Gray map

A map from $\mathbf{Z}_4$ to $\mathbf{F}_2^2$, extended in the obvious way to $\mathbf{Z}_4^n$ and $\mathbf{F}_2^n$ which maps Lee distance to Hamming distance. Explicitly, $$ 0 \mapsto 00 \ ,\ \ 1 \mapsto 01 \ ,\ \ 2 \mapsto 11 \ ,\ \ 3 \mapsto 10 \ . $$

The map instantiates a Gray code in dimension 2.

Möbius inversion for arithmetic functions

The original form of Möbius inversion developed by A. Möbius for arithmetic functions.

Möbius considered also inversion formulas for finite sums running over the divisors of a natural number $n$: $$ F(n) = \sum_{d | n} f(d) \ ,\ \ \ f(n) = \sum_{d | n} \mu(d) F(n/d) \ . $$ The correspondence $f \mapsto F$ is the Möbius transform, and $F \mapsto f$ the inverse Möbius transform.

Another inversion formula: If $P(n)$ is a totally multiplicative function for which $P(1) = 1$, and $f(x)$ is a function defined for all real $x > 0$, then $$ g(x) = \sum_{n \le x} P(n) f(x/n) $$ implies $$ f(x) = \sum_{n \le x} \mu(n) P(n) g(x/n) \ . $$

All these (and many other) inversion formulas follow from the basic property of the Möbius function that it is the inverse of the unit arithmetic function $E(n) \equiv 1$ under Dirichlet convolution, cf. (the editorial comments to) Möbius function and Multiplicative arithmetic function.

References

Gilbreath conjecture

A conjecture on the distribution of prime numbers.

For any sequence $(x_n)$, define the absolute difference sequence $\delta^1_n = |x_{n+1} - x_n|$, and the iterated differences $\delta^{k+1} = \delta^1 \delta^k$. In 1958 N. L. Gilbreath conjectured that when applied to the sequence of prime numbers, the first term in each iterated sequence $\delta^k$ is always $1$. Odlyzko has verified the conjecture for the primes $\le 10^{13}$.

References