A note on the Irrationality of ζ(5) and Higher Odd Zeta Values
Abstract
In this note, we prove the irrationality of ζ(5) and generalize the method to prove the irrationality of all higher odd zeta values. Our proof relies on the method of contradiction, existence of solution of a system of Linear Diophantine equation, and mathematical induction. For n≥ 1, we denote dn=lcm(1,2,...,n). In the first part of the article, we assume ζ(5) is rational, say a/b. We observe that for n≥ b, there exists a system of equations involving linear combination of ζ(5) that has a solution. Later using the existence of solution of the Linear Diophantine equation, we show that such a system of linear combination of ζ(5) has no solution, which is a contradiction. In the second part of the article, we generalise this method for all higher odd zeta values.
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