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http://repository.kln.ac.lk/handle/123456789/18197
Title: | On sum formulas for Mordell - Tornheim zeta values. |
Authors: | Pallewatta, M. Kaneko, M. |
Keywords: | Mordell-Tornheim zeta values Multiple zeta values Riemann zeta values Sum formulas |
Issue Date: | 2017 |
Publisher: | International Research Symposium on Pure and Applied Sciences, 2017 Faculty of Science, University of Kelaniya, Sri Lanka. |
Citation: | Pallewatta, M., and Kaneko, M. (2017). On sum formulas for Mordell - Tornheim zeta values. International Research Symposium on Pure and Applied Sciences, 2017 Faculty of Science, University of Kelaniya, Sri Lanka.p69. |
Abstract: | The multiple zeta values are real numbers which are studied by many people in different fields. The multiple zeta values with depth 1 are the Riemann zeta values. The sum formulas are considered as one of the most famous relations among multiple zeta values. In our research, we study a slightly different type of sums known as Mordell-Tornheim zeta values. Mordell-Tornheim zeta values can be expressed as a rational linear combination of multiple zeta values with same depth and weight. We have obtained new sum formulas for Mordell-Tornheim zeta values in the case of depth 2 and 3, expressing the sums as single multiples of Riemann zeta values. Moreover, we introduce reciprocity relations between the Mordell-Tornheim series of even arguments with depth 3 in terms of double and triple zeta values by using integrals of products of Bernoulli polynomials. |
URI: | http://repository.kln.ac.lk/handle/123456789/18197 |
Appears in Collections: | IRSPAS 2017 |
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