MA2202 : Analysis II (Spring 2014) | Academic Portal of IISER Kolkata

Details of MA2202 (Spring 2014)

Level: 2

Type: Theory

Credits: 3.0

Course Code	Course Name	Instructor(s)
MA2202	Analysis II	Sriram Balasubramanian

Syllabus
Differentiation: Definition and basic properties, higher order derivatives, Leibnitz's theorem on successive differentiation. Mean Value Theorems: Rolle's theorem, Lagrange's and Cauchy's mean value theorems, Taylor's theorem, computation of Taylor's series. Maxima and minima: Maxima and minima of a function of one variable, saddle points, applications. Integration: Riemann integral viewed as an area, partitions, upper and lower integrals, Riemann integrability of a function, basic properties of Riemann integrals, mean value theorems for Riemann integrals, fundamental theorem of calculus, change of variable formula and integration by parts, improper Riemann integral. Beta and Gamma functions. Sequence of functions Uniform convergence, convergence and continuity. Weierstrass approximation theorem.

Syllabus

Differentiation: Definition and basic properties, higher order derivatives, Leibnitz's theorem on successive differentiation.
Mean Value Theorems: Rolle's theorem, Lagrange's and Cauchy's mean value theorems, Taylor's theorem, computation of Taylor's series.
Maxima and minima: Maxima and minima of a function of one variable, saddle points, applications.
Integration: Riemann integral viewed as an area, partitions, upper and lower integrals, Riemann integrability of a function, basic properties of Riemann integrals, mean value theorems for Riemann integrals, fundamental theorem of calculus, change of variable formula and integration by parts, improper Riemann integral. Beta and Gamma functions.
Sequence of functions Uniform convergence, convergence and continuity. Weierstrass approximation theorem.

References
T. M. Apostol, Calculus I (2nd Edition), Narosa Publishers, 1996. J. M. Howie, Real Analysis, Springer Ungergraduate Mathematics Series, Springer-Verlag, 2008. C. B. Morrey and M. H. Protter, A First Course in Real Analysis, Springer Ungergraduate Mathematics Series, Springer-Verlag, 2004 W. Rudin, Principles of Mathematical Analysis, (3rd Edition) International Series in Pure and Applied Mathematics, McGraw-Hill, 1976.

References

T. M. Apostol, Calculus I (2nd Edition), Narosa Publishers, 1996.
J. M. Howie, Real Analysis, Springer Ungergraduate Mathematics Series, Springer-Verlag, 2008.
C. B. Morrey and M. H. Protter, A First Course in Real Analysis, Springer Ungergraduate Mathematics Series, Springer-Verlag, 2004
W. Rudin, Principles of Mathematical Analysis, (3rd Edition) International Series in Pure and Applied Mathematics, McGraw-Hill, 1976.

Sl. No.	Programme	Semester No	Course Choice
1	IP	2	Not Allowed
2	IP	4	Not Allowed
3	MR	2	Not Allowed
4	MR	4	Not Allowed
5	MS ( Mathematical Sciences )	4	Core
6	RS	1	Not Allowed
7	RS	2	Not Allowed