Difference between revisions of "Absolute convergence of secant zeta function"

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==Theorem==  
 
==Theorem==  
The series defining the [[secant zeta]] function $\psi_s(z)$ converges absolutely in the following cases:
+
The series defining the [[secant zeta function]] $\psi_s(z)$ converges absolutely in the following cases:
 
# when $z=\dfrac{p}{q}$ with $q$ odd, $s>1$
 
# when $z=\dfrac{p}{q}$ with $q$ odd, $s>1$
 
# when $z$ [[algebraic number| algebraic]] [[irrational number]] and $s >2$
 
# when $z$ [[algebraic number| algebraic]] [[irrational number]] and $s >2$

Latest revision as of 06:09, 16 June 2016

Theorem

The series defining the secant zeta function $\psi_s(z)$ converges absolutely in the following cases:

  1. when $z=\dfrac{p}{q}$ with $q$ odd, $s>1$
  2. when $z$ algebraic irrational number and $s >2$
  3. when $z$ is algebraic irrational and $s=2$.

Proof

References