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Mathematics (Paper-II ) Numerical Analysis & Operations Research Book B.Sc 6th Sem U.P
Click below to Buy E-Book Edition:
Buy Latest Mathematics (Paper-II ) Numerical Analysis & Operations Research B.Sc 6th Sem Book in English Language for B.Sc 6th Semester for all U.P. State Universities Common Minimum Syllabus as per NEP. Published By Thakur Publication. Written by Experienced Authors | Fast & All India Delivery |
AUTHORS: Dr. Rachit Kumar , Dr. Prabhat Kumar Singh
ISBN : 978-93-5755-959-1
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Click below to Buy E-Book Edition:
Buy Latest Mathematics (Paper-II ) Numerical Analysis & Operations Research B.Sc 6th Sem Book in English Language for B.Sc 6th Semester for all U.P. State Universities Common Minimum Syllabus as per NEP. Published By Thakur Publication. Written by Experienced Authors | Fast & All India Delivery |
AUTHORS: Dr. Rachit Kumar , Dr. Prabhat Kumar Singh
ISBN : 978-93-5755-959-1
Syllabus
Mathematics
Metric Spaces & Complex Analysis
Course Code: B030601T
|
Unit |
Topics |
No. of Lectures |
|
|
Part A: Metric Spaces |
|
|
I |
Basic Concepts Metric Spaces: Definition and examples, Sequences in metric spaces, Cauchy sequences, Complete metric space. |
08 |
|
II |
Topology of Metric Spaces Open and closed ball, Neighborhood, Open set, Interior of a set, limit point of a set, derived set, closed set, closure of a set, diameter of a set, Cantor’s theorem, Subspaces, Dense set. |
08 |
|
III |
Continuity & Uniform Continuity in Metric Spaces Continuous mappings, Sequential criterion and other characterizations of continuity, Uniform continuity, Homeomorphism, Contraction mapping, Banach fixed point theorem. |
07 |
|
IV |
Connectedness and Compactness Connectedness, Connected subsets of, Connectedness and continuous mappings, Compactness, Compactness and boundedness, Continuous functions on compact spaces. |
07 |
|
|
Part B: Complex Analysis |
|
|
V |
Analytic Functions and Cauchy-Riemann Equations Functions of complex variable, Mappings; Mappings by the exponential function, Limits, Theorems on limits, Limits involving the point at infinity, Continuity, Derivatives, Differentiation formulae, Cauchy-Riemann equations, Sufficient conditions for differentiability; Analytic functions and their examples. |
08 |
|
VI |
Elementary Functions and Integrals Exponential function, Logarithmic function, Branches and derivatives of logarithms, Trigonometric function, Derivatives of functions, Definite integrals of functions, Contours, Contour integrals and its examples, Upper bounds for moduli of contour integrals. |
08 |
|
VII |
Cauchy’s Theorems and Fundamental Theorem of Algebra Antiderivatives, Proof of antiderivative theorem, Cauchy-Goursat theorem, Cauchy integral formula; An extension of Cauchy integral formula, Consequences of Cauchy integral formula, Liouville’s theorem and the fundamental theorem of algebra. |
07 |
|
VIII |
Series and Residues Convergence of sequences and series, Taylor series and its examples; Laurent series and its examples, Absolute and uniform convergence of power series, Uniqueness of series representations of power series, Isolated singular points, Residues, Cauchy’s residue theorem, residue at infinity; Types of isolated singular points, Residues at poles and its examples. |
07 |
U.P State Nep2020/B.SC (English)/6/04
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