Functional analysis for physics and engi
β Shima H
π Library
π
2016
π CRC
π English
β¦ LIBER β¦
π
Functional Analysis for Physics and Engineering
β Scribed by Shima, Hiroyuki
- Publisher
- CRC Press
- Year
- 2016
- Tongue
- English
- Leaves
- 282
- Category
- Library
β¬ Acquire This Volume
No coin nor oath required. For personal study only.
β¦ Table of Contents
Content: Prologue What Functional Analysis tells usFrom perspective of the limit From perspective of infinite dimension From perspective of quantum mechanical theoryTopology Fundamentals Continuous mapping Homeomorphism Vector spaceWhat is vector space?Property of vector spaceHierarchy of vector spaceHilbert spaceBasis and completenessEquivalence of L2 spaces with Γ’ 2 spacesTensor spaceTwo faces of one tensor"Vector" as a linear functionTensor as a multilinear functionComponent of tensorLebesgue integralMotivation & MeritsMeasure theoryLebesgue integralLebesgue convergence theoremLp spaceWavelet Continuous wavelet analysis Discrete wavelet analysis Wavelet space Distribution Motivation & Merits Establishing the concept of distribution Examples of distribution Mathematical manipulation of distribution Completion Completion of number space Sobolev space Operator Classification of operators Essence of operator theory Preparation toward eigenvalue-like problem Practical importance of non-continuous operators Real number sequenceA.1 Convergence of real sequenceA.2 Bounded sequenceA.3 Uniqueness of the limit of real sequence Cauchy sequenceB.1 What is Cauchy sequence?B.2 Cauchy criterion for real number sequence Real number seriesC.1 Limit of real number seriesC.2 Cauchy criterion for real number seriesContinuity and smoothness of function D.1 Limit of function D.2 Continuity of function D.3 Derivative of function D.4 Smooth functionFunction sequenceE.1 Pointwise convergenceE.2 Uniform convergenceE.3 Cauchy criterion for function seriesF Uniformly convergent sequence of functionsF.1 Continuity of the limit functionF.2 Integrability of the limit functionF.3 Differentiability of the limit functionG Function seriesG.1 Infinite series of functionsG.2 Properties of uniformly convergent series of functionsH Matrix eigenvalue problemH.1 Eigenvalue and eigenvectorH.2 Hermite matrixI Eigenspace decompositionI.1 Eigenspace of matrixI.2 Direct sum decompositionIndex
β¦ Subjects
ΠΠ°ΡΠ΅ΠΌΠ°ΡΠΈΠΊΠ°;Π€ΡΠ½ΠΊΡΠΈΠΎΠ½Π°Π»ΡΠ½ΡΠΉ Π°Π½Π°Π»ΠΈΠ·;
π SIMILAR VOLUMES
Functional Analysis for Physics and Engi
β Shima H.
π Library
π English
Boca Raton: CRC Press, 2015. - 282p.<div class="bb-sep"></div>This book provides an introduction to functional analysis for non-experts in mathematics. As such, it is distinct from most other books on the subject that are intended for mathematicians. Concepts are explained concisely with visual mate
Functional Analysis, Calculus of Variati
β Fabio Silva Botelho
π Library
π
2020
π CRC Press
π English
The book discusses basic concepts of functional analysis, measure and integration theory, calculus of variations and duality and its applications to variational problems of non-convex nature, such as the Ginzburg-Landau system in superconductivity, shape optimization models, dual variational formula
Functional and structured tensor analysi
β Brannon R.
π Library
π
2003
π English
Linear Functional Analysis for Scientist
β Limaye, Balmohan V
π Library
π
2016
π Springer
π English
<div>This book provides a concise and meticulous introduction to functional analysis. Since the topic draws heavily on the interplay between the algebraic structure of a linear space and the distance structure of a metric space, functional analysis is increasingly gaining the attention of not only m
Functional and Structured Tensor Analysi
β Brannon R.M.
π Library
π
2003
π English
Elementary vector and tensor analysis concepts are reviewed in a manner that proves useful for higher-order tensor analysis of anisotropic media. In addition to reviewing basic matrix and vector analysis, the concept of a tensor is covered by reviewing and contrasting numerous different definition o