Hamiltonian paths and cycles | Planar graphs | Unsolved problems in graph theory | Conjectures
Barnette's conjecture is an unsolved problem in graph theory, a branch of mathematics, concerning Hamiltonian cycles in graphs. It is named after , a professor emeritus at the University of California, Davis; it states that every bipartite polyhedral graph with three edges per vertex has a Hamiltonian cycle. (Wikipedia).
What is the Riemann Hypothesis?
This video provides a basic introduction to the Riemann Hypothesis based on the the superb book 'Prime Obsession' by John Derbyshire. Along the way I look at convergent and divergent series, Euler's famous solution to the Basel problem, and the Riemann-Zeta function. Analytic continuation
From playlist Mathematics
In this video, we explore the "pattern" to prime numbers. I go over the Euler product formula, the prime number theorem and the connection between the Riemann zeta function and primes. Here's a video on a similar topic by Numberphile if you're interested: https://youtu.be/uvMGZb0Suyc The
From playlist Other Math Videos
Conditional Probability: Bayes’ Theorem – Disease Testing (Table and Formula)
This video shows how to determine conditional probability using a table and using Bayes' theorem. @mathipower4u
From playlist Probability
Prob & Stats - Bayes Theorem (1 of 24) What is Bayes Theorem?
Visit http://ilectureonline.com for more math and science lectures! In this video I will explain what is and define the symbols of Bayes Theorem. Bayes Theorem calculates the probability of an event or the predictive value of an outcome of a test based on prior knowledge of condition rela
From playlist PROB & STATS 4 BAYES THEOREM
Berge's lemma, an animated proof
Berge's lemma is a mathematical theorem in graph theory which states that a matching in a graph is of maximum cardinality if and only if it has no augmenting paths. But what do those terms even mean? And how do we prove Berge's lemma to be true? == CORRECTION: at 7:50, the red text should
From playlist Summer of Math Exposition Youtube Videos
Murky Waters Threatens Deep Dive Search | The Bermuda Triangle: Into Cursed Waters (Season 1)
Mark and his team dive into deep waters to search for remains from the Snowy Grouper wreck. See more in this clip from Season 1, "Alien Abyss." Watch new episodes of The Bermuda Triangle: Into Cursed Waters, Tuesdays at 10/9c, and stay up to date on all of your favorite The HISTORY Channe
From playlist The Bermuda Triangle: Into Cursed Waters
OCEAN VORTEX SWALLOWS FLEET OF SHIPS | The Bermuda Triangle: Into Cursed Waters (Season 1)
The crew is on a mission to find evidence of Jingle’s fleet at the bottom of a mid-ocean sink hole. See more in this clip from Season 1, "Holes in the Ocean." Watch new episodes of The Bermuda Triangle: Into Cursed Waters, Tuesdays at 10/9c, and stay up to date on all of your favorite The
From playlist The Bermuda Triangle: Into Cursed Waters
Pieces of Missing Spy Plane Found | The Bermuda Triangle: Into Cursed Waters (Season 1)
The team travels to the edge of the Bermuda Triangle to investigate a missing spy plane. See more in this clip from Season 1, "Top Secret Deep." Watch new episodes of The Bermuda Triangle: Into Cursed Waters, Tuesdays at 10/9c, and stay up to date on all of your favorite The HISTORY Chann
From playlist The Bermuda Triangle: Into Cursed Waters
CHALLENGER SPACECRAFT UNCOVERED ON OCEAN FLOOR | The Bermuda Triangle: Into Cursed Waters (Season 1)
Mike and his dive team search for clues regarding a bizarre case of 27 missing people but come across something bigger. See more in this clip from Season 1, "A Big Find." Watch new episodes of The Bermuda Triangle: Into Cursed Waters, Tuesdays at 10/9c, and stay up to date on all of your
From playlist The Bermuda Triangle: Into Cursed Waters
A (compelling?) reason for the Riemann Hypothesis to be true #SOME2
A visual walkthrough of the Riemann Zeta function and a claim of a good reason for the truth of the Riemann Hypothesis. This is not a formal proof but I believe the line of argument could lead to a formal proof.
From playlist Summer of Math Exposition 2 videos
Topologies of the zero sets of random real projective hyper-surfaces... - Peter Sarnak
Workshop on Topology: Identifying Order in Complex Systems Topic: Topologies of the zero sets of random real projective hyper-surfaces and of monochromatic waves Speaker: Peter Sarnak Affiliation: IAS and Princeton University Date: April 7, 2018 For more videos, please visit http://video
From playlist Mathematics
DEEP DIVE SEARCH FOR LOST SHIP | The Bermuda Triangle: Into Cursed Waters (Season 1)
Things take a turn for the worse when the team investigates a mysterious wreck just 50 miles northeast of Miami. See more in this clip from Season 1, "Rogue Waves." Watch new episodes of The Bermuda Triangle: Into Cursed Waters, Tuesdays at 10/9c, and stay up to date on all of your favori
From playlist The Bermuda Triangle: Into Cursed Waters
In this video, I explain function space and how to change the basis vectors we use to describe function. This lead us to a different understanding of Taylor series, Fourier series and most series. I also explain the Heisenberg uncertainty principle using function space. Additionnal video
From playlist Summer of Math Exposition Youtube Videos
Nodal domains for Maass forms - Peter Sarnak
Workshop on Representation Theory and Analysis on Locally Symmetric Spaces Topic: Nodal domains for Maass forms Speaker: Peter Sarnak Affiliation: Professor, School of Mathematics Date: March 9, 2018 For more videos, please visit http://video.ias.edu
From playlist Mathematics
What Is The Uncertainty Principle?
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From playlist Science Unplugged: Quantum Mechanics
A Tour of Skein Modules by Rhea Palak Bakshi
PROGRAM KNOTS THROUGH WEB (ONLINE) ORGANIZERS: Rama Mishra, Madeti Prabhakar, and Mahender Singh DATE & TIME: 24 August 2020 to 28 August 2020 VENUE: Online Due to the ongoing COVID-19 pandemic, the original program has been canceled. However, the meeting will be conducted through onl
From playlist Knots Through Web (Online)
What Heisenberg's Uncertainty Principle *Actually* Means
Let's talk about one of the most misunderstood but awesome concepts in physics. The Heisenberg uncertainty principle. Or maybe it should be the Heisenberg 'fuzziness' principle instead? Would that confuse less people?
From playlist Some Quantum Mechanics
Peter Sarnak - Nodal domains of eigenmodes of the Laplacian and of random functions [2013]
Gelfand Centennial Conference: A View of 21st Century Mathematics MIT, Room 34-101, August 28 - September 2, 2013 Peter Sarnak Saturday, August 31 10:50AM Nodal domains of eigenmodes of the Laplacian and of random functions Abstract: It is believed that the eigenfunctions of the quantiz
From playlist Number Theory
Bayes' Theorem - The Simplest Case
►Second Bayes' Theorem example: https://www.youtube.com/watch?v=k6Dw0on6NtM ►Third Bayes' Theorem example: https://www.youtube.com/watch?v=HaYbxQC61pw ►FULL Discrete Math Playlist: https://www.youtube.com/watch?v=rdXw7Ps9vxc&list=PLHXZ9OQGMqxersk8fUxiUMSIx0DBqsKZS Bayes' Theorem is an inc
From playlist Discrete Math (Full Course: Sets, Logic, Proofs, Probability, Graph Theory, etc)