Rényi's Parking Constants

Given the closed interval with , let one-dimensional "cars" of unit length be parked randomly on the interval. The mean number of cars which can fit (without overlapping!) satisfies

(1)

The mean density of the cars for large is

(2) (3) (4)

(OEIS A050996). While the inner integral can be done analytically,

(5) (6)

where is the Euler-Mascheroni constant and is the incomplete gamma function, it is not known how to do the outer one

(7) (8) (9)

where is the exponential integral. The slowly converging series expansion for the integrand is given by

(10)

(OEIS A050994 and A050995).

In addition,

(11)

for all (Rényi 1958), which was strengthened by Dvoretzky and Robbins (1964) to

(12)

Dvoretzky and Robbins (1964) also proved that

(13)

Let be the variance of the number of cars, then Dvoretzky and Robbins (1964) and Mannion (1964) showed that

(14) (15) (16)

(OEIS A086245), where

(17) (18)

and the numerical value is due to Blaisdell and Solomon (1970). Dvoretzky and Robbins (1964) also proved that

(19)

and that

(20)

Palasti (1960) conjectured that in two dimensions,

(21)

but this has not yet been proven or disproven (Finch 2003).