive integers n ≤ N such that λ(n) ≤ ne^−Δ.[5]

For any sequence n₁ < n₂ < n₃ < ⋯ of positive integers, any constant 0 < c < 1/ln 2, and any sufficiently large i:[6][7]

${\displaystyle \lambda (n_{i})>\left(\ln n_{i}\right)^{c\ln \ln \ln n_{i}}.}$

For a constant c and any sufficiently large positive A, there exists an integer n > A such that[7]

${\displaystyle \lambda (n)<\left(\ln A\right)^{c\ln \ln \ln A}.}$

Moreover, n is of the form

${\displaystyle n=\mathop {\prod _{q\in \mathbb {P} }} _{(q-1)|m}q}$

for some square-free integer m < (ln A)^{c ln ln ln A}.[6]

The set of values of the Carmichael function has counting function[8]

${\displaystyle {\frac {x}{(\ln x)^{\eta +o(1)}}},}$

where

${\displaystyle \eta =1-{\frac {1+\ln \ln 2}{\ln 2}}\approx 0.08607}$