This page requires that JavaScript be enabled in your browser.
Learn how »
Spectral Zeta Functions
Paul Abbott
When the eigenvalues of an operator A can be computed and form a discrete set, the spectral zeta function of A reduces to a sum over eigenvalues, when the sum exists. Belloni and Robinett used the “quantum bouncer” to compute quantum sum rules. In this presentation we use Mathematica to compute the spectral zeta function via the Weierstrass product theorem.
Thanks for your feedback.
Channels: Technology Conference
1311 videos match your search.
|
Shadi Ashnai Learn to modify audio signals using audio effects, including delay and reverberation.
Notebook link: https://wolfr.am/OKVe1Ef9 |
|
Carlo Giacometti Generate audio signals, from simple built-in models to a variety of complex signals. |
|
Carlo Giacometti Learn about a suite of audio analysis and visualization functions available in the Wolfram Language. |
|
Ralph Blanes & Sarthak Srinivas A student hackathon project presentation featuring modules for music improvisation and artificial intelligence. |
|
Samir Sayegh |
|
Andrew Steinacher |
|
David Stoutemyer |
|
Jakub Kabala |
|
Shadi Ashnai |
|
Jose Martin-Garcia |
|
Gerald Thomas |
|
Pedro Fonseca |
|
Devendra Kapadia & Oliver Reubenkoenig |
|
Philip Maymin |
|
Bryan Minor |
|
Anton Antonov |
|
Mark Kotanchek |
|
Jeff Bryant & Keiko Hirayama |
|
Michael Sollami |
|
Kyle Keane & George Varnavides |