A summation method based on the Fourier series of periodic distributions and an example

Abstract

A generalised summation method is considered based on the Fourier series of periodic distributions. It is shown that eit-2e2it+3e3it-4e4it+-·s = P f eit(1+eit)2 +iπ Σn∈ Z δ'(2n+1)π, where P f eit(1+eit)2∈ D'(R) is the 2π-periodic distribution given by eqnarray* P f eit(1+eit)2 , &=& ε 0 ( ∫(-δ,π-ε)(π+ε,2π+δ)(t) eit(1+eit)2dt -(π) (ε/2)) eqnarray* ∈ D(R) with support supp()⊂ (-δ,2π+δ), where δ∈ (0,π). Applying the generalised summation method, we determine the sum of the divergent series 1+2+3+·s, and more generally 1k+2k+3k+·s for k∈ N.