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Recommended Problem books for undergraduate Real Analysis
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So I am taking an analysis class in my university and I want a problem book for it.
The topics included in the teaching plan are
Real Numbers: Introduction to the real number field, supremum, infimum, completeness axiom, basic properties of real numbers, decimal expansion, construction of real numbers.
Sequences and Series: Convergence of a sequence, Cauchy sequences and subsequences, absolute and conditional convergence of an infinite series, Riemann's theorem, various tests of convergence.
Point-set Topology of: : Open and closed sets; interior, boundary and closure of a set; Bolzano-Weierstrass theorem; sequential definition of compactness and the Heine-Borel theorem.
Limit of a Function: Limit of a function, elementary properties of limits.
Continuity: Continuous functions, elementary properties of continuous functions, intermediate value theorem, uniform continuity, properties of continuous functions defined on compact sets, set of discontinuities.
I am already following up Michael J. Schramm's Introduction to Real Analysis for my theory
But a problem book with varied questions on the concepts would help me a lot.
Please recommend some problem books.
Thanks
P.S : I have already asked my professor to recommend some books but he always recommends baby Rudin and also doesn't provide a lot of assignments. I am not compatible with Rudin's book. Also his tests are very tough as he wants us to cook up counter examples and I am very poor in that. So I need a good problem book to master real analysis.
real-analysis reference-request book-recommendation
asked 4 hours ago
Pratik Patnaik
185
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up vote
2
down vote
favorite
So I am taking an analysis class in my university and I want a problem book for it.
The topics included in the teaching plan are
Real Numbers: Introduction to the real number field, supremum, infimum, completeness axiom, basic properties of real numbers, decimal expansion, construction of real numbers.
Sequences and Series: Convergence of a sequence, Cauchy sequences and subsequences, absolute and conditional convergence of an infinite series, Riemann's theorem, various tests of convergence.
Point-set Topology of: : Open and closed sets; interior, boundary and closure of a set; Bolzano-Weierstrass theorem; sequential definition of compactness and the Heine-Borel theorem.
Limit of a Function: Limit of a function, elementary properties of limits.
Continuity: Continuous functions, elementary properties of continuous functions, intermediate value theorem, uniform continuity, properties of continuous functions defined on compact sets, set of discontinuities.
I am already following up Michael J. Schramm's Introduction to Real Analysis for my theory
But a problem book with varied questions on the concepts would help me a lot.
Please recommend some problem books.
Thanks
P.S : I have already asked my professor to recommend some books but he always recommends baby Rudin and also doesn't provide a lot of assignments. I am not compatible with Rudin's book. Also his tests are very tough as he wants us to cook up counter examples and I am very poor in that. So I need a good problem book to master real analysis.
real-analysis reference-request book-recommendation
asked 4 hours ago
Pratik Patnaik
185
add a comment |Â
up vote
2
down vote
favorite
up vote
2
down vote
favorite
So I am taking an analysis class in my university and I want a problem book for it.
The topics included in the teaching plan are
Real Numbers: Introduction to the real number field, supremum, infimum, completeness axiom, basic properties of real numbers, decimal expansion, construction of real numbers.
Sequences and Series: Convergence of a sequence, Cauchy sequences and subsequences, absolute and conditional convergence of an infinite series, Riemann's theorem, various tests of convergence.
Point-set Topology of: : Open and closed sets; interior, boundary and closure of a set; Bolzano-Weierstrass theorem; sequential definition of compactness and the Heine-Borel theorem.
Limit of a Function: Limit of a function, elementary properties of limits.
Continuity: Continuous functions, elementary properties of continuous functions, intermediate value theorem, uniform continuity, properties of continuous functions defined on compact sets, set of discontinuities.
I am already following up Michael J. Schramm's Introduction to Real Analysis for my theory
But a problem book with varied questions on the concepts would help me a lot.
Please recommend some problem books.
Thanks
P.S : I have already asked my professor to recommend some books but he always recommends baby Rudin and also doesn't provide a lot of assignments. I am not compatible with Rudin's book. Also his tests are very tough as he wants us to cook up counter examples and I am very poor in that. So I need a good problem book to master real analysis.
real-analysis reference-request book-recommendation
asked 4 hours ago
Pratik Patnaik
185
So I am taking an analysis class in my university and I want a problem book for it.
The topics included in the teaching plan are
Real Numbers: Introduction to the real number field, supremum, infimum, completeness axiom, basic properties of real numbers, decimal expansion, construction of real numbers.
Sequences and Series: Convergence of a sequence, Cauchy sequences and subsequences, absolute and conditional convergence of an infinite series, Riemann's theorem, various tests of convergence.
Point-set Topology of: : Open and closed sets; interior, boundary and closure of a set; Bolzano-Weierstrass theorem; sequential definition of compactness and the Heine-Borel theorem.
Limit of a Function: Limit of a function, elementary properties of limits.
Continuity: Continuous functions, elementary properties of continuous functions, intermediate value theorem, uniform continuity, properties of continuous functions defined on compact sets, set of discontinuities.
I am already following up Michael J. Schramm's Introduction to Real Analysis for my theory
But a problem book with varied questions on the concepts would help me a lot.
Please recommend some problem books.
Thanks
P.S : I have already asked my professor to recommend some books but he always recommends baby Rudin and also doesn't provide a lot of assignments. I am not compatible with Rudin's book. Also his tests are very tough as he wants us to cook up counter examples and I am very poor in that. So I need a good problem book to master real analysis.
real-analysis reference-request book-recommendation
real-analysis reference-request book-recommendation
asked 4 hours ago
Pratik Patnaik
185
asked 4 hours ago
Pratik Patnaik
185
asked 4 hours ago
Pratik Patnaik
185
asked 4 hours ago
Pratik Patnaik
185
asked 4 hours ago
Pratik Patnaik
185
185
add a comment |Â
add a comment |Â
2 Answers
2
active
oldest
votes
up vote
2
down vote
accepted
Try these books:
- Problems in Mathematical analysis I, II and III : W.J. Kaczor and M.T.Nowak
Book I deals with sequences and series, II deals with continuity and diffrentiabilty and III deals with integration
- A problem book in real analysis: Asuman G. Aksoy an Mohamed A. Kahmsi
This book contains $11$ chapters and it covers almost all topics in analysis
- Berkeley problems in Mathematics: P. N. D Souza and J. N. Silva
This book contains some interesting problems in Real analysis also!
For General Topology, try this:
- Elementary Topology
Problem Textbook: O. Ya. Viro, O. A. Ivanov, N. Yu. Netsvetaev and V. M. Kharlamov
You should also try the following for general topology. This book contain lot of problems with sufficient hints
- Topology of Metric spaces: Kumaresan
Enjoy!
answered 3 hours ago
Chinnapparaj R
3,037621
add a comment |Â
up vote
2
down vote
What follows are from my bookshelves, not from an extensive search, so it's likely you may find others by googling some of these titles. Although I've restricted this list to what you're actually asking for, I hope you realize that there have been well over 100 undergraduate level real analysis texts published in the last 50 some years, many of which are likely in your university library, and the problem sets (and text examples) in these books should not be overlooked if you later find yourself wanting to conduct an especially thorough search on a certain specific topic.
[1] Robert L. Brabenec, Resources for the Study of Real Analysis (2004)
[2] Raffi Grinberg, The Real Analysis Lifesaver (2017) [See my comments here.]
[3] W. J. Kaczor and M. T. Nowak, Problems in Mathematical Analysis I. Real Numbers, Sequences and Series (2000)
[4] W. J. Kaczor and M. T. Nowak, Problems in Mathematical Analysis II. Continuity and Differentiation (2001)
[5] W. J. Kaczor and M. T. Nowak, Problems in Mathematical Analysis III. Integration (2003)
[6] Sergiy Klymchuk, Counterexamples in Calculus (2010) [The title says "Calculus", but this book would also be useful in a beginning real analysis course.]
[7] B. M. Makarov, M. G. Goluzina, A. A. Lodkin, and A. N. Podkorytov, Selected Problems in Real Analysis (1992) [Most of this will be too advanced, but there are some problems in the first few chapters that might be appropriate.]
[8] Joanne E. Snow and Kirk E. Weller, Exploratory Examples for Real Analysis (2003)
[9] Murray R. Spiegel, Schaum’s Outline of Theory and Problems of Real Variables (1969)
answered 3 hours ago
Dave L. Renfro
23.2k33879
add a comment |Â
2 Answers
2
active
oldest
votes
2 Answers
2
active
oldest
votes
active
oldest
votes
active
oldest
votes
up vote
2
down vote
accepted
Try these books:
- Problems in Mathematical analysis I, II and III : W.J. Kaczor and M.T.Nowak
Book I deals with sequences and series, II deals with continuity and diffrentiabilty and III deals with integration
- A problem book in real analysis: Asuman G. Aksoy an Mohamed A. Kahmsi
This book contains $11$ chapters and it covers almost all topics in analysis
- Berkeley problems in Mathematics: P. N. D Souza and J. N. Silva
This book contains some interesting problems in Real analysis also!
For General Topology, try this:
- Elementary Topology
Problem Textbook: O. Ya. Viro, O. A. Ivanov, N. Yu. Netsvetaev and V. M. Kharlamov
You should also try the following for general topology. This book contain lot of problems with sufficient hints
- Topology of Metric spaces: Kumaresan
Enjoy!
answered 3 hours ago
Chinnapparaj R
3,037621
add a comment |Â
up vote
2
down vote
accepted
Try these books:
- Problems in Mathematical analysis I, II and III : W.J. Kaczor and M.T.Nowak
Book I deals with sequences and series, II deals with continuity and diffrentiabilty and III deals with integration
- A problem book in real analysis: Asuman G. Aksoy an Mohamed A. Kahmsi
This book contains $11$ chapters and it covers almost all topics in analysis
- Berkeley problems in Mathematics: P. N. D Souza and J. N. Silva
This book contains some interesting problems in Real analysis also!
For General Topology, try this:
- Elementary Topology
Problem Textbook: O. Ya. Viro, O. A. Ivanov, N. Yu. Netsvetaev and V. M. Kharlamov
You should also try the following for general topology. This book contain lot of problems with sufficient hints
- Topology of Metric spaces: Kumaresan
Enjoy!
answered 3 hours ago
Chinnapparaj R
3,037621
add a comment |Â
up vote
2
down vote
accepted
up vote
2
down vote
accepted
Try these books:
- Problems in Mathematical analysis I, II and III : W.J. Kaczor and M.T.Nowak
Book I deals with sequences and series, II deals with continuity and diffrentiabilty and III deals with integration
- A problem book in real analysis: Asuman G. Aksoy an Mohamed A. Kahmsi
This book contains $11$ chapters and it covers almost all topics in analysis
- Berkeley problems in Mathematics: P. N. D Souza and J. N. Silva
This book contains some interesting problems in Real analysis also!
For General Topology, try this:
- Elementary Topology
Problem Textbook: O. Ya. Viro, O. A. Ivanov, N. Yu. Netsvetaev and V. M. Kharlamov
You should also try the following for general topology. This book contain lot of problems with sufficient hints
- Topology of Metric spaces: Kumaresan
Enjoy!
answered 3 hours ago
Chinnapparaj R
3,037621
Try these books:
- Problems in Mathematical analysis I, II and III : W.J. Kaczor and M.T.Nowak
Book I deals with sequences and series, II deals with continuity and diffrentiabilty and III deals with integration
- A problem book in real analysis: Asuman G. Aksoy an Mohamed A. Kahmsi
This book contains $11$ chapters and it covers almost all topics in analysis
- Berkeley problems in Mathematics: P. N. D Souza and J. N. Silva
This book contains some interesting problems in Real analysis also!
For General Topology, try this:
- Elementary Topology
Problem Textbook: O. Ya. Viro, O. A. Ivanov, N. Yu. Netsvetaev and V. M. Kharlamov
You should also try the following for general topology. This book contain lot of problems with sufficient hints
- Topology of Metric spaces: Kumaresan
Enjoy!
answered 3 hours ago
Chinnapparaj R
3,037621
answered 3 hours ago
Chinnapparaj R
3,037621
answered 3 hours ago
Chinnapparaj R
3,037621
answered 3 hours ago
Chinnapparaj R
3,037621
3,037621
add a comment |Â
add a comment |Â
up vote
2
down vote
What follows are from my bookshelves, not from an extensive search, so it's likely you may find others by googling some of these titles. Although I've restricted this list to what you're actually asking for, I hope you realize that there have been well over 100 undergraduate level real analysis texts published in the last 50 some years, many of which are likely in your university library, and the problem sets (and text examples) in these books should not be overlooked if you later find yourself wanting to conduct an especially thorough search on a certain specific topic.
[1] Robert L. Brabenec, Resources for the Study of Real Analysis (2004)
[2] Raffi Grinberg, The Real Analysis Lifesaver (2017) [See my comments here.]
[3] W. J. Kaczor and M. T. Nowak, Problems in Mathematical Analysis I. Real Numbers, Sequences and Series (2000)
[4] W. J. Kaczor and M. T. Nowak, Problems in Mathematical Analysis II. Continuity and Differentiation (2001)
[5] W. J. Kaczor and M. T. Nowak, Problems in Mathematical Analysis III. Integration (2003)
[6] Sergiy Klymchuk, Counterexamples in Calculus (2010) [The title says "Calculus", but this book would also be useful in a beginning real analysis course.]
[7] B. M. Makarov, M. G. Goluzina, A. A. Lodkin, and A. N. Podkorytov, Selected Problems in Real Analysis (1992) [Most of this will be too advanced, but there are some problems in the first few chapters that might be appropriate.]
[8] Joanne E. Snow and Kirk E. Weller, Exploratory Examples for Real Analysis (2003)
[9] Murray R. Spiegel, Schaum’s Outline of Theory and Problems of Real Variables (1969)
answered 3 hours ago
Dave L. Renfro
23.2k33879
add a comment |Â
up vote
2
down vote
What follows are from my bookshelves, not from an extensive search, so it's likely you may find others by googling some of these titles. Although I've restricted this list to what you're actually asking for, I hope you realize that there have been well over 100 undergraduate level real analysis texts published in the last 50 some years, many of which are likely in your university library, and the problem sets (and text examples) in these books should not be overlooked if you later find yourself wanting to conduct an especially thorough search on a certain specific topic.
[1] Robert L. Brabenec, Resources for the Study of Real Analysis (2004)
[2] Raffi Grinberg, The Real Analysis Lifesaver (2017) [See my comments here.]
[3] W. J. Kaczor and M. T. Nowak, Problems in Mathematical Analysis I. Real Numbers, Sequences and Series (2000)
[4] W. J. Kaczor and M. T. Nowak, Problems in Mathematical Analysis II. Continuity and Differentiation (2001)
[5] W. J. Kaczor and M. T. Nowak, Problems in Mathematical Analysis III. Integration (2003)
[6] Sergiy Klymchuk, Counterexamples in Calculus (2010) [The title says "Calculus", but this book would also be useful in a beginning real analysis course.]
[7] B. M. Makarov, M. G. Goluzina, A. A. Lodkin, and A. N. Podkorytov, Selected Problems in Real Analysis (1992) [Most of this will be too advanced, but there are some problems in the first few chapters that might be appropriate.]
[8] Joanne E. Snow and Kirk E. Weller, Exploratory Examples for Real Analysis (2003)
[9] Murray R. Spiegel, Schaum’s Outline of Theory and Problems of Real Variables (1969)
answered 3 hours ago
Dave L. Renfro
23.2k33879
add a comment |Â
up vote
2
down vote
up vote
2
down vote
What follows are from my bookshelves, not from an extensive search, so it's likely you may find others by googling some of these titles. Although I've restricted this list to what you're actually asking for, I hope you realize that there have been well over 100 undergraduate level real analysis texts published in the last 50 some years, many of which are likely in your university library, and the problem sets (and text examples) in these books should not be overlooked if you later find yourself wanting to conduct an especially thorough search on a certain specific topic.
[1] Robert L. Brabenec, Resources for the Study of Real Analysis (2004)
[2] Raffi Grinberg, The Real Analysis Lifesaver (2017) [See my comments here.]
[3] W. J. Kaczor and M. T. Nowak, Problems in Mathematical Analysis I. Real Numbers, Sequences and Series (2000)
[4] W. J. Kaczor and M. T. Nowak, Problems in Mathematical Analysis II. Continuity and Differentiation (2001)
[5] W. J. Kaczor and M. T. Nowak, Problems in Mathematical Analysis III. Integration (2003)
[6] Sergiy Klymchuk, Counterexamples in Calculus (2010) [The title says "Calculus", but this book would also be useful in a beginning real analysis course.]
[7] B. M. Makarov, M. G. Goluzina, A. A. Lodkin, and A. N. Podkorytov, Selected Problems in Real Analysis (1992) [Most of this will be too advanced, but there are some problems in the first few chapters that might be appropriate.]
[8] Joanne E. Snow and Kirk E. Weller, Exploratory Examples for Real Analysis (2003)
[9] Murray R. Spiegel, Schaum’s Outline of Theory and Problems of Real Variables (1969)
answered 3 hours ago
Dave L. Renfro
23.2k33879
What follows are from my bookshelves, not from an extensive search, so it's likely you may find others by googling some of these titles. Although I've restricted this list to what you're actually asking for, I hope you realize that there have been well over 100 undergraduate level real analysis texts published in the last 50 some years, many of which are likely in your university library, and the problem sets (and text examples) in these books should not be overlooked if you later find yourself wanting to conduct an especially thorough search on a certain specific topic.
[1] Robert L. Brabenec, Resources for the Study of Real Analysis (2004)
[2] Raffi Grinberg, The Real Analysis Lifesaver (2017) [See my comments here.]
[3] W. J. Kaczor and M. T. Nowak, Problems in Mathematical Analysis I. Real Numbers, Sequences and Series (2000)
[4] W. J. Kaczor and M. T. Nowak, Problems in Mathematical Analysis II. Continuity and Differentiation (2001)
[5] W. J. Kaczor and M. T. Nowak, Problems in Mathematical Analysis III. Integration (2003)
[6] Sergiy Klymchuk, Counterexamples in Calculus (2010) [The title says "Calculus", but this book would also be useful in a beginning real analysis course.]
[7] B. M. Makarov, M. G. Goluzina, A. A. Lodkin, and A. N. Podkorytov, Selected Problems in Real Analysis (1992) [Most of this will be too advanced, but there are some problems in the first few chapters that might be appropriate.]
[8] Joanne E. Snow and Kirk E. Weller, Exploratory Examples for Real Analysis (2003)
[9] Murray R. Spiegel, Schaum’s Outline of Theory and Problems of Real Variables (1969)
answered 3 hours ago
Dave L. Renfro
23.2k33879
answered 3 hours ago
Dave L. Renfro
23.2k33879
answered 3 hours ago
Dave L. Renfro
23.2k33879
answered 3 hours ago
Dave L. Renfro
23.2k33879
23.2k33879
add a comment |Â
add a comment |Â
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