Sanoli Gun scite author profile

Several authors have studied the nature and location of zeros of modular forms for the full modular group Γ and other congruence subgroups. In this paper, we investigate the zeros of certain quasimodular forms for Γ . In particular, we study the transcendence and existence of infinitely many Γ -inequivalent zeros of these quasi-modular forms. We also estimate the number of such zeros in Siegel sets, motivated by a recent work of Ghosh and Sarnak.

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On a Conjecture of Chowla and Milnor

Gun

Murty

Rath

2011

Can. j. math.

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Abstract. In this paper, we investigate a conjecture due to S. and P. Chowla and its generalization by Milnor. These are related to the delicate question of non-vanishing of L-functions associated to periodic functions at integers greater than 1. We report on some progress in relation to these conjectures. In a different vein, we link them to a conjecture of Zagier on multiple zeta values and also to linear independence of polylogarithms.

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Linear independence of digamma function and a variant of a conjecture of Rohrlich

Gun

Murty

Rath

2009

Journal of Number Theory

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Transcendence of the log gamma function and some discrete periods

Gun¹,

Murty²,

Rath³

2009

Journal of Number Theory

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We study transcendental values of the logarithm of the gamma function. For instance, we show that for any rational number xtranscendental with at most one possible exception. Assuming Schanuel's conjecture, this possible exception can be ruled out. Further, we derive a variety of results on the Γ -function as well as the transcendence of certain series of the form ∞ n=1 P (n)/Q (n), where P (x) and Q (x) are polynomials with algebraic coefficients.

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Sanoli Gun

Transcendental values of certain Eichler integrals

On zeros of quasi-modular forms

On a Conjecture of Chowla and Milnor

Linear independence of digamma function and a variant of a conjecture of Rohrlich

Transcendence of the log gamma function and some discrete periods

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