Hi Sir hope you are having great time. I have a question regarding fixed point. In context of a function fixed point is defined as f(x) = x or standard notion is T(x)=x as given by Banach fixed point theorem. But in context of dynamical system when we use the word fixed point it seems that it doesn't relate to definition T(x) = x but rather we say that fixed point is where the derivative is zero. So my question is that does the word fixed point meaning differs in both contexts or is there any analogy.
GRAZIE ICTP per rendere questi corsi disponibili online. GRAZIE.
Excellent lecture!
Hi Sir hope you are having great time. I have a question regarding fixed point. In context of a function fixed point is defined as f(x) = x or standard notion is T(x)=x as given by Banach fixed point theorem. But in context of dynamical system when we use the word fixed point it seems that it doesn't relate to definition T(x) = x but rather we say that fixed point is where the derivative is zero. So my question is that does the word fixed point meaning differs in both contexts or is there any analogy.
What are the perquisites for this course?
Analysis 1, 2, Linear Algebra, Physics
I wish you mentioned the topics taught too
Dear Dr. Stefano
Would you kindly provide link to the lecture notes of this course ?
www.stefanoluzzatto.net/teaching.html
Does anyone know the prerequisite for this class?
Calculus , Math Analysis, Functional Analysis, Linear Algebra , Engineering Dynamics
Also, basic course in topology will help
Any Reference Book for this course lectures???
Conoscendo analisi 1,2, misura di lebesgue, algebra lineare e un poco di topologia, sono pronto per sto corso?
Ofcourse my friend.
@@weknowitistrue well your name tells me i can trust you, so...
is there a MOOC for dynamical systems?
www.complexityexplorer.org/courses
can i have the books pdf of this course
same here.
same here ;)
Does this course follow a text?
people.maths.bris.ac.uk/~ip13935/dyn/SLI.pdf
Thanks
love
29:33 1:04:35