AbstractWe discuss the numerical computation of the cosine lemniscate function and its inverse, the lemniscate integral. These were previously studied by Bernoulli, Euler, Gauss, Abel, Jacobi and Ramanujan. We review general elliptic formulas for this special case and provide some novelties. We show that a Fourier series by Ramanujan converges twice as fast as the standard elliptic cosine Fourier series specialized to this case. The so-called imbricate series, however, converges geometrically fast over the entire complex plane. We derive two new expansions. The rational-plus-Fourier series converges much faster than Ramanujan’s: for real z: each term is asymptotically 12,400 times smaller than its immediate predecessor: coslem(z)=4B{q(1−q)c...
The focus of the first part of the thesis commences with an examination of two pages in Ramanujan's...
AbstractAn elementary proof is given of the Hasse-Weil theorem about the number of solutions of the ...
AbstractThe accurate and efficient computation of the special functions Gk(x) is discussed, whereGk(...
AbstractWe discuss the numerical computation of the cosine lemniscate function and its inverse, the ...
AbstractIn the unorganized portions of his second notebook, Ramanujan states without proofs 10 inver...
AbstractRecently, B. C. Berndt, S. Bhargava and F. Garvan provided the first proof to an identity of...
AbstractLaplace's method is one of the best-known techniques in the asymptotic approximation of inte...
AbstractOne method of obtaining near minimax polynomial approximation to f ∈ C(n + 1)[−1, 1] is to c...
A class of hyperelliptic integrals are expressed through hypergeometric functions, like those of Gau...
This little article is an attempt to kindle the reader’s interest in some modern research in the dom...
In the paper, by virtue of expansions of two finite products of finitely many square sums, with the ...
Since Abel’s original paper of 1827, his remarkable theorem on the constructibilityof the lemniscate...
We establish a generalization of Jacobi's elegantissima, which solves the pendulum equation. This am...
AbstractTextA class of hyperelliptic integrals are expressed through hypergeometric functions, like ...
AbstractLet ƒn(z) be the sum of precisely those terms of the Mittag-Leffler expansion of ƒ(z) = π cs...
The focus of the first part of the thesis commences with an examination of two pages in Ramanujan's...
AbstractAn elementary proof is given of the Hasse-Weil theorem about the number of solutions of the ...
AbstractThe accurate and efficient computation of the special functions Gk(x) is discussed, whereGk(...
AbstractWe discuss the numerical computation of the cosine lemniscate function and its inverse, the ...
AbstractIn the unorganized portions of his second notebook, Ramanujan states without proofs 10 inver...
AbstractRecently, B. C. Berndt, S. Bhargava and F. Garvan provided the first proof to an identity of...
AbstractLaplace's method is one of the best-known techniques in the asymptotic approximation of inte...
AbstractOne method of obtaining near minimax polynomial approximation to f ∈ C(n + 1)[−1, 1] is to c...
A class of hyperelliptic integrals are expressed through hypergeometric functions, like those of Gau...
This little article is an attempt to kindle the reader’s interest in some modern research in the dom...
In the paper, by virtue of expansions of two finite products of finitely many square sums, with the ...
Since Abel’s original paper of 1827, his remarkable theorem on the constructibilityof the lemniscate...
We establish a generalization of Jacobi's elegantissima, which solves the pendulum equation. This am...
AbstractTextA class of hyperelliptic integrals are expressed through hypergeometric functions, like ...
AbstractLet ƒn(z) be the sum of precisely those terms of the Mittag-Leffler expansion of ƒ(z) = π cs...
The focus of the first part of the thesis commences with an examination of two pages in Ramanujan's...
AbstractAn elementary proof is given of the Hasse-Weil theorem about the number of solutions of the ...
AbstractThe accurate and efficient computation of the special functions Gk(x) is discussed, whereGk(...