I have been using this book as a reference for my Intro PDEs course this semester. It is pretty good and has some good preliminary chapters. However, for a modern PDEs course you probably want a book with tons of examples and practice problems. For this I would suggest "Partial Differential Equations - Theory and Completely Solved Problems" by Hillen, Leonard, and Roessel. Close to 300 pages of the book are dedicated to completely solved practice problems, and it also has some real Midterm and Final exams used in courses at the University of Alberta. Regardless, Dover books are always a great choice as well 👍
It is nice to see this video about the only PDE book I have.. I like a lot the first chapter of recap of some concepts of Calc III, because I was (and still I am) week in multivariable calculus, and helped me a lot to understand some concept.
I bought a few from Dover, they tend to be the bottom end in price range but you tend to get a lot of content for the money (At least here in Northern England) The Oxford masters series tend to be good quality and good value for money too. I hope that a lot more progress is made in areas like cold Rydberg atoms and some good books start coming out on the subject
My favorite Math subject but I never saw this book. I have Dover books well over 60 years old and they are fine - as good as hard bounds if you don't get anything on the covers. I studied Physics and then got a EE . Partial Diffs and Matrix algebra are my go to skills for design but they have great tools now -
Brings back memories of my engineering undergrad which didn't require a specific course on PDEs, but, man, were they prominent in nearly every engineering class. The irony is that while all my classes in heat, fluids, thermo, etc. liked to spend time discussing the theory, they invariably and quickly devolved into empirical approximations because PDEs are basically impossible to solve for real world applications. I imagine that is why they're not stressed very much as a discipline.
Hey sir, I just want to give a list of book that might be interesting to you. -An Introduction to The Theory of Numbers - Niven & Zuckerman -Introduction to Calculus - Kuratowski -Deductive Logic - Goldfarb -Differential and Integral Calculus - Courant -Introduction to Probability Theory and Statistical Inference - Larson -Geometry - Down -Theory of Functions - Caratheodory -A Survey of Modern Algebra - Birkhoff & MacLane -Algebra - Birkhoff & MacLane -Advanced Calculus - Sokolnikoff -Theory of Ordinary Differential Equations - Coddinton -Partial Differential Equations - John -Mathematical Analysis I&II - Zorich -Real Analysis - Yeh -Advanced Calculus - Sternberg - Differential Geometry - Stoker -Introduction to Mathematical Logic - Mendelson - Introduction to Set Theory - Monk -Linear Algebra - Greub - Measure Theory - Bogachev -Topology - Dugundji -An introduction to complex analysis in several variables - Hormander -Introduction to mathematical statistics - Hoel -Introduction to mathematical statistics - Schmetterer -Theory of Sets - Bourbaki -Algebra I&II - Bourbaki -Principles of Mathematical Logic - Hilbert -Theory of Partial Differential Equations - Lieberstein -Tensor Analysis - Sokolnikoff -Modern College Algebra - Vance -Modern Algebra and Trigonometry - Vance -Foundations of Analysis - Landau All of these are advanced maths books. At least take some time checking some of these books😊
That book is a long way more pedagogical text than Strauss book. pdes is a huge subject and this book was written when there was not a standard book or well accepted text book for pdes. So each school has its own textbook. That was the pdes textbook at Purdue. Excellent book.
Awesome first. I've always wondered what the would look like if the emphasis was placed on teaching students to the highest possible level as opposed to running them through the ringer. Maybe I'm just getting old 😞.
Have you even done an open university course books review? The open university (Milton Keynes) create's its own course books for all it's degrees. I'm not sure if you are aware of the university, but it's a distance learning university and one of the biggest universities in the world. Though the university itself is a research university, the undergraduate and masters are all online distance learning.
I have never come across an applied mathematics (Mathematical modeling) book that was really extensive, the ones I have come across tend to be applications to particular fields. I wonder if there's a monster mathematical modelling book that goes from financial mathematics, computer science to mathematical physics and biology etc? You know, "one book to rule them all" A kind of old school type encyclopedia Britannica but for modern mathematics 🤷
Was it covered in any text why we only partially differentiate the equation? I'll assume that since it's a subject that there's some use for only a part of the vehicle and not the entire bus. Maybe the Zill text mentioned it in the first pages of the PDE chapter? Does differentiating only partially pose any problems for any applications? Maybe this book explains some of these questions.
@@Kitty_Kankles not so much the vector, but we did part. deriv.s in the DE class. Too often, the books (or when the school doesn't have a teacher like mine didn't) don't explain what's going on, just barely how to do it. So, as usual, once I'm familiar with a concept, I like to reverse engineer both its history and actual function.
Hi there. I’ve just recently found your channel and I’m loving it. As someone who has just recently went back into education to learn/improve on my math do you have a top 5 or 10 books that cover various branches of Mathematics?
have you tried stewart single variable and multivariable calc yet? i recently got back into math and doing that book front to back (literally 20 odd chapters was very helpful)
Dover books today are garbage. The binding is terrible. The paper is thin. The cover design is horrible. The blurbs are full of typos. The "corrections" introduce new errors. Do not buy them. It's easy to tell: if the ISBN is not on the spine, burn it. The one you're holding is one of the good ones though. They used to be great. They were sewn in signatures, they were (actually) printed on acid-free paper, they had great cover designers. Today they are trash. They even rewrite the back cover blurbs and introduce new typos like "modem era" instead of "modern era". They are barely one notch above Amazon's createspace print on demand garbage. And don't even get me started on Springer math books quality nowadays.
Honestly, my experience with older books isnt great. They are a harder read compared to modern texts as naturally, methods of presenting material gets better over time.
I remember being 20 years old and studying this book by candle light since a storm knocked out the power. Exciting times!
Dude, that's like the sickest thing I've read in months
I have been using this book as a reference for my Intro PDEs course this semester. It is pretty good and has some good preliminary chapters. However, for a modern PDEs course you probably want a book with tons of examples and practice problems. For this I would suggest "Partial Differential Equations - Theory and Completely Solved Problems" by Hillen, Leonard, and Roessel. Close to 300 pages of the book are dedicated to completely solved practice problems, and it also has some real Midterm and Final exams used in courses at the University of Alberta. Regardless, Dover books are always a great choice as well 👍
Thanks! That book is awesome!
NOW this is epic, thanks boss I’m totally going to go crush some PDES!!!
It is nice to see this video about the only PDE book I have..
I like a lot the first chapter of recap of some concepts of Calc III, because I was (and still I am) week in multivariable calculus, and helped me a lot to understand some concept.
I bought a few from Dover, they tend to be the bottom end in price range but you tend to get a lot of content for the money (At least here in Northern England) The Oxford masters series tend to be good quality and good value for money too. I hope that a lot more progress is made in areas like cold Rydberg atoms and some good books start coming out on the subject
My favorite Math subject but I never saw this book. I have Dover books well over 60 years old and they are fine - as good as hard bounds if you don't get anything on the covers. I studied Physics and then got a EE . Partial Diffs and Matrix algebra are my go to skills for design but they have great tools now -
I saw this book in another video of yours. I was waiting for a review of this book!!!
Brings back memories of my engineering undergrad which didn't require a specific course on PDEs, but, man, were they prominent in nearly every engineering class. The irony is that while all my classes in heat, fluids, thermo, etc. liked to spend time discussing the theory, they invariably and quickly devolved into empirical approximations because PDEs are basically impossible to solve for real world applications. I imagine that is why they're not stressed very much as a discipline.
Hey sir, I just want to give a list of book that might be interesting to you.
-An Introduction to The Theory of Numbers - Niven & Zuckerman
-Introduction to Calculus - Kuratowski
-Deductive Logic - Goldfarb
-Differential and Integral Calculus - Courant
-Introduction to Probability Theory and Statistical Inference - Larson
-Geometry - Down
-Theory of Functions - Caratheodory
-A Survey of Modern Algebra - Birkhoff & MacLane
-Algebra - Birkhoff & MacLane
-Advanced Calculus - Sokolnikoff
-Theory of Ordinary Differential Equations - Coddinton
-Partial Differential Equations - John
-Mathematical Analysis I&II - Zorich
-Real Analysis - Yeh
-Advanced Calculus - Sternberg
- Differential Geometry - Stoker
-Introduction to Mathematical Logic - Mendelson
- Introduction to Set Theory - Monk
-Linear Algebra - Greub
- Measure Theory - Bogachev
-Topology - Dugundji
-An introduction to complex analysis in several variables - Hormander
-Introduction to mathematical statistics - Hoel
-Introduction to mathematical statistics - Schmetterer
-Theory of Sets - Bourbaki
-Algebra I&II - Bourbaki
-Principles of Mathematical Logic - Hilbert
-Theory of Partial Differential Equations - Lieberstein
-Tensor Analysis - Sokolnikoff
-Modern College Algebra - Vance
-Modern Algebra and Trigonometry - Vance
-Foundations of Analysis - Landau
All of these are advanced maths books.
At least take some time checking some of these books😊
GOOD BOOK .I USED IT IN , BELIEVE IT, IN THERMODYNAMICS BECAUSE THE BOOK TREATS PFAFF EQUATIONS WHICH ARE THE BASIS OF TREATMENT SECOND LAW
i have this book. everything in physics is PDE . thanks for the review!
That book is a long way more pedagogical text than Strauss book. pdes is a huge subject and this book was written when there was not a standard book or well accepted text book for pdes. So each school has its own textbook. That was the pdes textbook at Purdue. Excellent book.
Great episode. Dover books are really good. Also, graduate level Physics.
Awesome first. I've always wondered what the would look like if the emphasis was placed on teaching students to the highest possible level as opposed to running them through the ringer. Maybe I'm just getting old 😞.
Have you even done an open university course books review? The open university (Milton Keynes) create's its own course books for all it's degrees. I'm not sure if you are aware of the university, but it's a distance learning university and one of the biggest universities in the world. Though the university itself is a research university, the undergraduate and masters are all online distance learning.
I have never come across an applied mathematics (Mathematical modeling) book that was really extensive, the ones I have come across tend to be applications to particular fields. I wonder if there's a monster mathematical modelling book that goes from financial mathematics, computer science to mathematical physics and biology etc? You know, "one book to rule them all" A kind of old school type encyclopedia Britannica but for modern mathematics 🤷
I’m soooo far away from this! I’m watching nonetheless!
Thank you, i will check the book and would be happy if you make PDE playlist
Was it covered in any text why we only partially differentiate the equation? I'll assume that since it's a subject that there's some use for only a part of the vehicle and not the entire bus. Maybe the Zill text mentioned it in the first pages of the PDE chapter? Does differentiating only partially pose any problems for any applications? Maybe this book explains some of these questions.
Are you familiar with vector calculus and or/ multivariable calc?
A partial derivative is a derivative taken in 3 dimensional space
@@Kitty_Kankles not so much the vector, but we did part. deriv.s in the DE class. Too often, the books (or when the school doesn't have a teacher like mine didn't) don't explain what's going on, just barely how to do it. So, as usual, once I'm familiar with a concept, I like to reverse engineer both its history and actual function.
Cool thanks for reviewing this book. I have this Dover edition.
Could you do a review of the physic books of chris Mcmullen?
Yeah I should do that!!
Does it include using Green's Functions to solve PDEs?
Do you by chance have "Set Theory and Logic" by Robert R. Stoll?
Differential Equations Engineering should be the next book
Hi there. I’ve just recently found your channel and I’m loving it. As someone who has just recently went back into education to learn/improve on my math do you have a top 5 or 10 books that cover various branches of Mathematics?
have you tried stewart single variable and multivariable calc yet? i recently got back into math and doing that book front to back (literally 20 odd chapters was very helpful)
@@musicballfun I haven’t but I will take a look. Thank you!
I need this book
Is it available online ?
How I can get it?
Cheer~~~~a tendency or partiality of a particular kind.😊
Oh! Great! My next two subjects are PDEs and SPDEs ! Thanks
"No professor, i want to see the Whole DE" new student
Great thank you and plesed we ned mor reivew in deffreanal equation books realy thanhs eng sherif
Excellent book
I have that book !!!!
It says corrected not correct
What are your thoughts on Oofy Doofy Theory?
Thx you
I was thinking yesterday of buying this book 😅
Dover books today are garbage. The binding is terrible. The paper is thin. The cover design is horrible. The blurbs are full of typos. The "corrections" introduce new errors. Do not buy them. It's easy to tell: if the ISBN is not on the spine, burn it. The one you're holding is one of the good ones though. They used to be great. They were sewn in signatures, they were (actually) printed on acid-free paper, they had great cover designers. Today they are trash. They even rewrite the back cover blurbs and introduce new typos like "modem era" instead of "modern era". They are barely one notch above Amazon's createspace print on demand garbage. And don't even get me started on Springer math books quality nowadays.
Honestly, my experience with older books isnt great. They are a harder read compared to modern texts as naturally, methods of presenting material gets better over time.
If it's Dover, it's crap!
Here to see if I can find a good book for Dirichlet and Neuman boundary conditions 🥲🥲