Instructor: Hemanshu Kaul
Office: 125C, Rettaliata Engg Center.
E-mail: kaul [at] iit.edu

Class Time: 5-6:15pm, Monday and Wednesday
Place: 119, Rettaliata Engg Center

Discussion Forums: Math 400 at Canvas.

Office Hours: Monday and Wednesday at 12:30-1:30pm. And by appointment in-person or through Zoom (send email to setup appointment).
Questions through Canvas Discussion Forums are strongly encouraged.

TA Office Hours: There is no TA assigned to this course but you can ask for help with topics at RE 129 or through Zoom link at Math Tutoring Center.

• Monday, 8/19 : Check this webpage regularly for weekly lecture topics, videos, and HW.

• Exam # 1 : Wednesday, 10/2. Syllabus: Based on topics corresponding to HWs #1 to #5.
• Exam # 2 : Wednesday, 11/13. Syllabus: Based on topics corresponding to HWs #6 to #10.
• Final Exam : Monday, 12/2, 5pm-7pm, RE 119. Topics: All topics studied during the semester.

• Week #1 : 2 lectures
  
  • Topics and Readings: Examples for limitations of Calculus and other dangers, Irrational Numbers, Basic properties of Real Numbers, Axiom of Completeness, Supremum and Infimum, Maximum and Minimum. From: Sections 1.1, 1.2, 1.3, and elsewhere.
    
  • Pre-recorded Lecture Videos: Available at YouTube (log in through your IIT account). Videos #1-#4.
    
  • Discussion and Review Questions: Discussion/ Review Questions #1 based on this week's lectures.
    
  • Lecture Notes: Outlines of lectures without all the details as discussed in the classroom. Notes#1.
    
  • Homework & Comments: Homework 1. Due 11:30pm, August 28th. Submit a PDF file through Canvas Assignment. Solutions distributed in class.
    Ask for help through Canvas Discussion Forums, during the instructor office hours, or through email to the instructor.
  
  
• Week #2 : 2 lectures
  
  • Topics and Readings: Nested Interval Property, Q is dense in R, Existence of Roots, Cardinality and (Un)Countable sets, Cantor's Diagonalization Method, Cantor's Theorem and Infinity of Infinities. From: Sections 1.4, 1.5, 1.6, and elsewhere.
    
  • Pre-recorded Lecture Videos: Available at YouTube (log in through your IIT account). Videos #5-#8.
    
  • Discussion and Review Questions: Discussion/ Review Questions #2 based on this week's lectures.
    
  • Lecture Notes: Outlines of lectures without all the details as discussed in the classroom. Notes#2.
    
  • Homework & Comments: Homework 2. Due 11:30pm, September 4th. Submit a PDF file through Canvas Assignment. Solutions distributed in class.
    Ask for help through Canvas Discussion Forums, during the instructor office hours, or through email to instructor.
  
  
• Week #3 : 1 Holiday and 1 lecture
  
  • Topics and Readings: Sequences - Convergence, Uniqueness of limit, Divergence, Algebraic and order properties of limits. From: Sections 2.2, 2.3, and elsewhere.
    
  • Pre-recorded Lecture Videos: Available at YouTube (log in through your IIT account). Videos #9-#11.
    
  • Discussion and Review Questions: Discussion/ Review Questions #3 based on this week's lectures.
    
  • Lecture Notes: Outlines of lectures without all the details as discussed in the classroom. Notes#3.
    
  • Homework & Comments: Homework 3. Due 11:30pm, September 11th. Submit a PDF file through Canvas Assignment. Solutions distributed in class.
    Ask for help through Canvas Discussion Forums, during the instructor office hours, or through email to instructor.
  
  
• Week #4 : 2 lectures
  
  • Topics and Readings: Monotone Convergence Theorem, Convergence and Divergence of Series, Subsequences and Bolzano-Weierstrass Theorem. From: Sections 2.4, 2.5, and elsewhere.
    
  • Pre-recorded Lecture Videos: Available at YouTube (log in through your IIT account). Videos #12-#14.
    
  • Discussion and Review Questions: Discussion/ Review Questions #4 based on this week's lectures.
    
  • Lecture Notes: Outlines of lectures without all the details as discussed in the classroom. Notes#4.
    
  • Homework & Comments: Homework 4. Due 11:30pm, September 18th. Submit a PDF file through Canvas Assignment. Solutions distributed in class.
    Ask for help through Canvas Discussion Forums, during the instructor office hours, or through email to instructor.
  
  
• Week #5 : 2 lectures
  
  • Topics and Readings: Cauchy sequences and Cauchy criterion for convergence of sequences, Algebra of Series Limits, Cauchy criterion for Series, Comparison Test for series, Series p-test, Geometric series, Absolute convergence test, Alternating Series test, Absolute and Conditional convergence of series, Rearrangements of Series - absolutely convergent series vs conditionally convergent series. From: Sections 2.6, 2.7, and elsewhere.
    
  • Pre-recorded Lecture Videos: Available at YouTube (log in through your IIT account). Videos #15-#17.
    
  • Discussion and Review Questions: Discussion/ Review Questions #5 based on this week's lectures.
    
  • Lecture Notes: Outlines of lectures without all the details as discussed in the classroom. Notes#5.
    
  • Homework & Comments: Homework 5. Due 11:30pm, September 25th. Submit a PDF file through Canvas Assignment. Solutions distributed in class.
    Ask for help through Canvas Discussion Forums, during the instructor office hours, or through email to instructor.
  
  
• Weeks #6 and #7 : 3 lectures and 1 Mid-term Exam
  
  • Topics and Readings: The Cantor set and its properties, Open set and properties, Limit point of a set, Closed set and properties, Closure of a set, Complements of open sets and closed sets, Compact sets. From: Sections 3.1, 3.2, 3.3, and elsewhere.
    
  • Pre-recorded Lecture Videos: Available at YouTube (log in through your IIT account). Videos #18-#20.
    
  • Discussion and Review Questions: Discussion/ Review Questions #6 based on this week's lectures.
    
  • Lecture Notes: Outlines of lectures without all the details as discussed in the classroom. Notes#6.
    
  • Homework & Comments: Homework 6. Due 11:30pm, October 9th. Submit a PDF file through Canvas Assignment. Solutions distributed in class.
    Ask for help through Canvas Discussion Forums, during the instructor office hours, or through email to instructor.
  
  
• Week #8 : 1 lecture and 1 holiday
  
  • Topics and Readings: Sequential Compactness, Compactness (Every open cover has a finite subcover), Closed and Bounded sets, Heine-Borel Theorem, Limit of a function, Sequential Characterization of Functional limits (to be completed), Algebra of Functional limits (to be completed). From: Sections 3.3, 4.2, and elsewhere.
    
  • Pre-recorded Lecture Videos: Available at YouTube (log in through your IIT account). Videos #21-#22.
    
  • Discussion and Review Questions: Discussion/ Review Questions #7 based on this week's lectures.
    
  • Lecture Notes: Outlines of lectures without all the details as discussed in the classroom. Notes#7.
    
  • Homework & Comments: Homework 7. Due 11:30pm, October 16th. Submit a PDF file through Canvas Assignment. Solutions distributed in class.
    Ask for help through Canvas Discussion Forums, during the instructor office hours, or through email to instructor.
  
  
• Week #9 : 2 lectures
  
  • Topics and Readings: Discussion of Exam#1.
    Proofs related to Sequential Characterization of Functional limits; Continuity, Examples, Preservation of Compactness by continuous functions, Extreme Value Theorem, Bolzano's Theorem for existence of solutions, Intermediate Value Theorem, Applications to functional equations. From: Sections 4.1, 4.2, 4.3, 4.4, and elsewhere.
    
  • Pre-recorded Lecture Videos: Available at YouTube (log in through your IIT account). Videos #23-#25.
    
  • Discussion and Review Questions: Discussion/ Review Questions #8 based on this week's lectures.
    
  • Lecture Notes: Outlines of lectures without all the details as discussed in the classroom. Notes#8.
    
  • Homework & Comments: Homework 8. Due 11:30pm, October 23rd. Submit a PDF file through Canvas Assignment. Solutions distributed in class.
    Ask for help through Canvas Discussion Forums, during the instructor office hours, or through email to instructor.
  
  
• Week #10 : 2 lectures
  
  • Topics and Readings: Completion of Proofs related to Bolzano, IVT, etc. Uniform Continuity - examples, nonexamples, compact domains; Differentiability, Algebra and Chain rule, Interior Extremum by Derivative, Darboux' Theorem, Unusual examples/ Topologist's sine curve. From: Sections 4.4, 5.2, 5.1, and elsewhere.
    
  • Pre-recorded Lecture Videos: Available at YouTube (log in through your IIT account). Videos #26-#28.
    
  • Discussion and Review Questions: Discussion/ Review Questions #9 based on this week's lectures.
    
  • Lecture Notes: Outlines of lectures without all the details as discussed in the classroom. Notes#9.
    
  • Homework & Comments: Homework 9. Due 11:30pm, October 30th. Submit a PDF file through Canvas Assignment. Solutions distributed in class.
    Ask for help through Canvas Discussion Forums, during the instructor office hours, or through email to the instructor.
  
  
• Week #11 : 2 lectures
  
  • Topics and Readings: Darboux' Theorem. Rolle's Theorem, Mean Value Theorem, Generalized (Cauchy's) MVT, Consequences of MVT, L'Hospital's Rules, Pointwise and Uniform Convergence of sequence of functions, Preservation (?) of continuity and differentiability under convergence of functions. From: Sections 5.3, 6.2, 6.3, and elsewhere.
    
  • Pre-recorded Lecture Videos: Available at YouTube (log in through your IIT account). Videos #29-#30.
    
  • Discussion and Review Questions: Discussion/ Review Questions #10 based on this week's lectures.
    
  • Lecture Notes: Outlines of lectures without all the details as discussed in the classroom. Notes#10.
    
  • Homework & Comments: Homework 10. Due 11:30pm, November 6th. Submit a PDF file through Canvas Assignment. Solutions distributed in class.
    Ask for help through Canvas Discussion Forums, during the instructor office hours, or through email to the instructor.
  
  
• Weeks #12 & #13 : 3 lectures and 1 Mid-term Exam
  
  • Topics and Readings: Series of functions and its pointwise and uniform convergence, Power series, its radius of convergence, pointwise convergence and uniform convergence, Properties of Power series - continuity, term-by-term differentiation and antidifferentiation, Taylor (McLaurin) Series, Error function and Lagrange Remainder theorem; Riemann Integral, Upper and Lower Integrals, Examples and non-examples, Integrability Criterion, Continuous Functions are integrable, Integrating functions with finitely many points of discontinuity. From: Sections 6.4, 6.5, 6.6, 7.2, 7.3, and elsewhere.
    
  • Pre-recorded Lecture Videos: Available at YouTube (log in through your IIT account). Videos #31-#34.
    
  • Discussion and Review Questions: Discussion/ Review Questions #11 based on this week's lectures.
    
  • Lecture Notes: Outlines of lectures without all the details as discussed in the classroom. Notes#11.
    
  • Homework & Comments: Homework 11. Due 11:30pm, November 20th. Submit a PDF file through Canvas Assignment. Solutions to be distributed in class.
    Ask for help through Canvas Discussion Forums, during the instructor office hours, or through email to the instructor.
  
  
• Weeks #14 & #15 : 3 lectures and 1 holiday
  
  • Topics and Readings: Continuous Functions are integrable, Integrating functions with finitely many points of discontinuity, Examples of Integrating functions with infinitely many points of discontinuity, Discussion of Lebesgue's criterion for Riemann Integrability (without proof); (More) Basic Properties of Integrable functions - algebra, comparison, Integral version of Triangle Inequality; Interchange of limit and integral under uniform convergence; Integral Mean Value Theorem; Fundamental Theorem of Calculus, Application of FTOC to prove Integration by Parts and Substitution Rule. From: Sections 7.4, 7.5, and elsewhere.
    
  • Pre-recorded Lecture Videos: Available at YouTube (log in through your IIT account). Videos #35-#36.
    
  • Discussion and Review Questions: Discussion/ Review Questions #12 based on this week's lectures.
    
  • Lecture Notes: Outlines of lectures without all the details as discussed in the classroom. Notes#12.
    
  • Homework & Comments: Homework 12. Due 11:59pm, Wednesday, 11/27. Submit a PDF file through Canvas Assignment. Solutions to be distributed.
    Ask for help through Canvas Discussion Forums, during the instructor office hours, or through email to the instructor.
  
  

• Mathematical Analysis
• Real Analysis
• A Historical Timeline of Real Analysis


• Textbooks for alternative points of view:
  
  • Jay Cummings, Real Analysis: A Long-Form Mathematics, 2nd Edition.
  • Bartle and Sherbert, Introduction to Real Analysis, 4th Edition.
  • Terrence Tao, Analysis I, 3rd Edition.
  • Frank Morgan, Real Analysis.
  • A Textbook for Historical Development of Real Analysis