MTL122: Difference between revisions

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Latest revision as of 16:42, 14 April 2026

MTL122
Real and Complex Analysis
Credits	4
Structure	3-1-0
Pre-requisites	MTL100
Overlaps	MTL503, MTL506

MTL122 : Real and Complex Analysis

Metric spaces: Definition and examples. Open, closed and bounded sets. Interior, closure and boundary. Convergence and completeness. Continuity and uniform continuity. Connectedness, compactness and separability. Heine-Borel theorem. Pointwise and uniform convergence of real-valued functions. Equicontinuity. Ascoli-Arzela theorem. Limits, continuity and differentiability of functions of a complex variable. Analytic functions, the Cauchy-Riemann equations. Definition of contour integrals, Cauchy's integral formula and derivatives of analytic functions. Morera's and Liouville's theorems. Maximum modulus principle. Taylor and Laurent series. Isolated singular points and residues. Cauchy's residue theorem and applications.

@@ Line 4: / Line 4: @@
 | credits = 4
 | credit_structure = 3-1-0
-| pre_requisites = MTL100
+| pre_requisites = [[MTL100]]
-| overlaps = MTL503, MTL506
+| overlaps = [[MTL503]], [[MTL506]]
 }}
 == MTL122 : Real and Complex Analysis ==
 Metric spaces: Definition and examples. Open, closed and bounded sets. Interior, closure and boundary. Convergence and completeness. Continuity and uniform continuity. Connectedness, compactness and separability. Heine-Borel theorem. Pointwise and uniform convergence of real-valued functions. Equicontinuity. Ascoli-Arzela theorem. Limits, continuity and differentiability of functions of a complex variable. Analytic functions, the Cauchy-Riemann equations. Definition of contour integrals, Cauchy's integral formula and derivatives of analytic functions. Morera's and Liouville's theorems. Maximum modulus principle. Taylor and Laurent series. Isolated singular points and residues. Cauchy's residue theorem and applications.