The Special Function {W_{m,n}\left(x\right)}


1. Differential Equation[-]

The function {W_{m,n}\left(x\right)} satisfies the differential equation
All formulas on this page are valid under the condition that 2\,n is not an integer (special values for parameters can be entered at the bottom).

2. Derivative in Terms of Lower-Order Derivatives[+]

3. Expansion at 0[+]

4. Local Expansions at Singularities and at Infinity[-]

The differential equation above has 0 non-zero finite singular pointsA complex numberĀ z_0 is a singular point (or singularity of a linear ordinary differential equation with polynomial coefficients, if the leading coefficient of the equation vanishes atĀ z_0..

4.1. Expansion at \infty [+]

5. Hypergeometric Representation[+]

6. Parameters[-]

The Whittaker function {W_{m,n}\left(x\right)} depends on the parameters m and n. The boxes below can be used to rename or instantiate these parameters.
p1 =  p2 =