Generalization of Some of Nishimoto′s Differential Equations-2-
スポンサーリンク
概要
著者
関連論文
- N-Fractional Calculus of Some Irrational Functions (Study on Non-Analytic and Univalent Functions and Applications)
- On the solutions of an extended Chebyshev's Equations (Extensions of the historical calculus transforms in the geometric function theory)
- Solutions to The Homogeneous Associated Laguerre's Equation by Means of N-Fractional Calculus Operator (Extensions of the historical calculus transforms in the geometric function theory)
- Production of Some Fractional Differintegral Equations in N-Fractional Calculus (Extensions of the historical calculus transforms in the geometric function theory)
- N-Fractional Calculus Operator Method to Some Second Order homogeneous Euler's Equation (Applications of convolutions in geometric function theory)
- N-Fractional Calculus of Some Logarithmic Functions and Some Identities (Applications of convolutions in geometric function theory)
- Solutions to The Nonhomogeneous Associated Laguerre's Equaiton by Means of N-Fractional Calculus Operator (Applications of convolutions in geometric function theory)
- N- Fractional Calculus and $n(\in Z^+)th$ Derivatives of Some Logarithmic Functions (Study on Non-Analytic and Univalent Functions and Applications)
- Some Doubly Infinite Mixed Infinite Sums derived from The N-Fractional Calculus of A Logarithmic Function(With Some Examinations) (単葉関数論における係数不等式とその周辺 短期共同研究報告集)
- Some Doubly Infinite, Finite and Mixed Infinite Sums derived from the N-Fractional Calculus of A Power Function(With Some Examinations) (単葉関数論における係数不等式とその周辺 短期共同研究報告集)
- Some Infinite (Singly, Doubly and Triply) Sums (Study on Applications for Fractional Calculus Operators in Univalent Function Theory)
- Solutions to a Nearly Simple Harmonic Vibration Equation by Means of N-Fractional Calculus (Study on Applications for Fractional Calculus Operators in Univalent Function Theory)
- Some Topics in N- Fractional Calculus (Study on Differential Operators and Integral Operators in Univalent Function Theory)
- On Nishimoto's Fractional Calculus ( Operator $N^\nu$, Inverse of Nishimoto's Transformation and some Applications )
- Fractional Calculus Method to a Generalized Linear Second Order (Nonhomogeneous and Homogeneous) Ordinary Differential Equation of Fuchs Type
- On the Infinite Sums 〓(n-1)!2n-1/〓(2k+3) and 〓(n-1)!(n+1)2n-1/〓(2k+3)--A serendipity in franctional calculus
- On Infinite Sum Rm,β=(-1)m〓(-1)k・(m+k-1)!/(m-1)!k・Г(-m-k-β)/Г(-β)--Serendipity in Fractional Calculus
- Generalization of Some of Nishimoto′s Differential Equations-2-
- Generalization of Some of Nishimoto′s Differential Equations-1-
- Fractional Calculus Method to a Fourth Order Linear Ordinary Differential Equation of Fuchs Type
- Solutions to The Nonhomogeneous Chebyshev's Equation by Means of N-Fractional Calculus Operator (Conditions for Univalency of Functions and Applications)
- Solutions to The Homogeneous Chebyshev's Equation by Means of N-Fractional Calculus Operator (Conditions for Univalency of Functions and Applications)
- An Application of Franctional Calculus to a Partial Differential Equation of the Second Order
- The Solutions to The Radial Schrodinger Equation of The Hydrogen Atom by Means of N-Fractional Calculus Operator (On Schwarzian Derivatives and Its Applications)
- Solutions to Some Homogeneous Special Ordinary Differential Equation by Means of N-Fractional Calculus Operator (On Schwarzian Derivatives and Its Applications)
- Fractional Calculus : Generalized Integral and Derivative (On Fractional Calculus and Its Applications)
- N-Fractional Calculus of the Function $f(z)=\log((z-b)^3-c)$ and Identities (Some inequalities concerned with the geometric function theory)