08/13/2007, 05:40 AM
Yes, I'd be interested in seeing the math behind these matrix operators, so I can understand their relationship to my solution. Now that I'm working on a power series for my cheta function, I should soon be able to provide answers to very high precision (50-100 decimal places) with very low iteration counts (5-100 iterations, depending on the convergence radius).
As such, I'm hoping to be able to calculate the first few dozen derivatives of \( {}^x e \) with high precision, and I'm even hopeful that a formula for the power series will present itself, probably related to the power series of the \( {}^x \check \eta \).
As such, I'm hoping to be able to calculate the first few dozen derivatives of \( {}^x e \) with high precision, and I'm even hopeful that a formula for the power series will present itself, probably related to the power series of the \( {}^x \check \eta \).