Fluid Mechanics: A Geometrical Point of View emphasizes general principles of physics illustrated by simple examples in fluid mechanics. Advanced mathematics (e.g., Riemannian geometry and Lie groups) commonly used in other parts of theoretical physics (e.g. General Relativity or High Energy Physics) are explained and applied to fluid mechanics. This follows on from the author's book Advanced Mechanics (Oxford University Press, 2013). After introducing the fundamental equations (Euler and Navier-Stokes), the book provides particular cases: ideal and viscous flows, shocks, boundary layers, instabilities, and transients. A restrained look at integrable systems (KdV) leads into a formulation of an ideal fluid as a hamiltonian system. Arnold's deep idea, that the instability of a fluid can be understood using the curvature of the diffeomorphism group, will be explained. Leray's work on regularity of Navier-Stokes solutions, and the modern developments arising from it, will be explained in language for physicists. Although this is a book on theoretical physics, readers will learn basic numerical methods: spectral and finite difference methods, geometric integrators for ordinary differential equations. Readers will take a deep dive into chaotic dynamics, using the Smale horse shoe as an example. Aref's work on chaotic advection is explained. The book concludes with a self-contained introduction to renormalization, an idea from high energy physics which is expected to be useful in developing a theory of turbulence.

"The book is an introduction to fluid mechanics from a theoretical viewpoint. It starts with very basic concepts and proceeds to Euler flow, viscous (Navier-Stokes) flow, shocks, boundary layers, etc. One chapter describes geometric integrators for ordinary differential equations, which preserve symmetries and, therefore, useful properties like conservation laws." - Ilya A. Chernov, zbMath

"[This book] resides at the very highest level as an exposition for graduate students in physics and engineering who seek a unified account of classical fluid dynamics and at least pointers into research topics." - Clark D. Jeffries, MathSciNet