Hi everyone,
Hope all is well.
a(n) is obtained by inserting exactly one decimal digit into the decimal expansion of n. Among all resulting integers m, maximize k such that p^k ∣ m. If more than one choice attains the same maximum exponent k, choose the one with the largest prime p.
A few examples:
a(1) = 81, since 81 = 3^4 and 16 = 2^4; both have exponent 4, but 3 > 2.
a(12) = 512, since 512 = 2^9.
a(23) = 243, since 243 = 3^5.
a(29) = 729, since 729 = 3^6.
81,32,32,64,54,64,27,81,96,160,112,512,135,144,125,160,176,128,192,320,216,224,243,243,256,256,272,128,729,320,351,320,336,384,352,736,375,384,392,640,416,432,243,448,405,486,472,448,496,560.
The second sequence is the associated primes: 3,2,2,2,3,2,3,3,2,2,2,2,3,2,5,2,2,2,2,2,3,2,3,3,2,2,2,2,3,2,3,2,2,2,2,2,5,2,7,2,2,3,3,2,3,3,2,2,2,2.
Conjecture: All prime numbers appear in this sequence.
I would really appreciate it if you could tell me whether these two sequences are appropriate for the OEIS. Also, please check the notes below and tell me if they were suitable as comments.
1) The power k should be at least 3 because we can always add a digit to n and make it a multiple of 8.
2) Powers of odd primes are more likely to appear when n is odd.
3) For n = 2^i, a(n) = 10*n, j >4.
4) For n = 2^i*10^j, j > 5, is there a possibility of getting a power of 3 or 7 instead of 10*n?
Best,
Ali