Geometry, Representation theory, and Moduli Seminar
... upcoming talks October 19 I. Setayesh Princeton Rutgers The discrete Weierstrass representation of surfaces ... Springer representations and Hitchin fibration November 23 D. Zakharov Columbia The discrete Weierstrass ...
https://metaphor.ethz.ch/x/2022/fs/401-3118-22L/ex/sheet9.pdf
... Weierstrass equations, for which the smoothness condition can be checked by a polynomial equation. 2 Legendre ... Form and j-invariant There is another form of Weierstrass equation that is sometimes convenient. A ... Weierstrass equations, for which the smoothness condition can be checked by a polynomial equation. 2 Legendre ... Form and j-invariant There is another form of Weierstrass equation that is sometimes convenient. A ...
https://metaphor.ethz.ch/x/2022/fs/401-3932-19L/ex/ex2.pdf
... Exercise sheet 2 Exercise 2.1 (Stone- Weierstrass theorem [1]) (a) Construct a sequence of polynomials ... on [0, 1] to prove the Stone- Weierstrass theorem. Exercise 2.2 (Bernstein approximation [5]) Let Bfn ... Exercise sheet 2 Exercise 2.1 (Stone- Weierstrass theorem [1]) (a) Construct a sequence of polynomials ... on [0, 1] to prove the Stone- Weierstrass theorem. Exercise 2.2 (Bernstein approximation [5]) Let Bfn ...
https://metaphor.ethz.ch/x/2019/hs/401-2303-00L/ex/SolSheet9.pdf
... criterion. Therefore ζ(z) converges uniformly on K by the Weierstrass criterion and it converges locally ... uniformly on |z| ≤ R by the Weierstrass criterion. Let K ⊂ D be a compact subset. Then there exists R < 1 ... criterion. Therefore ζ(z) converges uniformly on K by the Weierstrass criterion and it converges locally ... uniformly on |z| ≤ R by the Weierstrass criterion. Let K ⊂ D be a compact subset. Then there exists R < 1 ...
Algebraic Curves Spring 2017
... of the Weierstrass function The book Riemann surfaces and algebraic curves by Renzo Cavalieri and ... calculations. Links A paper about the zeroes of the Weierstrass function The book Riemann surfaces and ...
FIM poster conference analysis 2014
... , Weierstrass-Institute for Applied Analysis and Stochastics Alexander Volberg, Michigan State University ... , Weierstrass-Institute for Applied Analysis and Stochastics Alexander Volberg, Michigan State University ...
https://metaphor.ethz.ch/x/2022/fs/401-3932-19L/ex/sol2.pdf
... Solution sheet 2 Exercise 2.1 (Stone- Weierstrass theorem [1]) (a) Construct a sequence of polynomials ... on [0, 1] to prove the Stone- Weierstrass theorem. Solution 2.1 (a) Consider the function fn(x) = nx(1 ... Solution sheet 2 Exercise 2.1 (Stone- Weierstrass theorem [1]) (a) Construct a sequence of polynomials ... on [0, 1] to prove the Stone- Weierstrass theorem. Solution 2.1 (a) Consider the function fn(x) = nx(1 ...
https://metaphor.ethz.ch/x/2019/hs/401-2303-00L/ex/ExSheet9.pdf
... . 1 (b) Is the converse of Weierstrass M-test true in general? 2 ... . 1 (b) Is the converse of Weierstrass M-test true in general? 2 ...
https://people.math.ethz.ch/~rahul/slopeb.pdf
... . Using the Weierstrass divisor, multiples of ψ can be shown to be effective. We might expect then that aψ ... marking 1 on a component of genus i. Another basic effective class is the Weierstrass divisor (4) W = −λ ... . Using the Weierstrass divisor, multiples of ψ can be shown to be effective. We might expect then that aψ ... marking 1 on a component of genus i. Another basic effective class is the Weierstrass divisor (4) W = −λ ...
https://kyng.inf.ethz.ch/courses/AGAO20/problem_sets/ps2.pdf
... . You might use the following two theorems. Theorem (Bolzano- Weierstrass). Every bounded sequence in Rn ... . You might use the following two theorems. Theorem (Bolzano- Weierstrass). Every bounded sequence in Rn ...
