Monday, June 25  Introduction to SAGE 
Tuesday, June 26  State Riemann Hypothesis 1; integer factorization; enumeration of primes; Mersenne primes 
Thursday, June 28  Frequency of prime gaps; Square root approximation, Li(x) and Riemann Hypothesis 2; multiplicative parity 
Friday, June 29  Calculus; Complex numbers; Blip functions; 
Monday, July 2 
Staircase of primes; distorted staircase and Phi(t); Fourier theory I

Tuesday, July 3 
Fourier theory II; Fast fourier transform

Thursday, July 5 
Fourier transform of Phi(t) and the spectrum
theta_{i} of the prime numbers.

Friday, July 6 
From the theta_{i} back to pi(x).
The Riemann zeta function and the traditional formulation of the Riemann hypothesis.
