Definition:Stolarsky-Harborth Constant

Definition
The Stolarsky-Harborth constant is the lower bound for the number $\beta$ defined as:


 * $\beta > \dfrac {P_n} {n^{\lg 3} }$

where:
 * $P_n$ is the number of odd elements in the first $n$ rows of Pascal's triangle
 * $\lg 3$ denotes the logarithm base $2$ of $3$.

Its value is given by:
 * $\beta \approx 0 \cdotp 81255 \, 65590 \, 160063 \, 8769 \ldots$

Also see

 * Bounds on Number of Odd Terms in Pascal's Triangle