Short mollifiers of the Riemann zeta-function

Abstract

We apply the calculus of variations to construct a new sequence of linear combinations of derivatives of the Riemann ζ-function adapted to Levinson's method, which yield a positive proportion of zeros of the ζ-function on the critical line, regardless of how short the mollifier is. Our construction extends readily to modular L-functions. Even with Levinson's original choice of mollifier, our method more than doubles the proportions of zeros on the critical line for modular L-functions previously obtained by Bernard and K\"uhn--Robles--Zeindler, while relying on the same arithmetic inputs. This indicates that optimizing the linear combinations, an approach that has received relatively little attention, has a more pronounced effect than refining the mollifier when it is short. Curiously, our linear combinations provide non-trivial smooth approximations of Siegel's f-function in the celebrated Riemann--Siegel formula.