A generalized Young’s equation for contact angles of droplets on homogeneous and rough substrates

Abstract: Using Gibbs' method of dividing surfaces, the contact angle of a drop on a flat homogeneous rough non-deformable solid substrate is investigated. For this system, a new generalized Young's equation for the contact angle, including the influences of line tension and which valid for any dividing surface between liquid phase and vapor phase is derived. Under some assumptions, this generalized Young's equation reduces to the Wenzel's equation or Rosanov's equation valid for the surface of tension.

“…The liquid-vapor surface tension is denoted by σ, and the intrinsic line tension is denoted by τ . Since, we consider a nonvolatile liquid droplet, we use Helmholtz free energy instead of the Gibbs or grand potential free energy [22,[24][25][26]. Therefore, the problem of dividing surface of liquid-vapor interface [3,22,25] and the Kondo equation [24,25] for the Laplace pressure will not be considered explicitly.…”

“…By decomposing the free energy of a droplet on a solid substrate into volume, interfacial, and line contributions, we can theoretically determine the intrinsic line tension. Since the liquid-vapor surface is curved and interfacial zone is diffuse, there is a conceptual problem of dividing surface [3,22,[24][25][26]. Therefore, instead of directly analyzing a cap-shaped droplet with a finite base radius and a spherical meniscus, a liquid wedge with a flat meniscus, which corresponds to the limit of infinite base radius, is usually considered.…”

A generalized Young's equation to bridge a gap between the experimentally measured and the theoretically calculated line tensions

“…The liquid-vapor surface tension is denoted by σ, and the intrinsic line tension is denoted by τ . Since, we consider a nonvolatile liquid droplet, we use Helmholtz free energy instead of the Gibbs or grand potential free energy [22,[24][25][26]. Therefore, the problem of dividing surface of liquid-vapor interface [3,22,25] and the Kondo equation [24,25] for the Laplace pressure will not be considered explicitly.…”

“…By decomposing the free energy of a droplet on a solid substrate into volume, interfacial, and line contributions, we can theoretically determine the intrinsic line tension. Since the liquid-vapor surface is curved and interfacial zone is diffuse, there is a conceptual problem of dividing surface [3,22,[24][25][26]. Therefore, instead of directly analyzing a cap-shaped droplet with a finite base radius and a spherical meniscus, a liquid wedge with a flat meniscus, which corresponds to the limit of infinite base radius, is usually considered.…”

A generalized Young's equation to bridge a gap between the experimentally measured and the theoretically calculated line tensions

“…With the contact surface assumed absolutely smooth, stiff, homogenous and inert (i.e., an ideal surface), the relation between contact angle and interfacial tension of a droplet was firstly described by Young's equation [14,15]. Further, whilst the Wenzel equation determined the contact angles on a rough surface for homogeneous wetting regime [16], the Cassie-Baxter equation developed the theories for heterogeneous wetting regime (e.g., porous contact surface) [17].…”

Determination of contact angle of droplet on convex and concave spherical surfaces

“…Now, Equation (1.1) is called the Young's equation. The Young's equation Equation (1.1) is widely applied to macroscopic capillary phenomena (Pfleging & Proella, 2014;Xiao-Song et al, 2014).…”

Derivation of Generalized Young’s Equation for Wetting of Cylindrical Droplets on Rough Solid Surface