On the de Bruijn-Newman constant: a new approach
Abstract
The conjecture of Newman, proposed in 1976 by Newman, states that all zeros of ( λ ) are real for ∈ R. Its equivalent statement is that M ( τ ) has purely imaginary zeros for ∈ R. It is well known that M ( τ ) is an even entire function of order one. This article addresses the product representation for M ( τ ) by the works of Hadamard and Csordas, Norfolk and Varga. We establish a new class of M ( τ ) by its series and product. Based on the obtained result, we prove that it has only purely imaginary zeros for ∈ R. This implies that the conjecture of Newman is true.
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