Instructions to follow: * Give original work *Support your work with examples and graphs where required * Follow The references: Kreyszig, Rudin and Robert. G. Bartle. Reference Books: C.D. Aliprantis and O. Burkinshaw, Principles of Real Analysis, 3rd Edition, Harcourt Asia, (2000) J. Bak and D.J. Newman, Complex Analysis, 2nd Edition, Springer Indian Reprint, (2009) Bartle and Sherbert, Introductory Real Analysis, 3rd edition, Wiley International, (2001) E. Kreyszig, Introductory Functional Analysis with Applications, Wiley Singapore Edition, (2001). S. Kumaresun, Topology of Metric Spaces, Narosa, (2005). S. Kumaresan, Real Analysis An Oulline, Unpublished Course Notes (available at http://mtts.org.in/downloads) B.V. Limaye, Functional Analysis, 2nd Edition, New Age International Ltd., (1996). W. Rudin, Real and Complex Analysis, TMH Edition, 1973. Open Mapping Theorem and Applications Question: Prove the Open Mapping Theorem, which states that any continuous surjective linear operator between Banach spaces is an open map. Provide an example to illustrate this theorem and discuss one practical application in the theory of differential equations. Fixed Point Theorem in Banach Spaces Question: Prove the Banach Fixed Point Theorem (Contraction Mapping Theorem) for a complete metric space X and a contraction mapping T: XX. Discuss applications of this theorem in solving integral and differential equations, and present an example where this theorem is crucial.

Algebra & Trigonometry with Analytic Geometry
13th Edition
ISBN:9781133382119
Author:Swokowski
Publisher:Swokowski
Chapter3: Functions And Graphs
Section3.2: Graphs Of Equations
Problem 5E
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Instructions to follow:
* Give original work
*Support your work with examples and graphs where required
* Follow The references: Kreyszig, Rudin and Robert. G. Bartle.
Reference Books:
C.D. Aliprantis and O. Burkinshaw, Principles of Real Analysis, 3rd Edition, Harcourt Asia,
(2000)
J. Bak and D.J. Newman, Complex Analysis, 2nd Edition, Springer Indian Reprint, (2009)
Bartle and Sherbert, Introductory Real Analysis, 3rd edition, Wiley International, (2001)
E. Kreyszig, Introductory Functional Analysis with Applications, Wiley Singapore Edition,
(2001).
S. Kumaresun, Topology of Metric Spaces, Narosa, (2005).
S. Kumaresan, Real Analysis An Oulline, Unpublished Course Notes
(available at http://mtts.org.in/downloads)
B.V. Limaye, Functional Analysis, 2nd Edition, New Age International Ltd., (1996).
W. Rudin, Real and Complex Analysis, TMH Edition, 1973.
Open Mapping Theorem and Applications
Question: Prove the Open Mapping Theorem, which states that any continuous surjective linear
operator between Banach spaces is an open map. Provide an example to illustrate this theorem
and discuss one practical application in the theory of differential equations.
Fixed Point Theorem in Banach Spaces
Question: Prove the Banach Fixed Point Theorem (Contraction Mapping Theorem) for a
complete metric space X and a contraction mapping T: XX. Discuss applications of this
theorem in solving integral and differential equations, and present an example where this
theorem is crucial.
Transcribed Image Text:Instructions to follow: * Give original work *Support your work with examples and graphs where required * Follow The references: Kreyszig, Rudin and Robert. G. Bartle. Reference Books: C.D. Aliprantis and O. Burkinshaw, Principles of Real Analysis, 3rd Edition, Harcourt Asia, (2000) J. Bak and D.J. Newman, Complex Analysis, 2nd Edition, Springer Indian Reprint, (2009) Bartle and Sherbert, Introductory Real Analysis, 3rd edition, Wiley International, (2001) E. Kreyszig, Introductory Functional Analysis with Applications, Wiley Singapore Edition, (2001). S. Kumaresun, Topology of Metric Spaces, Narosa, (2005). S. Kumaresan, Real Analysis An Oulline, Unpublished Course Notes (available at http://mtts.org.in/downloads) B.V. Limaye, Functional Analysis, 2nd Edition, New Age International Ltd., (1996). W. Rudin, Real and Complex Analysis, TMH Edition, 1973. Open Mapping Theorem and Applications Question: Prove the Open Mapping Theorem, which states that any continuous surjective linear operator between Banach spaces is an open map. Provide an example to illustrate this theorem and discuss one practical application in the theory of differential equations. Fixed Point Theorem in Banach Spaces Question: Prove the Banach Fixed Point Theorem (Contraction Mapping Theorem) for a complete metric space X and a contraction mapping T: XX. Discuss applications of this theorem in solving integral and differential equations, and present an example where this theorem is crucial.
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