A New Identity Linking Bernoulli Numbers, Stirling Numbers of the First Kind, and Bessel Numbers of the First Kind
Abstract
We establish a new identity linking Bernoulli, Stirling (first kind), and Bessel (first kind) numbers: \[ Σk=0n 2\,n-k\,s(n,k)\,Bk \;=\; Σk=0n b(n,k)\,(-1)k\,k!k+1. \] This parallels the classical Stirling--Bernoulli relation \[ Bn = Σk=0n S(n,k)\,(-1)k\,k!k+1, \] replacing S(n,k) with s(n,k) and b(n,k), and thus revealing a new structural connection among these families of numbers.
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