Add to ORKG10 pagesInternational audienceRamanujan sums are exponential sums with exponent defined over the irreducible fractions. Until now, they have been used to provide converging expansions to some arithmetical functions appearing in the context of number theory. In this paper, we provide an application of Ramanujan sum expansions to periodic, quasiperiodic and complex time series, as a vital alternative to the Fourier transform. The Ramanujan-Fourier spectrum of the Dow Jones index over 13 years and of the coronal index of solar activity over 69 years are taken as illustrative examples. Distinct long periods may be discriminated in place of the 1/fα spectra of the Fourier transform
It is well-known that the Ramanujan-sum c_q(n) has applications in the analysis of periodicity in se...
It is well-known that the Ramanujan-sum c_q(n) has applications in the analysis of periodicity in se...
It is well-known that the Ramanujan-sum c_q(n) has applications in the analysis of periodicity in se...
"An aperiodic (low-frequency) spectrum may originate from the error term in the mean value of an ari...
The famous mathematician S. Ramanujan introduced a summation in 1918, now known as the Ramanujan sum...
The Ramanujan sum c_q(n) has been used by mathematicians to derive many important infinite series ex...
In the year 1918, the Indian mathematician Srinivasa Ramanujan proposed a set of sequences called Ra...
The mathematician Ramanujan introduced a summation in 1918, now known as the Ramanujan sum c_q(n). I...
Ramanujan sums have in the past been used to represent arithmetic sequences. It is shown here that f...
Ramanujan sums have in the past been used to represent arithmetic sequences. It is shown here that f...
Ramanujan-sums have in the past been used to extract hidden periods. In a recent paper it was shown ...
Ramanujan-sums have in the past been used to extract hidden periods. In a recent paper it was shown ...
Ramanujan-sums have in the past been used to extract hidden periods. In a recent paper it was shown ...
Ramanujan-sums have in the past been used to extract hidden periods. In a recent paper it was shown ...
International audienceThe Doppler spectrum estimation of a weather radar signal in a classic way can...
It is well-known that the Ramanujan-sum c_q(n) has applications in the analysis of periodicity in se...
It is well-known that the Ramanujan-sum c_q(n) has applications in the analysis of periodicity in se...
It is well-known that the Ramanujan-sum c_q(n) has applications in the analysis of periodicity in se...
"An aperiodic (low-frequency) spectrum may originate from the error term in the mean value of an ari...
The famous mathematician S. Ramanujan introduced a summation in 1918, now known as the Ramanujan sum...
The Ramanujan sum c_q(n) has been used by mathematicians to derive many important infinite series ex...
In the year 1918, the Indian mathematician Srinivasa Ramanujan proposed a set of sequences called Ra...
The mathematician Ramanujan introduced a summation in 1918, now known as the Ramanujan sum c_q(n). I...
Ramanujan sums have in the past been used to represent arithmetic sequences. It is shown here that f...
Ramanujan sums have in the past been used to represent arithmetic sequences. It is shown here that f...
Ramanujan-sums have in the past been used to extract hidden periods. In a recent paper it was shown ...
Ramanujan-sums have in the past been used to extract hidden periods. In a recent paper it was shown ...
Ramanujan-sums have in the past been used to extract hidden periods. In a recent paper it was shown ...
Ramanujan-sums have in the past been used to extract hidden periods. In a recent paper it was shown ...
International audienceThe Doppler spectrum estimation of a weather radar signal in a classic way can...
It is well-known that the Ramanujan-sum c_q(n) has applications in the analysis of periodicity in se...
It is well-known that the Ramanujan-sum c_q(n) has applications in the analysis of periodicity in se...
It is well-known that the Ramanujan-sum c_q(n) has applications in the analysis of periodicity in se...