Joint distribution of leftmost digits in positional notation and Schanuels's conjecture
Abstract
Assume that n ≥ 2 and B = (b1,...,bn) has distince integer entries ≥ 3. For x > 0 let dB(x) := (db1(x),...,dbn(x)) where dbi(x) ∈ \1,...,bi-1\ is the leftmost digit in the base-bi positional notation representation of x. We prove that if dB is surjective, then bi and bj are rationally independent whenever i ≠ j. We prove the converse for n = 2, and for n ≥ 3 if \ p : p prime \ is algebraically independent, a condition implied by Schanuel's conjecture about transcendental numbers.
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