Brown, J. W. and Churchill, R. V., Fourier Series and Boundary Value Problems, 8th ed., McGraw-Hill, (2012).

Bleecker, D. D. and Csordas, G., Basic Partial Differential Equations, Van Nostrand Reinhold (1992).

Myint-U, T. and Debnath, L., Linear Partial Differential Equations for Scientists and Engi- neers, 4th ed., Birkhauser (2006).

Strauss, W. A., Partial Differential Equations: An Introduction, 2nd ed., John Wiley (2008).

Kot, M., A First Course in the Calculus of Variations, American Math Society (2014).

Gelfand, I. M. and Fomin, S. V., Calculus of Variations, Prentice Hall (1963).

Arfken, G. B., Weber, H. J., and Harris, F. E., Mathematical Methods for Physicists, 7th ed., Academic Press (2012).

Greenberg, M. D., Advanced Engineering Mathematics, 2nd ed., Pearson (1998).

Course Outcomes (COs):
CO1: Develop a general understanding of linear algebra in terms of vector spaces and its application to differential equations and Fourier analysis.
CO2: Ability to use Fourier analysis techniques for solving PDE and for signal analysis.
CO3: Formulate physical problems in terms of ODE/PDE and obtain analytical solutions.
CO4: Use commercial/open-source math packages for solving ODE and performing signal analysis.