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Authors
Affiliations
1 Department of Mathematics, Madurai Kamar University, Madurai-625021, IN
Source
The Journal of the Indian Mathematical Society, Vol 54, No 1-4 (1989), Pagination: 85-94
Abstract
Let us denote by R(x) the Ramanujan function given by R(x) = e-πx2 Sech x.
R(x) belongs to L1(R) and Ramanujan himself has calculated Its Fourier Transfonn and several definite integrals connected with R(x) in [I] and [2].