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Mellin transforms and asymptotics: Harmonic sums. Phillipe Flajolet, Xavier Gourdon, Philippe Dumas. Die Theorie der reziproken Funktionen und Integrale ist ein centrales Gebiet, welches manche anderen Gebiete der Analysis miteinander verbindet. Hjalmar Mellin. Reporter : Ilya Posov
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Mellin transforms and asymptotics: Harmonic sums Phillipe Flajolet, Xavier Gourdon, Philippe Dumas Die Theorie der reziprokenFunktionen und Integrale istein centrales Gebiet, welchesmanche anderen Gebiete derAnalysis miteinander verbindet. Hjalmar Mellin Reporter : Ilya Posov Saint-Petersburg State University Faculty of Mathematics and Mechanics Joint Advanced Student School 2004
Contents • Mellin transform and its basic properties • Direct mapping • Converse mapping • Harmonic sums Joint Advanced Student School 2004
Robert Hjalmar Mellin Born: 1854 in Liminka, Northern Ostrobothnia, FinlandDied: 1933 Joint Advanced Student School 2004
Some terminology • Analytic function • Meromorphic function • Open strip Joint Advanced Student School 2004
Mellin transform fundamental strip Joint Advanced Student School 2004
Mellin transform example fundamental strip : Joint Advanced Student School 2004
Gamma function fundamental strip : Joint Advanced Student School 2004
Transform of step function Joint Advanced Student School 2004
Basic properties (1/2) Joint Advanced Student School 2004
Basic properties (2/2) Joint Advanced Student School 2004
Zeta function Joint Advanced Student School 2004
Some Mellin tranforms Joint Advanced Student School 2004
Inversion Theorem 1 Joint Advanced Student School 2004
Laurent expansion Joint Advanced Student School 2004
Singular element Definition 1 Joint Advanced Student School 2004
Singular expansion Definition 2 Joint Advanced Student School 2004
Singular expansion of gamma function poles of gamma function Joint Advanced Student School 2004
Direct mapping (1/3) Theorem 2 Joint Advanced Student School 2004
Direct mapping (2/3) Joint Advanced Student School 2004
Direct mapping (3/3) Joint Advanced Student School 2004
Example 0 poles of gamma function Joint Advanced Student School 2004
Example 1 Joint Advanced Student School 2004
Example 2 Joint Advanced Student School 2004
Example 3 (nonexplicit transform) Joint Advanced Student School 2004
Converse mapping (1/3) Theorem 3 Joint Advanced Student School 2004
Converse mapping (2/3) Theorem 3 (continue) Joint Advanced Student School 2004
Converse mapping (3/3) Joint Advanced Student School 2004
Example 4 Joint Advanced Student School 2004
Example 5 Joint Advanced Student School 2004
Harmonic sums Definition 3 (separation property) Joint Advanced Student School 2004
Harmonic sum formula Joint Advanced Student School 2004
Example 6 Joint Advanced Student School 2004
Example 7 Simple poles in positive integers Double poles in 0 and -1 Joint Advanced Student School 2004
Example 8 Joint Advanced Student School 2004
Example 9 modified theta function Joint Advanced Student School 2004
Example 10 Joint Advanced Student School 2004
The end Joint Advanced Student School 2004