Revision as of 03:52, 20 September 2019 edit Michael Hardy (talk \| contribs) Administrators 210,577 edits m Michael Hardy moved page Explicit formulae (L-function) to Explicit formulae for L-functions ← Previous edit		Revision as of 00:38, 5 November 2019 edit undo Happyloveday44 (talk \| contribs) 1 edit I added some needed info Tags: Mobile edit Mobile web edit Next edit →
Line 1: In [[mathematics]], the '''explicit formulae for [[L-function]]s''' are relations between sums over the complex number zeroes of an L-function and sums over prime powers, introduced by {{harvtxt\|Riemann\|1859}} for the [[Riemann zeta function]]. Such explicit formulae have been applied also to questions on bounding the [[discriminant of an algebraic number field]], and the [[conductor of a number field]]. The explicit formula is a(n)=a1+d(n-1) which means n=the number of the term you are looking for so the number it is in the sequence. A1 is the first term in the sequence. D is the common difference. ==Riemann's explicit formula==

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