AbstractThe theory of complex variables is used to develop exact closed-form solutions of the transcendental equation x coth x = α x2 + 1. The parameter α is considered to be real, and the reported analysis yields analytical expressions, in terms of elementary quadratures, for the real solutions x, as they depend on prescribed values of α
AbstractLet β and γ be complex numbers and let h(z) be regular in the unit disc U. This article stud...
AbstractAn explicit representation is derived for the continuation across an analytic boundary of th...
L'équation de Weinstein est une équation régissant les Potentiels à Symétrie Axiale (PSA) qui est Lm...
AbstractBy means of the theory of complex variables, the solutions of z exp z = a, where a is in gen...
AbstractThe theory of complex variables is used to develop exact closed-form solutions of the transc...
AbstractThe theory of complex variables is used to develop exact closed-form solutions for the, in g...
AbstractThe theory of complex variables is used to develop exact closed-form solutions for the, in g...
AbstractThis note deals with the problem of determining the roots of simple algebrac equations by co...
AbstractBy means of the theory of complex variables, the solutions of z exp z = a, where a is in gen...
Origin and History of the Problem: The science of algebra arose In its effort to solve equations. Si...
Real equations of the form g(x,λ) = 0 are shown to have a complex extension G(u,λ) = 0, defined on t...
AbstractThe problem of finding the exact analytical closed-form solution of some families of transce...
Students of elementary complex analysis usually begin by seeing the derivation of the Cauchy--Rieman...
AbstractA general method for the analytical determination (through closed-form integral formulae) of...
AbstractIn this paper we examine via Topological Transversality ordinary differential equations in t...
AbstractLet β and γ be complex numbers and let h(z) be regular in the unit disc U. This article stud...
AbstractAn explicit representation is derived for the continuation across an analytic boundary of th...
L'équation de Weinstein est une équation régissant les Potentiels à Symétrie Axiale (PSA) qui est Lm...
AbstractBy means of the theory of complex variables, the solutions of z exp z = a, where a is in gen...
AbstractThe theory of complex variables is used to develop exact closed-form solutions of the transc...
AbstractThe theory of complex variables is used to develop exact closed-form solutions for the, in g...
AbstractThe theory of complex variables is used to develop exact closed-form solutions for the, in g...
AbstractThis note deals with the problem of determining the roots of simple algebrac equations by co...
AbstractBy means of the theory of complex variables, the solutions of z exp z = a, where a is in gen...
Origin and History of the Problem: The science of algebra arose In its effort to solve equations. Si...
Real equations of the form g(x,λ) = 0 are shown to have a complex extension G(u,λ) = 0, defined on t...
AbstractThe problem of finding the exact analytical closed-form solution of some families of transce...
Students of elementary complex analysis usually begin by seeing the derivation of the Cauchy--Rieman...
AbstractA general method for the analytical determination (through closed-form integral formulae) of...
AbstractIn this paper we examine via Topological Transversality ordinary differential equations in t...
AbstractLet β and γ be complex numbers and let h(z) be regular in the unit disc U. This article stud...
AbstractAn explicit representation is derived for the continuation across an analytic boundary of th...
L'équation de Weinstein est une équation régissant les Potentiels à Symétrie Axiale (PSA) qui est Lm...
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