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Exercise sheet ODE 1: Question 1 worked example

Worked solution for Question 1 from Exercise sheet ODE 1 from EM2A

From  Daniel Friedrich 0 likes 310 plays 0  

Asymptotics of Kissing Polynomials and their Recurrence Relations - Ahmad Barhoumi

OPSFOTA online seminar series Ahmad Barhoumi (University of Michigan, USA) Asymptotics of Kissing Polynomials and their Recurrence Relations 14 June 2021

From  GILLIAN KERR 0 likes 27 plays 0  

Generalised higher order Freud polynomials - Kerstin Jordaan

OPSFOTA online seminar series Generalised higher order Freud polynomials Kerstin Jordaan (University of South Africa) 29 March 2021 To remove the captions from this video press CC on the bottom…

From  GILLIAN KERR 0 likes 45 plays 0  

On the joint moments of characteristic polynomials of random unitary matrices - Theo Assiotis

VISS online seminar series On the joint moments of characteristic polynomials of random unitary matrices Theo Assiotis (Edinburgh) 10 February 2021 An automated programme is used to generate the…

From  GILLIAN KERR 0 likes 40 plays 0  

CL - 22 - Tseytin Satisfaction DPLL

N/A

From  Haoran Peng 0 likes 108 plays 0  

29 October On Hermite–Padé approximants for a pair of Cauchy transforms with overlapping symmetric supports - Maxim Yattselev

ICMS OPSFOTA An automated programme has been used to generate the subtitles on this talk.

From  GILLIAN KERR 0 likes 58 plays 0  

CL - 6g - CNF II

This video shows how to use a Karnaugh map to represent an arbitrary Boolean function of four variables as a conjunctive normal form (CNF) — a conjunction of disjunctions of literals.

From  Haoran Peng 0 likes 394 plays 0  

CL - 6f - CNF I

This video shows how blocks of zeros, which correspond to disjund=ctions of literals, lead us to conjunctive normal form (CNF) which we met earlier as the output of our reduction procedure. CNF is in…

From  Haoran Peng 0 likes 470 plays 0  

CL - 6e - DNF

More on blocks of ones (which correspond to conjunctions of literals).This video shows how to use a Karnaugh map to represent an arbitrary Boolean function of four variables as a disjunctive normal…

From  Haoran Peng 0 likes 409 plays 0  

MLP Lecture 06 - Clip 01 - Vanishing & Exploding Gradients

Machine Learning Practical (MLP) Lecture 06, Clip 01 / 05.

From  Pavlos Andreadis 1 likes 532 plays 0  

Waves in Complex Continua (Wavinar) - Marie Touboul, (LMA, France)

An automated programme is used to generate the subtitles on this talk. You can remove the subtitles by pressing CC on the bottom toolbar. Marie Touboul, (LMA, France) Title: High-frequency…

From  Liam Holligan 0 likes 63 plays 0  

CL - Lecture 1.a - Binary Data

In this video, we introduce binary data as a simple example of information, and show how apparently more-complex examples can be encoded as binary data.

From  Claudia-Elena Chirita 0 likes 774 plays 0  

Computing the isospectral torus of finite sets of intervals via mappings of polynomial - Giorgio Mantica

OPSFOTA online seminar series Computing the isospectral torus of finite sets of intervals via mappings of polynomial Giorgio Mantica (Università Degli Studi Dell’insubria, Italy) 3…

From  GILLIAN KERR 0 likes 40 plays 0  

Large-degree asymptotics of rational Painleve-IV solutions by the isomonodromy method Part I - Robert Buckingham

OPSFOTA online seminar series Large-degree asymptotics of rational Painleve-IV solutions by the isomonodromy method Part I Robert Buckingham (University of Cincinnati, USA) 20 August 2020 An…

From  GILLIAN KERR 0 likes 28 plays 0  

28b

Dynamic Bayesian Networks II

From  Alex Lascarides 0 likes 200 plays 0  

The curse of dimensionality

The curse of dimensionality

From  Nigel Goddard 2 likes 2,728 plays 0