2019 CIME I Problems/Problem 15
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Let be a sequence of functions going from to defined recursively by and for all . Compute the greatest integer less than or equal to .
Solution
Note that the function on the right is ’s sum function, so if is multiplicative so is . Now since is multiplicative, it is not hard to see using induction that all are multiplicative too.
Therefore we can just consider one prime and its exponent. Say . Note that and . Then by the Hockey Stick Identity. We can continue this process (summing and using the hockey stick identity for each exponent) to obtain .
Now and thus our answer is .
See also
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