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Marina Iliopoulou: Three polynomial methods for point counting, Lecture I
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Harmonic Analysis and Analytic Number Theory
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- 1 Marina Iliopoulou: Three polynomial methods for point counting, Lecture I
- 2 Samit Dasgupta: An introduction to auxiliary polynomials in transcendence theory, Lecture I
- 3 Marina Iliopoulou: Three polynomial methods for point counting, Lecture II
- 4 Samit Dasgupta: An introduction to auxiliary polynomials in transcendence theory, Lecture II
- 5 Roger Heath-Brown: The Determinant Method I, Lecture I
- 6 Samit Dasgupta: An introduction to to auxiliary polynomials in transcendence theory, Lecture III
- 7 Roger Heath-Brown: The Determinant Method, Lecture II
- 8 Marina Iliopoulou: Three polynomial methods for point counting, Lecture III
- 9 Roger Heath Brown: The Determinant Method, Lecture III
- 10 Marina Iliopoulou: Three polynomial methods for point counting, Lecture IV
- 11 Hong Wang: The restriction problem and the polynomial method, Lecture I
- 12 Valentin Blomer: The polynomial method for point counting and exponential sums, Lecture 1
- 13 Hong Wang: The restriction problem and the polynomial method, Lecture 2
- 14 Valentin Blomer: The polynomial method for point counting and exponential sums, Lecture 2
- 15 Hong Wang: The restriction problem and the polynomial method, Lecture III
- 16 Valentin Blomer: The polynomial method for point counting and exponential sums, Lecture III
- 17 Hong Wang: The restriction problem and the polynomial method, Lecture IV
- 18 Valentin Blomer: The polynomial method for point counting and exponential sums, Lecture IV
- 19 Matthew Young: Large sieve inequalities for families of automorphic forms
- 20 Terence Tao: The circle method from the perspective of higher order Fourier analysis
- 21 Betsy Stovall: Fourier restriction to the sphere is extremizable more often than not
- 22 Ian Petrow: Relative trace formulas for GL (2) and analytic number theory
- 23 Jim Wright: Exponential sums and oscillatory integral a unified approach
- 24 Shaoming Guo (UW Madison): Some recent progress on the Bochner Riesz problem
- 25 Will Sawin: Sums in progressions to squarefree moduli among polynomials over a finite field
