Daniel Chen
Published 2023-08-28Version 1
A closed form is found for the expected number of rolls of a fair n-sided die until three consecutive increasing values are seen. The answer is rational, and the greatest common divisor of the numerator and denominator is given in terms of n. As n goes to infinity, the probability generating function is found for the limiting case, which is also the exponential generating function for permutations ending in a double rise and without other double rises. Thus exact values are found for the limiting expectation and variance, which are approximately 7.92437 and 27.98133 respectively.
Maximizing the expected number of components in an online search of a graph
The expected number of inversions after n adjacent transpositions
On the Greatest Common Divisor of $\binom{qn}{q}, \binom{qn}{2q},\dots, \binom{qn}{qn-q}$
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