This is a front-end for the Online Encyclopedia of Integer Sequences, made by Christian Perfect. The idea is to provide OEIS entries in non-ancient HTML, and then to think about how they're presented visually. The source code is on GitHub.
%I A307581 #24 Dec 05 2024 19:19:47
%S A307581 0,2,0,6,15,5,371,742,60,787
%N A307581 Position of the first permutation of { 0 .. n-1 } occurring in the digits of Pi written in base n.
%C A307581 "The first permutation of {0 .. n-1}" means the first string of n distinct digits.
%C A307581 "Position" means the index of the digit where this string begins, where index = p means the digit corresponding to n^-p: e.g., the first digit after the decimal point would have index 1.
%C A307581 By inspection, a(12) > 1000. - _Alvin Hoover Belt_, Mar 17 2021
%F A307581 a(n) <= A307582(n) <= A307583(n).
%e A307581 Pi written in base 2 is 11.0...[2] so "10" occurring at position a(2) = 0 (digits corresponding to 2^0 and 2^-1) is the first permutation of the digits 01 to occur in the digits of Pi written in base 2.
%e A307581 Pi written in base 3 is 10.0102...[3], so "102" occurring at position a(3) = 2 (the string starts at the digit corresponding to 3^-2) is the first permutation of digits 012 to occur in the digits of Pi written in base 3.
%e A307581 Pi written in base 4 is 3.021...[4], so "3021" occurring at position a(4) = 0 (the string starts at the digit corresponding to 4^0) is the first permutation of digits 0123 to occur in the digits of Pi written in base 4.
%e A307581 Pi written in base 5 is 3.0323221430...[5], so "21430" occurring at position a(5) = 6 (the string starts at the digit corresponding to 5^-6) is the first permutation of digits 01234 to occur in the digits of Pi written in base 5.
%e A307581 Pi = 3.141592653589793238462643383279502884197169399375105820974944592307816... (in base 10) has the first string of 10 distinct digits, "4592307816", starting at position a(10) = 60.
%o A307581 (PARI) A307581(n,x=Pi,m=n^n)=for(k=0,oo,#Set(d=digits(x\n^-k%m,n))>=n && (#Set(d)==n||vecsort(d)==[1..n-1]) && return([k-n+1,digits(x\n^-k,n)])) \\ Returns position and the digits up to there. Ensure sufficient realprecision (\p): an error should occur if a suitable permutation of digits is not found early enough, but in case of results near the limit of precision, it is suggested to double check (by increasing the precision further) that the relevant digits are all correct.
%Y A307581 Cf. A307582 (start of first occurrence of (0, ..., n-1) in digits of Pi in base n).
%Y A307581 Cf. A307583 (start of last permutation of {0 .. n-1} not to occur earlier, in base-n digits of Pi).
%Y A307581 Cf. A068987, A121280.
%K A307581 nonn,more,base
%O A307581 2,2
%A A307581 _M. F. Hasler_, Apr 15 2019