Mathematical Analysis: A Special Course covers the fundamentals, principles, and theories that make up mathematical analysis. The title first provides an account of set theory, and then proceeds to detailing the elements of the theory of metric and normed linear spaces. Next, the selection covers the calculus of variations, along with the theory of Lebesgue integral. The text also tackles the geometry of Hilbert space and the relation between integration and differentiation. The last chapter of the title talks about the Fourier transform. The book will be of great use to individuals who want to expand and enhance their understanding of mathematical analysis.As in the case of a string, the uniqueness of the solution to the problem subject to the initial and boundary conditions follows from a consideration of the energy integral. The actual construction of ... condition 02 To: (k wrx) = f(a). In particular a anbsp;...
|Author||:||G. Ye. Shilov|
|Publisher||:||Elsevier - 2014-05-16|