Approximate analytic solution of the potential flow around a rectangle

TL;DR

This paper introduces an approximate analytic method for solving potential flow around a rectangle, enhancing understanding of multipolar expansion and regression analysis in physics education.

Contribution

It presents a novel approach to approximate potential flow around a rectangle using discretization and linear regression, extending the classic circular cylinder problem.

Findings

Approximate solution obtained via discretization and regression.

Deepens understanding of multipoles and regression in physics.

Provides an advanced problem for educational purposes.

Abstract

In undergraduate classes, the potential flow that goes around a circular cylinder is designed for complemental understanding of mathematical technique to handle the Laplace equation with Neumann boundary conditions and the physical concept of the multipolar expansion. The simplicity of the standard problem is suited for the introductory level, however, it has a drawback. The discussion of higher order multipoles is often missed because the exact analytic solution contains only the dipole term. In this article, we present a modified problem of the potential flow around a rectangle as an advanced problem. Although the exact solution of this case is intractable, the approximate solution can be obtained by the discretization and the optimization using multiple linear regression. The suggested problem is expected to deepen the students' insight on the concept of multipoles and also provides an opportunity to discuss the formalism of the regression analysis, which in many physics curricula is lacking even though it has a significant importance in experimental physics.