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We study even palindromes in base b through a new viewpoint based on discrete convolutions and Pascal-type transforms. Given an integer N, the associated palindrome Tb (N) can be interpreted as a digital autocorrelation of its base-b digits, while division by b+1 corresponds to a binomial transform perturbed by localized carry effects. We introduce the ideal quotient, obtained by enforcing symmetric carries, and show that its digits arise from a folded Pascal-triangle structure. Numerical experiments across several bases reveal unexpected regularity phenomena, including high palindromicity rates in the diagonal products U (N, N) =Tb (N) ²/ (b+1) and universal “smooth” digit patterns. We formulate classification and probabilistic questions motivated by these findings.
Coronato Antonio (Tue,) studied this question.
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