Weber's Inhomogeneous Differential Equation with Initial and Boundary Conditions

“…Furthermore, we shall extend the definition of N W (a, x) and NW (a, x) to complex argument x = z (say). We shall demonstrate that NW (a, z) → 0 as z → ∞ for | arg(z) ≤ 1 2 π − δ (δ > 0), and also as a → ∞ uniformly in part of the right half plane that contains {z : (z) ≥ 2 √ a}. In contrast, all other solutions of (1.2) are exponentially large as z → ∞, and also as a → ∞, in at least three of the four quadrants.…”

“…In [1] series solutions for N W (a, x) for small x were derived, and various other representations were derived in the above references.…”

“…In [1] the authors state "The current work involves real arguments of the Weber functions. In the general analysis of Weber equation and associated functions with complex arguments, the introduction of a Nield-Kuznetsov type function is still challenging and requires further consideration."…”

Nield-Kuznetsov functions and Laplace transforms of parabolic cylinder functions

“…Furthermore, we shall extend the definition of N W (a, x) and NW (a, x) to complex argument x = z (say). We shall demonstrate that NW (a, z) → 0 as z → ∞ for | arg(z) ≤ 1 2 π − δ (δ > 0), and also as a → ∞ uniformly in part of the right half plane that contains {z : (z) ≥ 2 √ a}. In contrast, all other solutions of (1.2) are exponentially large as z → ∞, and also as a → ∞, in at least three of the four quadrants.…”

“…In [1] series solutions for N W (a, x) for small x were derived, and various other representations were derived in the above references.…”

“…In [1] the authors state "The current work involves real arguments of the Weber functions. In the general analysis of Weber equation and associated functions with complex arguments, the introduction of a Nield-Kuznetsov type function is still challenging and requires further consideration."…”

Nield-Kuznetsov functions and Laplace transforms of parabolic cylinder functions

“…Computations of solution to (1) when the forcing function ) ( y f is a constant function of the independent variable have been obtained by Abu Zaytoon et al [6], who used computational procedures outlined in Gil et al, [5] to obtain solutions to initial and boundary value problems involving (1) with a constant forcing function f(y). In the work of Alzahrani et al [1], general solutions to the inhomogeneous equation (1) were expressed in terms of the parametric Nield-Kuznetsov integral functions of the first and second kinds, valid for constant and variable forcing functions, respectively.…”

http://www.theijes.com/papers/vol6-issue3/A0603010108.pdf

“…See also [2] for further properties in connection with physical applications. Solutions of the inhomogeneous Weber equation (1.2) play a role in the study of flow through porous layers [1], [14].…”

Uniform asymptotic expansions for solutions of the parabolic cylinder and Weber equations