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Mathematical Physics, Fall Semester 2012

Mathematical physics , fall Semester 2012 Professor: J. D. LL418 Phone 8-3959 Textbook: Mathematical methods for PhysicistsG. B. Arfken and H. J. Weber, Academic Press, 6th is an introductory course at the graduate level that cov-ers several basic tools of mathematics that you will need to master, in order toimprove your understanding of advanced physics . The course will cover most orall of the material (listed below) from the textbook. Most of you have probablycovered Fourier series and Fourier and Laplace transforms during your under-graduate Mathematical physics courses, so I might spend less time on thesesubjects than the other topics. We will discuss this issue when we get to thatpart of the course. Classes will be a mix of lectures and student board the latter case I will ask you to solve a problem on the board, and if you getstuck, I will try to help.

Mathematical Physics, Fall Semester 2012 Professor: J. D. Gunton jdg4@lehigh.edu O ce LL418 Phone 8-3959 Textbook: Mathematical Methods for Physicists

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Transcription of Mathematical Physics, Fall Semester 2012

1 Mathematical physics , fall Semester 2012 Professor: J. D. LL418 Phone 8-3959 Textbook: Mathematical methods for PhysicistsG. B. Arfken and H. J. Weber, Academic Press, 6th is an introductory course at the graduate level that cov-ers several basic tools of mathematics that you will need to master, in order toimprove your understanding of advanced physics . The course will cover most orall of the material (listed below) from the textbook. Most of you have probablycovered Fourier series and Fourier and Laplace transforms during your under-graduate Mathematical physics courses, so I might spend less time on thesesubjects than the other topics. We will discuss this issue when we get to thatpart of the course. Classes will be a mix of lectures and student board the latter case I will ask you to solve a problem on the board, and if you getstuck, I will try to help.

2 I believe you learn more this way than by sitting andlistening to dull lectures. I will occasionally assign material for you to read thatmight be covered in an exam, but I will not lecture on. I am always availableto meet with you in my office;the best way to make an appointment isto contact me by 6-7 Complex VariablesChapter 8 Differential EquationsChapter 9 Sturm-Liouville Theory: Orthogonal FunctionsChapter Gamma FunctionsChapter 11 Bessel FunctionsChapter 12 Legendre FunctionsChapter 13 Special FunctionsChapter 14 Fourier SeriesChapter 15 Integral TransformsChapter 16 Integral EquationsChapter 17 Calculus of Variations(I will probably not present this material in the order presented in the text-book.) Please review the material in chapter 5 as soon as possible, as I willassume a working knowledge of this material, which is covered in undergradu-ate will be assigned on a regular basis, once every one or twoweeks.

3 There will be one or two midterm exams plus a final exam. Homeworkwill count approximately 15 20 percent, exams will count 75 80 percent andclass room participation will count for the remaining 5-10 percent of the for Students with Disabilities: If you have a disability for1which you are or may be requesting accommodations, please contact both yourinstructor and the Office of Academic Support Services, University Center 212(610-758-4152) as early as possible in the Semester . You must have documenta-tion from the Academic Support Services office before accommodations can


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