Handbook of Mellin Transforms | Agenda Bookshop Skip to content
Selected Colleen Hoover Books at €9.99c | In-store & Online
Selected Colleen Hoover Books at €9.99c | In-store & Online
A01=N. Savischenko
A01=O. Marichev
A01=Yu. Brychkov
Age Group_Uncategorized
Age Group_Uncategorized
Author_N. Savischenko
Author_O. Marichev
Author_Yu. Brychkov
automatic-update
Category1=Non-Fiction
Category=PBKF
COP=United Kingdom
Delivery_Delivery within 10-20 working days
Language_English
PA=Available
Price_€100 and above
PS=Active
softlaunch

Handbook of Mellin Transforms

English

By (author): N. Savischenko O. Marichev Yu. Brychkov

The Mellin transformation is widely used in various problems of pure and applied mathematics, in particular, in the theory of differential and integral equations and the theory of Dirichlet series. It is found in extensive applications in mathematical physics, number theory, mathematical statistics, theory of asymptotic expansions, and especially, in the theory of special functions and integral transformations. It is essentially used in algorithms of integration in computer algebra systems.

Since the majority of integrals encountered in applications can be reduced to the form of the corresponding Mellin transforms with specific parameters, this handbook can also be used for definite and indefinite integrals. By changes in variables, the Mellin transform can be turned into the Fourier and Laplace transforms.

The appendices contain formulas of connection with other integral transformations, and an algorithm for determining regions of convergence of integrals.

The Handbook of Mellin Transforms will be of interest and useful to all researchers and engineers who use mathematical methods. It will become the main source of formulas of Mellin transforms, as well as indefinite and definite integrals.

See more
Current price €279.29
Original price €293.99
Save 5%
A01=N. SavischenkoA01=O. MarichevA01=Yu. BrychkovAge Group_UncategorizedAuthor_N. SavischenkoAuthor_O. MarichevAuthor_Yu. Brychkovautomatic-updateCategory1=Non-FictionCategory=PBKFCOP=United KingdomDelivery_Delivery within 10-20 working daysLanguage_EnglishPA=AvailablePrice_€100 and abovePS=Activesoftlaunch
Delivery/Collection within 10-20 working days
Product Details
  • Weight: 1348g
  • Dimensions: 191 x 254mm
  • Publication Date: 02 Oct 2018
  • Publisher: Taylor & Francis Ltd
  • Publication City/Country: United Kingdom
  • Language: English
  • ISBN13: 9781138353350

About N. SavischenkoO. MarichevYu. Brychkov

Yu.A. Brychkov https://en.wikipedia.org/wiki/Yuri_Aleksandrovich_Brychkov graduated from the Lomonosov Moscow State University. He was a post-graduate student in the Mathematical Institute of the Russian Academy of Sciences and has been at the Dorodnitsyn Computing Center of the Russian Academy of Sciences since 1969. He has published about 100 publications including 2 books and 7 handbooks in CRC (Gordon and Breach) including 5 volumes of Integrals and Series (together with A.P.Prudnikov and O.I.Marichev).O.I. Marichev https://en.wikipedia.org/wiki/Oleg_Marichev Graduated from the Belorussian State University he received the D.Sc. degree (Habilitation) in mathematics from the University of Jena Germany. In 1991 he started working with Stephen Wolfram on Mathematica developing integration and mathematical functions. He has authored about 70 publications is an author and a co-author of 10 books and the well-known Wolfram Functions site http://- functions.wolfram.com/ with over 307000 formulas (http://functions.wolfram.com/About/developers.html). His books include Fractional Integrals and Derivatives. Theory and Applications. (Samko S.G. Kilbas A.A. Marichev O.I. 1987 1993).N.V.Savischenko graduated from the Novosibirsk State University and has been at the Military Telecommunications Academy since 1987 publishing nearly 100 articles and a book.

Customer Reviews

Be the first to write a review
0%
(0)
0%
(0)
0%
(0)
0%
(0)
0%
(0)
We use cookies to ensure that we give you the best experience on our website. If you continue we'll assume that you are understand this. Learn more
Accept