Numerical calculus: approximations, interpolation, finite differences, numerical integration and curve fitting

Preprint Draft, 2012. — 41 pages.<br/>Table of Contents.<br/><strong>Finite Differences and Differential Equations</strong>.<br/>Finite Difference Approximation.<br/>The Green’s Function Comparison.<br/>The Role of Interpolation.<br/>Integration by Terms.<br/><strong>Interpolating Polynomials and In

<p><p>This book provides a comprehensive and unified introduction to stochastic differential equations and related optimal control problems. The material is new and the presentation is reader-friendly. A major contribution of the book is the development of generalized Malliavin calculus in the frame

<p>Classical boundary integral equations arising from the potential theory and acoustics (Laplace and Helmholtz equations) are derived. Using the parametrization of the boundary these equations take a form of periodic pseudodifferential equations. A general theory of periodic pseudodifferential equa

<span><p>An attractive book on the intersection of analysis and numerical analysis, deriving classical boundary integral equations arising from the potential theory and acoustics. This self-contained monograph can be used as a textbook by graduate/postgraduate students. It also contains a lot of car