This third volume completes the Work Mechanical Systems, Classical Models. The first two volumes dealt with particle dynamics and with discrete and continuous mechanical systems. The present volume studies analytical mechanics. Topics like Lagrangian and Hamiltonian mechanics, the Hamilton-Jacobi method, and a study of systems with separate variables are thoroughly discussed. Also included are variational principles and canonical transformations, integral invariants and exterior differential calculus, and particular attention is given to non-holonomic mechanical systems.
The author explains in detail all important aspects of the science of mechanics, regarded as a natural science, and shows how they are useful in understanding important natural phenomena and solving problems of interest in applied and engineering sciences.
Professor Teodorescu has spent more than fifty years as a Professor of Mechanics at the University of Bucharest and this book relies on the extensive literature on the subject as well as the author's original contributions.
Audience: scientists and researchers in applied mathematics, physics and engineering.
Petre P. Teodorescu
Lagrangian mechanics MB09 analytical methods in mechanical systems applied mathematics dynamics dynamics of mechanical systems mechanics
From the reviews:
“The present one deals with analytical mechanics. … The presentation of material is carefully thought out and combines the exactness, completeness and simplicity that helps in understanding of the material. A particular impression makes the rich bibliography and the completeness of author’s scope. This book is one of the best modern courses on analytical mechanics … . Undoubtedly, this course will be useful for scientists, engineers, teachers and students.” (Alexander Mikhailovich Kovalev, Zentralblatt MATH, Vol. 1177, 2010)