On Isoperimetric Inequalities in Minkowski Spaces

In Geometric Convexity, but also beyond its limits, isoperimetric inequalities have always played a central role. Applications of such inequalities can be found in Stochastic Geometry, Functional Analysis, Fourier Analysis, Mathematical Physics, Discrete Geometry, Integral Geometry, and various further mathematical disciplines. We will present a survey on isoperimetric inequalities in real, finite-dimensional Banach spaces, also called Minkowski spaces. In the introductory part a very general survey on this topic is given, where we refer to historically important papers and also to results from Euclidean geometry that are potential to be extended to Minkowski geometry, that is, to the geometry of Minkowski spaces of dimension d ≥ 2. The second part of the introductory survey then refers already to Minkowski spaces.