Exact solution to a class of functional difference equations with application to a moving contact line flow
From MaRDI portal
Publication:4303185
DOI10.1017/S0956792500001364zbMath0934.39005OpenAlexW2132395461MaRDI QIDQ4303185
No author found.
Publication date: 26 April 2000
Published in: European Journal of Applied Mathematics (Search for Journal in Brave)
Full work available at URL: https://doi.org/10.1017/s0956792500001364
Gamma, beta and polygamma functions (33B15) Additive difference equations (39A10) Jets and cavities, cavitation, free-streamline theory, water-entry problems, airfoil and hydrofoil theory, sloshing (76B10)
Related Items (15)
Eigenoscillations in an angular domain and spectral properties of functional equations ⋮ Blob formation ⋮ On the Barnes double gamma function ⋮ Eigenoscillations of a fluid in a canonical domain and functional difference equations ⋮ Fluctuations of stable processes and exponential functionals of hypergeometric Lévy processes ⋮ On a class of functional difference equations: explicit solutions, asymptotic behavior and applications ⋮ Functional difference equations in the problem on the forced oscillations of a fluid in an infinite pool with conical bottom ⋮ On the law of homogeneous stable functionals ⋮ The log-Lévy moment problem via Berg–Urbanik semigroups ⋮ Self-similar recoil of inviscid drops ⋮ Functional difference equations and eigenfunctions of a Schrödinger operator with δ ′ −interaction on a circular conical surface ⋮ On extrema of stable processes ⋮ Eigenmodes in the water-wave problems for infinite pools with cone-shaped bottom ⋮ Instability of a vortex sheet leaving a right-angled wedge ⋮ A review of conjectured laws of total mass of Bacry–Muzy GMC measures on the interval and circle and their applications
Cites Work
- Unnamed Item
- Far Field Asymptotics of the Two-Dimensional Linearised Sloping Beach Problem
- A NOTE ON GENERALIZED EDGE WAVES ON A SLOPING BEACH
- Short waves parallel to the shore over a sloping beach
- Diffraction of an E -polarized plane wave by an imperfectly conducting wedge
- MOVING CONTACT LINES IN SLENDER FLUID WEDGES
- SURFACE-TENSION-DRIVEN FLOW IN A WEDGE
- Polynomial approximation of Maliuzhinets' function
- Surface Tension Driven Flows
- SINGULARITIES AT FLOW SEPARATION POINTS
- Water waves over sloping beaches and the solution of a mixed boundary value problem for δ2ø−k2ø = 0 in a sector
- Water waves on sloping beaches
- ON THE DIFFUSION OF LOAD FROM A STIFFENER INTO A SHEET
This page was built for publication: Exact solution to a class of functional difference equations with application to a moving contact line flow
