Add to ORKGThe solutions of the algebraic equation $y^+xy^-1=0$ with $n>p$ and $m\geq 2$ satisfy a generalized hypergeometric differential equation with imprimitive finite irreducible monodromy group. Thanks to this fact, we can determine the monodromy group and the Schwarz map of the differential equation
In the first three chapters of this dissertation we give an introduction to the theory of ordinary l...
In the first three chapters of this dissertation we give an introduction to the theory of ordinary l...
The development of new methods for the algebraic property investigation of linear differential equat...
The study of hypergeometric functions started in 1813 with a paper by Gauss. Hypergeometric function...
The study of hypergeometric functions started in 1813 with a paper by Gauss. Hypergeometric function...
There are infinitely many generalized hypergeometric differential equations _3E_2(a_0, a_1, a_2; b_1...
Hypergeometric equations with a dihedral monodromy group can be solved in terms of elementary functi...
The generalized hypergeometric function $ _3 F_2(a_0, a_1, a_2; b_1, b_2; z) $ satisfies the Fuchsia...
We consider two specific monodromy representations on the space of solutions of the generalized hype...
Let _3E_2(a_1, a_2, a_3; b_1, b_2) denote the generalized hypergeometric differential equation of ra...
Consideration of the monodromy group of the hypergeometric equation z(1−z)w″+[γ−(1+α+β)z]w′−αβw=0, i...
Iteration of the covariant function for Gauss hypergeometric differential equation Yuzen Tanaka Abst...
Hypergeometric functions started out as generalizations of classical elementary functions like the s...
Using Mellin-Barnes integrals we give a method to compute elements of the monodromy group of an A-hy...
Using Mellin-Barnes integrals we give a method to compute elements of the monodromy group of an A-hy...
In the first three chapters of this dissertation we give an introduction to the theory of ordinary l...
In the first three chapters of this dissertation we give an introduction to the theory of ordinary l...
The development of new methods for the algebraic property investigation of linear differential equat...
The study of hypergeometric functions started in 1813 with a paper by Gauss. Hypergeometric function...
The study of hypergeometric functions started in 1813 with a paper by Gauss. Hypergeometric function...
There are infinitely many generalized hypergeometric differential equations _3E_2(a_0, a_1, a_2; b_1...
Hypergeometric equations with a dihedral monodromy group can be solved in terms of elementary functi...
The generalized hypergeometric function $ _3 F_2(a_0, a_1, a_2; b_1, b_2; z) $ satisfies the Fuchsia...
We consider two specific monodromy representations on the space of solutions of the generalized hype...
Let _3E_2(a_1, a_2, a_3; b_1, b_2) denote the generalized hypergeometric differential equation of ra...
Consideration of the monodromy group of the hypergeometric equation z(1−z)w″+[γ−(1+α+β)z]w′−αβw=0, i...
Iteration of the covariant function for Gauss hypergeometric differential equation Yuzen Tanaka Abst...
Hypergeometric functions started out as generalizations of classical elementary functions like the s...
Using Mellin-Barnes integrals we give a method to compute elements of the monodromy group of an A-hy...
Using Mellin-Barnes integrals we give a method to compute elements of the monodromy group of an A-hy...
In the first three chapters of this dissertation we give an introduction to the theory of ordinary l...
In the first three chapters of this dissertation we give an introduction to the theory of ordinary l...
The development of new methods for the algebraic property investigation of linear differential equat...