It takes the average reader 6 hours and 40 minutes to read Dichotomies and Stability in Nonautonomous Linear Systems by Yu. A. Mitropolsky
Assuming a reading speed of 250 words per minute. Learn more
Linear nonautonomous equations arise as mathematical models in mechanics, chemistry, and biology. The investigation of bounded solutions to systems of differential equations involves some important and challenging problems of perturbation theory for invariant toroidal manifolds. This monograph is a detailed study of the application of Lyapunov functions with variable sign, expressed in quadratic forms, to the solution of this problem. The authors explore the preservation of invariant tori of dynamic systems under perturbation. This volume is a classic contribution to the literature on stability theory and provides a useful source of reference for postgraduates and researchers.
Dichotomies and Stability in Nonautonomous Linear Systems by Yu. A. Mitropolsky is 394 pages long, and a total of 100,076 words.
This makes it 133% the length of the average book. It also has 122% more words than the average book.
The average oral reading speed is 183 words per minute. This means it takes 9 hours and 6 minutes to read Dichotomies and Stability in Nonautonomous Linear Systems aloud.
Dichotomies and Stability in Nonautonomous Linear Systems is suitable for students ages 12 and up.
Note that there may be other factors that effect this rating besides length that are not factored in on this page. This may include things like complex language or sensitive topics not suitable for students of certain ages.
When deciding what to show young students always use your best judgement and consult a professional.
Dichotomies and Stability in Nonautonomous Linear Systems by Yu. A. Mitropolsky is sold by several retailers and bookshops. However, Read Time works with Amazon to provide an easier way to purchase books.
To buy Dichotomies and Stability in Nonautonomous Linear Systems by Yu. A. Mitropolsky on Amazon click the button below.
Buy Dichotomies and Stability in Nonautonomous Linear Systems on Amazon