Preparatory lectures for the Sde-Boker school

• Introduction to zeta functions (Uri Onn)
  References:
      On the number of primes less than a given magnitude, B. Riemann.
      The Riemann zeta function and its functional equation, N. Elkies.
      Edwards, H. M. (1974), Riemann's Zeta Function, New York
      An elementary proof of the prime-number theorem, Atle Selberg. Ann. of Math. (2) 50, (1949). 305--313.
      Harmonic analysis on number fields (D. Ramakrishnan)
  
  
• The p-adics: definition, toplogy, harmonic analysis (Uri Onn)
  References:
      Harmonic analysis on number fields (D. Ramakrishnan)
      Fourier analysis in number fields and Hecke's zeta functions (Tate's 1950 thesis), in Algebraic Number Theory by J. W. S. Cassels, A. Frohlich
  
  
• Malcev correspondece (Mark Berman)
  
• Introduction to p-adic analytic groups (Yair Glasner)
  
• Basics of Model theory (Assaf Hasson)
  References:
        Logic (lecture notes by David Kazhdan)
  
• Relevant concepts from Algebraic Geometry (Ilya Tyomkin)
  

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