It takes the average reader 3 hours and 37 minutes to read Asymptotic Methods for Investigating Quasiwave Equations of Hyperbolic Type by Yuri A. Mitropolsky
Assuming a reading speed of 250 words per minute. Learn more
The theory of partial differential equations is a wide and rapidly developing branch of contemporary mathematics. Problems related to partial differential equations of order higher than one are so diverse that a general theory can hardly be built up. There are several essentially different kinds of differential equations called elliptic, hyperbolic, and parabolic. Regarding the construction of solutions of Cauchy, mixed and boundary value problems, each kind of equation exhibits entirely different properties. Cauchy problems for hyperbolic equations and systems with variable coefficients have been studied in classical works of Petrovskii, Leret, Courant, Gording. Mixed problems for hyperbolic equations were considered by Vishik, Ladyzhenskaya, and that for general two dimensional equations were investigated by Bitsadze, Vishik, Gol'dberg, Ladyzhenskaya, Myshkis, and others. In last decade the theory of solvability on the whole of boundary value problems for nonlinear differential equations has received intensive development. Significant results for nonlinear elliptic and parabolic equations of second order were obtained in works of Gvazava, Ladyzhenskaya, Nakhushev, Oleinik, Skripnik, and others. Concerning the solvability in general of nonlinear hyperbolic equations, which are connected to the theory of local and nonlocal boundary value problems for hyperbolic equations, there are only partial results obtained by Bronshtein, Pokhozhev, Nakhushev.
Asymptotic Methods for Investigating Quasiwave Equations of Hyperbolic Type by Yuri A. Mitropolsky is 214 pages long, and a total of 54,356 words.
This makes it 72% the length of the average book. It also has 66% more words than the average book.
The average oral reading speed is 183 words per minute. This means it takes 4 hours and 57 minutes to read Asymptotic Methods for Investigating Quasiwave Equations of Hyperbolic Type aloud.
Asymptotic Methods for Investigating Quasiwave Equations of Hyperbolic Type is suitable for students ages 12 and up.
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