
#1
Apr612, 03:06 PM

P: 312

I have never had an advanced classical mechanics class, only elementary level treatments using mostly Newtonian approaches, on very simple mechanical systems. I'm interested in learning about continuum mechanics, having in mind the applications in the applied field of seismology, which studies the propagation of mechanical waves in the solid (and molten) earth. I don't need to see applications in this introductory study. My math background is mostly engineering oriented, only recently did I start some light reading on "modern math" such as abstract algebra, topology and soon, measure, Hilbert space, etc. I can do some simple vector and maybe tensor calculus, but not differential forms. I've seen some ODEs and PDEs and solutions using separation of variables, etc, but never learned any general theorems regarding the existence, uniqueness, etc. I have some experience on classical EM waves and fields and Green's functions, but mechanical waves as I understand are tensor waves, probably harder to get used to. Now where should I start to learn the basics? I don't want a book written for undergraduate engineering students with inadequate math background, in which case the treatment typically tend to become ad hoc and very awkward, but my background won't accommodate a highly rigorous treatment using lots of geometry either, is there anything in between that emphasize more on the theory rather than applications? Thank you for reading these through, if you have any suggestions it is even more appreciated.




#2
Apr712, 01:11 PM

P: 1,025

Do you know lagrangian and hamiltonian mechanics? Your first sentence suggests not. If so, start there with Taylor (imo).




#3
Apr712, 02:13 PM

P: 343

As fellow by the name of Morris Stern was working on such a book quite few years ago. I do not know if it was ever completed or not. Might try a search on that name. I took such a course from him many years ago.




#4
Apr712, 02:28 PM

P: 615

Introductory book on continuum mechanics
http://www.math.odu.edu/~jhh/counter2.html
Best free textbook going, have fun Edit; Also, what Jorriss said, if you don't know any action based physics you should learn that first I've had no experience with Taylor's book but I would reccomend Landau & Lifgarbagez' Mechanics book (Vol. 1 of a Course of Theoretical Physics) and Goldsteins book (I personally like the L&L book more but goldstein covers more material). 



#5
Apr712, 07:21 PM

P: 312

Folks, thank you all for your input. Some of the suggestions pointed me to some very large volume of classical mechanics as part of the theoretic physics curriculum, which is not what I'm looking for. I agree reading such materials would give me a solid foundation, but that's going to take at least months of devoted study. (I'm a working professional.)
I'm mostly interested in solving the mechanical wave (acoustic and elastic) equations in continuous media, just like classical EM waves. Taylor's book has a chapter on it but it's the last one, and probably will be dependent on the previous chapters. An ideal book I'm looking for would start with some tensor analysis, followed by basic mechanical equations in media and derive some wave equations and then discussion their solutions. It should be selfcontained, assuming no experience with Hamiltonian and Lagrangian mechanics. Simply speaking, I have more experience with EM waves and I wonder if there's an approach to mechanical waves similar to that. (Something similar to Griffiths EM book). Does such a book exist at all? Please forgive me for being ignorant about this field, which I really am. 



#6
Apr712, 07:24 PM

P: 615

http://www.math.odu.edu/~jhh/counter2.html Does this 



#7
Apr712, 07:28 PM

P: 312





#8
Apr712, 07:34 PM

P: 615





#9
Apr712, 07:53 PM

P: 312





#10
Apr712, 08:12 PM

P: 615

I'd say go for the L&L book, get used to lagranges equations of motion (possibly hamiltons too, I can't remember if they come up in the continuum mechanics book) and the rigid body motion to get you used to working with stuff and then start on the intro to tensor calc/continuum mech
The equations of motion come up in heinbockels book and they aren't very well explained so you'll need to know about them before you start. 



#11
Apr712, 08:17 PM

P: 312





#12
Apr712, 08:18 PM

P: 615





#13
Apr1612, 04:12 PM

P: 312





#14
Apr1712, 08:12 PM

Sci Advisor
P: 5,468




#15
Apr1812, 03:26 PM

P: 312




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