"Quantum-Computing"(Q-C) = Simple-Arithmetic Since Digits = Quanta/Bosons Via Algebraic-INVERSION 1881($<$1901-05-25) of Digits On-Average Logarithmic-Law = ONLY BEQS!!!

Digits'(On Average) Newcomb(1881)-Weyl(1914)-Benford(1938) "NeWBe" Logarithmic-Law $<$P$>$ = log{\{}base=10{\}}(1 + 1/d) = log{\{}base=10{\}}([d + 1]/d) Siegel [Abs.973-60-124, AMS Nat.Mtg.(2002)] INVERSION to ONLY Bose-Einstein quantum-statistics(BEQS) d = 1/[10\^{}($<$P$>)$-1] $\sim $ 1/[exp($<$P$>)$-1]$\sim $ 1/[exp($<$w$>)$-1] $\sim $ {\{}1/[1+($<$w$>)$+...]-1] $\sim $ "1"/$<$w$>$\^{}1.000...Archimedes' Zipf-law HYPERBOLICITY ("noise" $\sim $ "generalized-susceptibility") power-spectrum INEVITABILITY with gapFUL BEC to digit d = 0, $<$P(0)$>$ = oo, GAP = [$<$P(0)$>$=oo]-[$<$P(1)$>$=0.32]=oo has deep meaning for (so called) Q-C. Identification of digits(BCE) as quanta(1901-05 ACE) because quanta are/always were digits: energy-levels: ground-state d=0, first excited-state d=1,..., with no intermediate/fractional-levels, separated by quantum: Q = (d=1)-(d=0) = 1 means (on average any/all simple arithmetic computations with digits are ab initio by definition Q-C. Example: a blank-check is a BEC of digits d=0; writing some non-zero digits d$>$0, then signing check, is quantum-excitation from d=0 to d$>$0. Thus (so called) Q-C has existed since man learned to count/manipulate hand's digits. Simple arithmetic(except for: division; factoring with remainders) is/has been from time immemorial (on average) "Q-C"!!!