References
[This is a very incomplete list. Under construction]…
Books
[And67] Anderson, J. L., “Principles of Relativity Physics”.
[Arn89] Arnold, V. I., “Mathematical Methods of Classical Mechanics”.
[Barb95] Barbour, J. & Pfister, H., “Mach’s Principle. From Newton’s Bucket to Quantum Gravity”.
[Bar80] Barut, A. O., “Electrodynamics and the Classical Theory of Fields and Particles”.
[Ber89] Berry, M. V., “Principles of Cosmology and Gravitation”.
[Bis80] Bishop, R. L. & Goldberg, S. I., “Tensor Analysis on Manifolds”.
[Boo02] Boothby, W. M., “An Introduction to Differentiable Manifolds and Riemannian Geometry”.
[But80] Butkov, E., “Mathematical Physics”.
[dCa76] do Carmo, M. P., “Differential Geometry of Curves and Surfaces”.
[dCa92] do Carmo, M. P., “Riemannian Geometry”.
[Dod91] Dodson, C. T. J., “Tensor Geometry: The Geometric Viewpoint and its Uses”.
[Jam1] Jammer, M. “Concepts of Space”.
[Jam2] Jammer, M. “Concepts of Mass”.
[Jam3] Jammer, M. “Concepts of Force”.
[Lan76] Landau, L. D. & Lifshitz, E. M., “Mechanics”.
[Lan80] Landau, L. D. & Lifshitz, E. M., “The Classical Theory of Fields”.
[Law85] Lawden, D. F., “Elements of Relativity Theory”.
[Nea10] Nearing, J., “Mathematical Tools for Physics”. [This book is available freely online.]
[Mach10] Mach, E., “The Science of Mechanics”.
[MTW73] Misner, C. W., Thorne, K. S. & Wheeler, J. A., “Gravitation”.
[ONe83] O’Neill, B., “Semi-Riemannian Geometry With Applications to Relativity”.
[Rai81] Raine, D. J. & Heller, M., “The Science of Space-Time”.
[Sch80] Schutz, “Geometrical Methods of Mathematical Physics”.
[Ten85] Tenenbaum, M. & Pollard, H., “Ordinary Differential Equations”.
[Wal84] Wald, R. M., “General Relativity”.
