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.
a(10) = 26 because the minimal set of prime-strings in base 10 consist of the 26 terms of A071062.
a(10) = 8 because the largest member of the minimal set of prime-strings in base 10 is A071062(26) = 66600049 with 8 decimal digits.
277 is in this sequence because none of 2, 7, 27, 77 is a prime > 10. 857 is in this sequence because none of 8, 5, 7, 85, 87, 57 is a prime > 10. 991 is in this sequence because none of 9, 1, 99, 91 is a prime > 10. 149 is not in this sequence because 19 is subsequence of 149 and 19 is a prime > 10. 389 is not in this sequence because 89 is subsequence of 389 and 89 is a prime > 10. 439 is not in this sequence because 43 is subsequence of 439 and 43 is a prime > 10.
a(n, k, b)=v=[]; for(r=1, length(digits(n, b)), if(r+length(digits(k, 2))-length(digits(n, b))>0 && digits(k, 2)[r+length(digits(k, 2))-length(digits(n, b))]==1, v=concat(v, digits(n, b)[r]))); fromdigits(v, b)
iss(n, b)=for(k=1, 2^length(digits(n, b))-2, if(ispseudoprime(a(n, k, b)) && a(n, k, b)>b, return(0))); 1
is(n, b=10)=isprime(n) && n>b && iss(n, b) \\ Test whether n is a minimal element for the base b representations of the primes > b. Default value b = 10 for this sequence.
select( {is_A347819(n,b=10)=for(L=2, #n=digits(n,b), forvec(d=vector(L, i, [1,#n]), n[d[1]]&& isprime(fromdigits(vecextract(n,d),b))&& return(L==#n), 2))}, [1..8888]) \\ Better select among primes([1,N]). - M. F. Hasler, May 03 2022
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