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.
 |
Eric Mjolsness Collaborative projects have resulted in several Mathematica-implemented modeling languages aimed at general-purpose biological modeling, which is a useful and topical but an indefinitely expandable goal. We update previous work on ... |
 |
Jae Bum Jung/Yan Zhuang |
 |
Phillip Todd |
 |
Василий Сороко |
 |
Phil Ramsden |
 |
Lou D'Andria Constructing interfaces with Dynamic, DynamicModule and Manipulate is nothing new, but those aren't the only Dynamic primitives available in Mathematica. In this talk, we'll identify and demonstrate some of the ... |
 |
Галина Михалкина, Григорий Фридман |
 |
Галина Михалкина |
 |
Андрей Кротких |
 |
Антон Екименко, Кирилл Белов |
 |
Физический институт имени П.Н. Лебедева |
 |
Григорий Фридман, Олег Иванов |
 |
Галина Михалкина |
 |
Олег Кофнов |
 |
Николай Сосновский |
 |
Микаэл Эгибян |
 |
Микаэл Эгибян |
 |
Леонид Шифрин |
 |
Вахагн Геворгян |
 |
Алексей Семенов |
