Все публикации

0:25:12

Mixing time of random transposition shuffles - Analysis, Random Walks and Groups

0:32:14

Plancherel's Theorem in G - Analysis, Random Walks and Groups

0:11:29

Upper Bound Lemma in G - Analysis, Random Walks and Groups

0:18:25

Convolution theorem and the Hilbert Schmidt inner product in G - Analysis, Random Walks and Groups

0:26:20

Dual group and Fourier transform in G - Analysis, Random Walks and Groups

0:20:41

Schur's Lemma in G - Analysis, Random Walks and Groups

0:17:25

Representations of finite groups G - Analysis, Random Walks and Groups

0:19:44

Random walks on finite groups G - Analysis, Random Walks and Groups

0:11:30

Mixing and the Upper Bound Lemma - Analysis, Random Walks and Groups

0:12:38

Finding the mixing time - Analysis, Random Walks and Groups

0:15:32

Proof of the Upper Bound Lemma - Analysis, Random Walks and Groups

0:15:20

Upper Bound Lemma - Analysis, Random Walks and Groups

0:11:30

Convolution theorem and iterated convolutions - Analysis, Random Walks and Groups

0:17:56

Plancherel's theorem - Analysis, Random Walks and Groups

0:14:42

Convolution theorem - Analysis, Random Walks and Groups

0:27:07

Inner product, L^2 norms and Cauchy Schwartz inequality - Analysis, Random Walks and Groups

0:10:46

Lp norms - Analysis, Random Walks and Groups

0:10:53

Spectral gap, definition and examples - Analysis, Random Walks and Groups

0:10:34

Mixing of a random walk - Analysis, Random Walks and Groups

0:12:24

Fourier series i e sums in Z p, inverse Fourier transform - Analysis, Random Walks and Groups

0:20:56

Fourier transform in Z p - Analysis, Random Walks and Groups

0:11:34

Introduction to harmonic analysis - Analysis, Random Walks and Groups

0:19:40

L^1 identity part 2, end of the proof - Analysis, Random Walks and Groups

0:14:40

Convolution - Analysis, Random Walks and Groups