What is the airy stress function?

As a mechanical engineer with a focus on structural analysis, I am often involved in the study of stress and strain within materials, particularly in the context of two-dimensional problems. In this field, the Airy stress function is a fundamental concept.

The Airy stress function, denoted as \( \phi(x, y) \), is a scalar potential function that is used to determine the stress distribution within a body under the assumption of two-dimensional stress or strain conditions, also known as plane stress or plane strain. This function is particularly useful in solving problems where the body forces are negligible, meaning that the equilibrium of the body is not influenced by forces that are proportional to the volume of the material.

The significance of the Airy stress function lies in its ability to simplify the complex equations of equilibrium and compatibility that arise in the study of solid mechanics. By introducing the Airy stress function, one can transform these equations into a form that is more amenable to analytical or numerical solutions.

To understand the Airy stress function, it is important to recognize that it must satisfy the equilibrium equations in the absence of body forces. These equations, which are derived from Newton's second law, state that the sum of forces and moments in any part of the material must be zero. Mathematically, for a two-dimensional case, the equilibrium equations can be expressed as:

\[
\frac{\partial \sigma_{xx}}{\partial x} + \frac{\partial \sigma_{xy}}{\partial y} = 0 \\
\frac{\partial \sigma_{xy}}{\partial x} + \frac{\partial \sigma_{yy}}{\partial y} = 0
\]

where \( \sigma_{xx} \) and \( \sigma_{yy} \) are the normal stresses in the x and y directions, respectively, and \( \sigma_{xy} \) is the shear stress.

The Airy stress function is related to the stresses through the following relationships:

\[
\sigma_{xx} = \frac{\partial^2 \phi}{\partial y^2} \\
\sigma_{yy} = -\frac{\partial^2 \phi}{\partial x^2} \\
\sigma_{xy} = -\frac{\partial^2 \phi}{\partial x \partial y}
\]

These relationships allow us to express the stresses in terms of the second derivatives of the Airy stress function. By doing so, we can often reduce the problem of finding the stress distribution to solving a single partial differential equation for \( \phi \), which is typically easier to handle.

The use of the Airy stress function is not limited to academic problems; it has practical applications in various engineering fields. For instance, it can be used to analyze the stress distribution in beams, plates, and shells, which are common components in many structures. It is also used in the design of pressure vessels and other components subjected to internal or external pressures.

In summary, the Airy stress function is a powerful tool in the field of solid mechanics for solving two-dimensional stress problems. It simplifies the process of finding stress distributions by transforming the equilibrium and compatibility equations into a more manageable form. This function is a cornerstone in the analysis of many structural components and is an essential concept for any engineer or scientist working in the field of materials science and engineering.

Definition[edit] The Airy stress function ( ): Scalar potential function that can be used to find the stress. Satisfies equilibrium in the absence of body forces. Only for two-dimensional problems (plane stress/plane strain).Nov 18, 2017