AbstractRecurrence relations for the Fourier expansion of the Jacobian elliptic functions snm(u, k), cnm(u, k), dnm(u, k) with m⩾1 and those for the expansion of sinm(πx), cosm(πx) in powers of the Jacobian elliptic functions with m⩾1 are studied and their parallel evaluation is formulated using nested recurrent product form algorithm
AbstractLetf(qτ, qz)=∑n, rc(n, r)qnτqrzbe a power series whose coefficients satisfy a particular per...
This thesis presents some new identities between Ramanujan's arithmetical function r(n) and the divi...
AbstractThe relation connecting the symmetric elliptic integral RF with the Jacobian elliptic functi...
Recurrence relations for the Fourier expansion of the Jacobian elliptic functions snm(u, k), cnm(u, ...
AbstractRecurrence relations for the Fourier expansion of the Jacobian elliptic functions snm(u, k),...
AbstractWe construct fast algorithms for evaluating transforms associated with families of functions...
AbstractVarious properties of Jacobian elliptic functions can be put in a form that remains valid un...
We use the Z-transform to solve a type of recurrence relation satisfied by the number of representat...
We solve the general case of the finite-summation-of-integer-powers problem Sp(N) = PN k=1 kp for ar...
In this paper we derive some recurrence formulae which can be used to calculate the Fourier expansio...
AbstractAn algorithmic approach is given to construct recurrence relations for the coefficients of t...
AbstractRecurrence relations are given for the Jacobi series coefficients of functions which satisfy...
Application of recurrence relations in mathematics and computer science is very widely used. To solv...
4 pages, no figures.-- MSC2000 codes: 33C15, 33F05, 40A15.-- Running title: "Recurrences and continu...
The aim of this paper is to obtain some new recurrence relations for the “modified” Jacobi functions...
AbstractLetf(qτ, qz)=∑n, rc(n, r)qnτqrzbe a power series whose coefficients satisfy a particular per...
This thesis presents some new identities between Ramanujan's arithmetical function r(n) and the divi...
AbstractThe relation connecting the symmetric elliptic integral RF with the Jacobian elliptic functi...
Recurrence relations for the Fourier expansion of the Jacobian elliptic functions snm(u, k), cnm(u, ...
AbstractRecurrence relations for the Fourier expansion of the Jacobian elliptic functions snm(u, k),...
AbstractWe construct fast algorithms for evaluating transforms associated with families of functions...
AbstractVarious properties of Jacobian elliptic functions can be put in a form that remains valid un...
We use the Z-transform to solve a type of recurrence relation satisfied by the number of representat...
We solve the general case of the finite-summation-of-integer-powers problem Sp(N) = PN k=1 kp for ar...
In this paper we derive some recurrence formulae which can be used to calculate the Fourier expansio...
AbstractAn algorithmic approach is given to construct recurrence relations for the coefficients of t...
AbstractRecurrence relations are given for the Jacobi series coefficients of functions which satisfy...
Application of recurrence relations in mathematics and computer science is very widely used. To solv...
4 pages, no figures.-- MSC2000 codes: 33C15, 33F05, 40A15.-- Running title: "Recurrences and continu...
The aim of this paper is to obtain some new recurrence relations for the “modified” Jacobi functions...
AbstractLetf(qτ, qz)=∑n, rc(n, r)qnτqrzbe a power series whose coefficients satisfy a particular per...
This thesis presents some new identities between Ramanujan's arithmetical function r(n) and the divi...
AbstractThe relation connecting the symmetric elliptic integral RF with the Jacobian elliptic functi...
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