Abstract. Denote the difference of order $n$ $$ \sum ^n_{k=0} C(n,k)(-1)^{n-k}f(u+k\delta ) $$ by $\Delta_f(n;u,\delta )$ provided $[u,u+n\delta ] \subset D(f)$ where $C(n,k)$ is the binomial coefficient ${n\choose k}$. Call a function $f$ with domain [0,1] unpredictable if $f$ is continuous and is identically zero on $[0,1/2]$ but not identically zero on any longer subinterval of $[0,1]$. We deal with the question: For $f$ unpredictable, how large are differences $\Delta_f(n;0,\delta )$ where $n\delta\in (1/2,1)$? We show that higher order differences of such a function exhibit a much more extreme asymptotic character than was previously known.
AMS Subject Classification
(1991): 26E10
Received December 28, 1994. (Registered under 5679/2009.)
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