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001			9780429027758
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006			m o d
007			cr cnu|||unuuu
008			190207s2019 si ob 001 0 eng d
040			_aOCoLC-P _beng _erda _epn _cOCoLC-P
020			_a9780429027758 _q(electronic bk.)
020			_a0429027753 _q(electronic bk.)
020			_a9780429648304 _q(electronic bk.)
020			_a0429648308 _q(electronic bk.)
020			_a9780429645662 _q(electronic bk. : Mobipocket)
020			_a042964566X _q(electronic bk. : Mobipocket)
020			_a9780429650949 _q(electronic bk. : PDF)
020			_a0429650949 _q(electronic bk. : PDF)
020			_z9789814800020
020			_z9814800023
035			_a(OCoLC)1084726834 _z(OCoLC)1085152548
035			_a(OCoLC-P)1084726834
050		4	_aTP248.25.N35
072		7	_aSCI _x013060 _2bisacsh
072		7	_aTEC _x009010 _2bisacsh
072		7	_aSCI _x050000 _2bisacsh
072		7	_aSCI _x055000 _2bisacsh
072		7	_aTEC _x008080 _2bisacsh
072		7	_aTBN _2bicssc
082	0	4	_a660.6 _223
100	1		_aSia, Paolo Di, _eauthor. _910891
245	1	0	_aMathematics and physics for nanotechnology : _btechnical tools and modelling / _cPaolo Di Sia.
264		1	_aSingapore : _bPan Stanford, _c[2019]
264		4	_c©2019
300			_a1 online resource.
336			_atext _btxt _2rdacontent
337			_acomputer _bc _2rdamedia
338			_aonline resource _bcr _2rdacarrier
505	0		_aCover; Half Title; Title Page; Copyright Page; Table of Contents; Preface; 1: Introduction; 1.1 The Nanotechnologies World; 1.2 Classification of Nanostructures; 1.3 Applications of Nanotechnologies; 1.4 Applied Mathematics and Nanotechnology; 1.5 Spintronics, Information Technologies and Nanotechnology; 1.5.1 Spin Decoherence in Electronic Materials; 1.5.2 Transport of Polarised Spin in Hybrid Semiconductor Structures; 1.5.3 Spin-Based Solid State Quantum Computing; 1.5.4 Spin Entanglement in Solids; 1.5.5 Optical and Electronic Control of Nuclear Spin Polarisation
505	8		_a1.5.6 Physics of Computation1.5.7 Quantum Signal Propagation in Nanosystems; 2: Vector Analysis; 2.1 Vectors and Scalars; 2.2 Direction Angles and Direction Cosines; 2.3 Equality of Vectors; 2.4 Vector Addition and Subtraction; 2.5 Multiplication by a Scalar; 2.6 Scalar Product; 2.7 Vector Product; 2.8 Triple Scalar Product; 2.9 Triple Vector Product; 2.10 Linear Vector Space V; 3: Vector Differentiation; 3.1 Introduction; 3.2 The Gradient Operator; 3.3 Directional Derivative; 3.4 The Divergence Operator; 3.5 The Laplacian Operator; 3.6 The Curl Operator
505	8		_a3.7 Formulas Involving the Nabla Operator4: Coordinate Systems and Important Theorems; 4.1 Orthogonal Curvilinear Coordinates; 4.2 Special Orthogonal Coordinate Systems; 4.2.1 Cylindrical Coordinates; 4.2.2 Spherical Coordinates; 4.3 Vector Integration and Integral Theorems; 4.4 Gauss Theorem; 4.5 Stokes Theorem; 4.6 Green Theorem; 4.7 Helmholtz Theorem; 4.8 Useful Integral Relations; 5: Ordinary Differential Equations; 5.1 Introduction; 5.2 Separable Variables; 5.3 First-Order Linear Equation; 5.4 Bernoulli Equations; 5.5 Second-Order Linear Equations with Constant Coefficients
505	8		_a5.5.1 Homogeneous Linear Equations with Constant Coefficients5.5.2 Non-homogeneous Linear Equations with Constant Coefficients; 5.6 An Introduction to Differential Equations with Order k > 2; 6: Fourier Series and Integrals; 6.1 Periodic Functions; 6.2 Fourier Series; 6.3 Euler-Fourier Formulas; 6.4 Half-Range Fourier Series; 6.5 Change of Interval; 6.6 Parseval's Identity; 6.7 Integration and Differentiation of a Fourier Series; 6.8 Multiple Fourier Series; 6.9 Fourier Integrals and Fourier Transforms; 6.10 Fourier Transforms for Functions of Several Variables
505	8		_a7: Functions of One Complex Variable7.1 Complex Numbers; 7.2 Basic Operations with Complex Numbers; 7.3 Polar Form of a Complex Number; 7.4 De Moivre's Theorem and Roots of Complex Numbers; 7.5 Functions of a Complex Variable; 7.6 Limits and Continuity; 7.7 Derivatives and Analytic Functions; 7.8 Cauchy-Riemann Conditions; 7.9 Harmonic Functions; 7.10 Singular Points; 7.11 Complex Elementary Functions; 8: Complex Integration; 8.1 Line Integrals in the Complex Plane; 8.2 Cauchy's Integral Theorem; 8.3 Cauchy's Integral Formula; 8.4 Series Representations of Analytic Functions
520			_aNanobiotechnology is a new interdisciplinary science with revolutionary perspectives arising from the fact that at nanosize the behaviour and characteristics of matter change with respect to ordinary macroscopic dimensions. Nanotechnology is a new way for producing and getting materials, structures and devices with greatly improved or completely new properties and functionalities. This book provides an introductory overview of the nanobiotechnology world along with a general technical framework about mathematical modelling through which we today study the phenomena of charge transport at the nanometer level. Although it is not a purely mathematics or physics book, it introduces the basic mathematical and physical notions that are important and necessary for theory and applications in nanobiotechnology. Therefore, it can be considered an extended formulary of basic and advanced concepts. It can be the starting point for discussions and insights and can be used for further developments in mathematical-physical modelling linked to the nanobiotechnology world. The book is dedicated to all those who follow their ideas in life and pursue their choices with determination and firmness, in a free and independent way.
588			_aOCLC-licensed vendor bibliographic record.
650		0	_aNanobiotechnology. _96098
650		0	_aNanotechnology. _94707
650		7	_aSCIENCE / Chemistry / Industrial & Technical. _2bisacsh _910892
650		7	_aTECHNOLOGY & ENGINEERING / Chemical & Biochemical. _2bisacsh _95098
650		7	_aSCIENCE / Nanostructures _2bisacsh _910893
650		7	_aSCIENCE / Physics _2bisacsh _910678
650		7	_aTECHNOLOGY / Electronics / Optoelectronics _2bisacsh _910894
856	4	0	_3Taylor & Francis _uhttps://www.taylorfrancis.com/books/9780429027758
856	4	2	_3OCLC metadata license agreement _uhttp://www.oclc.org/content/dam/oclc/forms/terms/vbrl-201703.pdf
942			_cEBK
999			_c69825 _d69825