Island Mathematics

21.1 INTRODUCTION

21.1.1 Modeling Spectacle Island’s Topography

We are on spectacle island, near the Boston Harbor and decide to understand the function which gives the height at a position . The island has once been an "out of sight, out of mind" place occupied by a horse rendering plant (morphing horses to leather and fertilizers) and (related) a grease reclamation facility and a garbage disposal area. Barf! In the 1960ies, there came a renewal, to clean up the island and reclaim and reshape the island into a public park. It has now miles of trails and fine beaches. The island has become an example of how to recreate a sustainable open space.

21.1.2 Optimizing Island Coastlines with Calculus

When we were looking for maxima and minima this week, we were not concerned so much how many critical points there are or which combinations of critical points can occur. It turns out this is a very exciting topic. An other theme we can explore while vising an island is to look at the relation between its area and its circumference (the length of the beaches). If the area is fixed, how short or how long can the total beach area become? It turns out that this is an infinite dimensional Lagrange problem but we can explore this also in finite dimensions when looking at polygonal island. We use the topic here to explore a bit some related areas to calculus.

21.2 MAXIMIZING AREA

21.2.1 The Isoperimetric Problem: Islands and Optimal Shapes

An "island" a region in the plane which is bound by a simple closed curve which is continuous everywhere and differentiable everywhere except at a finite set of points. We allow for exceptions for continuity to allow simple polygons. Which island does have the maximal area if the length of the boundary is fixed? This is called the isoperimetric problem. If we look at the problem restricted to polygons with a fixed number of vertices, we have a nice finite dimensional Lagrange problem.

21.2.2 Triangle’s Max Area

Let us look at a triangular island with vertices , , .

21.2.3 Exploring the Locus of Points with a Fixed Distance Sum

Here is a related problem from good old Euclidean geometry. If you should not know, look up "string method pins".

21.2.4 Connecting Triangles and Regular Polygons

Solving the problem to find the -gon with maximal area is a messy Lagrange problem. It can be done by a computer but there is a more elegant way:

21.2.5 Reflecting the Way

You are on a treasure island and have two locations , in . You need to get from to but want to reach a point on the beach. It turns out that the solution is the billiard law of reflection at the boundary. Look at a triangle , replace the curve with the tangent curve at . Reflect at to get a point . The path is shortest if the path has the same length than the path connecting with directly.

21.3 Mountains, Sinks and Mountain Passes

21.3.1 Exploring the Poincaré-Hopf Theorem with Peaks and Pits

The next time you are cast away on an island, count the number of mountain peaks, the number of sinks and the number of mountain passes. Make some experiments. You notice the following rule which is known as a special case of the Poincaré-Hopf theorem:

21.3.2 Island Theorem on Atoll Rings

If you want to challenge yourself, see whether you can prove the island theorem by deformation. (This is probably too hard. Just enjoy the struggle!)

21.3.3 One-Dimensional Island Theorem

Let us look at the one-dimensional case, where we prove things easier. Assume the island is the interval . Let be a smooth function on which has the property that is zero for and for . We look at critical points of in the interior which are Morse, (meaning at critical points), so that we only have only local maxima and minima as critical points. Let be the number of maxima and the number of minima (sinks). In order to prevent the island to be flooded, we also assume that the function is positive for , close to and close to .

EXERCISES