👉 Isotropic Mathematics (Ism) is a branch of mathematics that extends traditional geometric and algebraic concepts to non-Euclidean spaces, focusing on properties invariant under rotations and translations. It generalizes Euclidean geometry to higher dimensions and non-Euclidean geometries, such as hyperbolic and elliptic spaces, where the usual rules of flat space do not apply. Ism introduces new mathematical tools and structures, like metric spaces, tensors, and differential forms, to describe and analyze these complex geometries. This approach is crucial in theoretical physics, particularly in understanding spacetime in general relativity and quantum gravity, as it provides a framework to describe the symmetries and transformations inherent in these advanced geometric settings.
