Post Reply 
Riemann's Zeta Function - another approach (RPL)
06-30-2017, 12:08 PM
Post: #26
RE: Riemann's Zeta Function - another approach (RPL)
How does this compare to Jean-Marc Baillard's implementation of Borwein's second algorithm?

The 34S uses this algorithm. Originally in C but later in XROM. Borwein's paper includes an error term which means that for real arguments, the number of terms for a specified precision is constant & can be determined in advance. This isn't true for complex numbers, where the number of terms depends on the magnitude of the complex part.


Pauli
Find all posts by this user
Quote this message in a reply
Post Reply 


Messages In This Thread
RE: Riemann's Zeta Function - another approach (RPL) - Paul Dale - 06-30-2017 12:08 PM



User(s) browsing this thread: 3 Guest(s)