A basic course in the concepts of linear functional analysis, including such topics as Banach and Hilbert spaces, L^p and l^p (sequence) spaces; weak, strong and weak* convergence; linear functionals; linear bounded, unbounded, closed, and compact operators; spectrum, resolvent, the spectral theorem for compact operators, Fredholm alternative; applications are to differential equations, integral equations and optimization.
Spring | Summer | Fall | ||
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(Session 1) | (Session 2) | |||
2023 | ||||
2022 | ||||
2021 |
Applied Functional Analysis (4c)
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2020 | ||||
2019 |
Applied Functional Analysis (4c)
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2018 | ||||
2017 |
Applied Functional Analysis (4c)
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2016 |
Intro To Func Analysis (4c)
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2015 |
Intro To Func Analysis (4c)
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2014 |
Intro To Func Analysis (4c)
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Intro To Func Analysis (4c)
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2013 | ||||
2012 |
Intro To Functional Analysis (4c)
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2011 |
Intro To Functional Analysis (4c)
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2010 |
Intro To Functional Analysis (4c)
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2009 |
Intro To Functional Analysis (4c)
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2008 |
Intro To Functional Analysis (4c)
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2007 |
Intro To Functional Analysis (4c)
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