Jean-Francis Loiseau scite author profile

Jean-Francis Loiseau

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8Citation Statements Received

13Citation Statements Given

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Hyperelliptic integrals and multiple hypergeometric series

Loiseau¹,

Codaccioni²,

Caboz³

1988

Math. Comp.

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Abstract.We consider the complete hyperelliptic integral Using a recent result concerning the Taylor expansion of the 6-Dirac function, we write J(a) as a power series of a parameter involving a and the Ajt's.We prove this series to be a sum of multiple hypergeometric series which reduces to a single term when the number of odd monomial terms in Pn is less than or equal to one. The region of convergence is then studied and a few particular cases are detailed.

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Hyperelliptic Integrals and Multiple Hypergeometric Series

Loiseau¹,

Codaccioni²,

Caboz³

1988

Mathematics of Computation

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Incomplete hyperelliptic integrals and hypergeometric series

Loiseau¹,

Codaccioni²,

Caboz³

1989

Math. Comp.

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We consider the incomplete hyperelliptic integral \[ H ( a , X ) = ∫ 0 X d x a − λ 2 x 2 − λ n x n H(a,X) = \int _0^X {\frac {{dx}}{{\sqrt {a - {\lambda _2}{x^2} - {\lambda _n}{x^n}} }}} \] with a > 0 a > 0 , λ 2 > 0 {\lambda _2} > 0 , n > 2 n > 2 , where X belongs to the connected component of { x | λ 2 x 2 + λ n x n > a } \{ x|{\lambda _2}{x^2} + {\lambda _n}{x^n} > a\} containing the origin. Continuing previous work on the complete hyperelliptic integral, we express in this paper H ( a , X ) H(a,X) as a convergent series of hypergeometric type. A brief survey of some applications to algebraic equations and mechanics is then given.

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