Week - 1 |
Power series solutions about an ordinary point. |
Week - 2 |
Regular singular points and Frobenius Method. |
Week - 3 |
Exceptional cases. |
Week - 4 |
Bessel differential equations. |
Week - 5 |
Differential operators and anOperator medhod.. |
Week - 6 |
Basic theory of linear systems in normal form. |
Week - 7 |
Homogeneous Linear Systems with constant coefficients. |
Week - 8 |
The matrix method for Homogeneous Linearsystems with constant coefficients.. |
Week - 9 |
The cases of complex and reoeated eigenvalues. |
Week - 10 |
Some applications of homogeneous linear systems. |
Week - 11 |
The Laplace Transformations. |
Week - 12 |
The Inverse Laplace Transformations. |
Week - 13 |
Laplace Transform solution of Linear differential equations with constant coefficients. |
Week - 14 |
Laplace transform solution of Linear systems. |