TRANSCENDENTAL SUMS RELATED TO THE ZEROS OF ZETA FUNCTIONS. Issue 3 (1st August 2018)

Record Type:: Journal Article
Title:: TRANSCENDENTAL SUMS RELATED TO THE ZEROS OF ZETA FUNCTIONS. Issue 3 (1st August 2018)
Main Title:: TRANSCENDENTAL SUMS RELATED TO THE ZEROS OF ZETA FUNCTIONS
Authors:: Gun, Sanoli
Murty, M. Ram
Rath, Purusottam
Abstract:: Abstract : While the distribution of the non‐trivial zeros of the Riemann zeta function constitutes a central theme in Mathematics, nothing is known about the algebraic nature of these non‐trivial zeros. In this article, we study the transcendental nature of sums of the form ∑ ρ R ( ρ ) x ρ, where the sum is over the non‐trivial zeros ρ of ζ ( s ), R ( x ) ∊ Q ¯ ( x ) is a rational function over algebraic numbers and x > 0 is a real algebraic number. In particular, we show that the function f ( x ) = ∑ ρ x ρ ρ has infinitely many zeros in ( 1, ∞ ), at most one of which is algebraic. The transcendence tools required for studying f ( x ) in the range x < 1 seem to be different from those in the range x > 1 . For x < 1, we have the following non‐vanishing theorem: If for an integer d ⩾ 1, f ( π d x ) has a rational zero in ( 0, 1 / π d ), then L ′ ( 1, χ − d ) ≠ 0, where χ − d is the quadratic character associated with the imaginary quadratic field K : = Q ( − d ) . Finally, we consider analogous questions for elements in the Selberg class. Our proofs rest on results from analytic as well as transcendental number theory.
Is Part Of:: Mathematika. Volume 64:Issue 3(2018)
Journal:: Mathematika
Issue:: Volume 64:Issue 3(2018)
Issue Display:: Volume 64, Issue 3 (2018)
Year:: 2018
Volume:: 64
Issue:: 3
Issue Sort Value:: 2018-0064-0003-0000
Page Start:: 875
Page End:: 897
Publication Date:: 2018-08-01
Subjects:: 11J81 -- 11J86 (primary) -- 11M06 (secondary)
Mathematics -- Periodicals
510.5
Journal URLs:: http://journals.cambridge.org/action/displayJournal?jid=MTK ↗
https://londmathsoc.onlinelibrary.wiley.com/journal/20417942 ↗
http://onlinelibrary.wiley.com/ ↗
DOI:: 10.1112/S0025579318000293 ↗
Languages:: English
ISSNs:: 0025-5793
Deposit Type:: Legaldeposit
View Content:: Available online (eLD content is only available in our Reading Rooms) ↗
Physical Locations:: British Library DSC - BLDSS-3PM
British Library HMNTS - ELD Digital store
Ingest File:: 12970.xml