, so hopefully this approach will catch on in the future...Differential geometry is a branch of mathematics that studies geometric properties of smooth curves and surfaces in higher dimensions. It provides a mathematical framework for understanding the shape and curvature of objects in space. Differential geometry is important in many fields such as physics, engineering, and computer graphics.
Geometric quantization is a mathematical procedure that aims to construct a quantum theory from a classical theory. It involves finding a mathematical representation of a classical system in terms of quantum operators and states, allowing for the study of quantum mechanical properties of the system.
Some recommended books for learning differential geometry for a Bachelor's degree include "Introduction to Smooth Manifolds" by John Lee, "Differential Geometry: Curves - Surfaces - Manifolds" by Wolfgang Kuhnel, and "Differential Geometry: A First Course in Curves and Surfaces" by Theodore Shifrin.
To learn differential geometry, it is helpful to have a strong foundation in calculus, linear algebra, and multivariable calculus. Familiarity with concepts such as vector spaces, matrices, and partial derivatives is also beneficial.
Differential geometry has applications in many fields such as physics, engineering, computer graphics, and robotics. It can be useful in understanding the shape and motion of objects, modeling physical systems, and optimizing designs. For example, geometric quantization is used in theoretical physics to study quantum mechanics of physical systems.