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2020-10-21 16:32 來(lái)源：京東作者：京東

內(nèi)容簡(jiǎn)介:　　在激光應(yīng)用研究領(lǐng)域，標(biāo)量衍射理論能夠解決大量實(shí)際問(wèn)題。然而，衍射計(jì)算十分繁雜，國(guó)內(nèi)外研究的專著甚少，衍射計(jì)算通常成為大學(xué)生、研究生及科研人員遇到的難題。隨著計(jì)算機(jī)及CCD技術(shù)的進(jìn)步，基于衍射計(jì)算理論及計(jì)算機(jī)技術(shù)，數(shù)字全息逐漸形成一項(xiàng)具有重要前景的新興技術(shù)，國(guó)內(nèi)尚無(wú)一部專著闡述。本書基于作者近30年在該領(lǐng)域的研究及國(guó)內(nèi)外的研究成果，除系統(tǒng)總結(jié)經(jīng)典衍射積分的數(shù)值計(jì)算方法外，將對(duì)空間曲面衍射場(chǎng)的數(shù)值計(jì)算進(jìn)行專門研究，并且，將以數(shù)字全息為衍射計(jì)算理論的應(yīng)用載體，較詳細(xì)地對(duì)數(shù)字全息涉及的理論、技術(shù)及在全息干涉計(jì)量中的應(yīng)用進(jìn)行介紹。

作者簡(jiǎn)介:

　　Li Junchang，male，born in Kunming，Yunnan province， China on September 1 8th，1945，a professor frOm the College of Science，Kunming University of Science and Technology．He graduated from the Department of Physics．Yunnan University in 1967．1n the research field of Laser application．he has carried out scientific coopemtion with Institut National des Sciences Appliqu~e de Lyon，Ecole Centrale de Lyon，Ecole Nationale Superieure des Arts et M6ties de Paris and Universit~du Maine and directed Ph．D students in China and France since 1984．

　　Wu Yanmei，female，born in Loudi，Hunan province， an associate professor．She graduated from Kunming University of Science and Technology，and obtained her Ph．D degree．In recent years，she has published fody― five papers，and won five teaching awards at the national Ievel．

Introduction

Chapter 1 Mathematical Prerequisites

1.1 Frequently Used Special Functions

1.1.1 The“Rectangle”Function

1.1.2 The“Sinc”Function

1.1.3 The“Step”function

1.1.4 The“Sign”Function

1.1.5 The“Triangle”Function

1.1.6 The“Disk”Funct，ion

1.1.7 The～Dirac 6 Function

1.1.8 The“Comb”Function

1.2 Two-dimensional Fourier Transform

1.2.1 Definition and Existence Conditions

1.2.2 Theorems Related to the Fourier Transform

1.2.3 Fourier Transforms in Polar C：oordinates

1.3 Linear Systems

1.3.1 Definition

1.3.2 Impulse Response and Superposition Integrals

1.3.3 Definition of a Two-dimensional Linear Shift—invariant System

1.3.4 nansfer Functions and Eigenfunction

1.4 Two-dimensional Sampling Theorem

1.4.1 Sampling a Continuous Function

1.4.2 Reconstruction of the Original Function

1.4.3 Space-bandwidth Product

References

Chapter 2 Scalar Difrraction Theory

2.1 The Representation of an Optical Wave by a Complex Function

2.1.1 The Representation of a Monochromatic Wave

2.1.2 The Expression of the Optical Field in Space

2.1.3 Complex Amplitudes of Plane and Spherical Waves in a Space

Plane

2.2 Scalar Diffraction Theory

2.2.1 Wave Equation

2.2.2 Harmonic Plane Wave Solutions to the Wave Equation

2.2.3 Angular Spectrum

2.2.4 Kirchhoff and Rayleigh.Sommerfeld Formula

2.2.5 Paraxial Approximation of Diffraction Problem——nesnel Diffractio耵

Integral

2.2.6 Fraunhofer Difiraction

2.3 Examples of Fraunhofer Diffraction

2.3.1 Fraunhofer Diffraction Pattern from a Rectangular Aperture

2.3.2 Fraunhofer Diffraction of a Circular Aperture

2.3.3 The Diffraction Image of Triangle Aperture on the Focal Plane

2.3.4 Fraunhofer Diffraction Pattern from a Sinusoidal-amplitude

Grating

2.4 Fresnel Diffraction Integral Analytical and Semi—analytical

Calculation

2.4.1 Fresnel Diffraction from a Sinusoidal.amplitude Grating

2.4.2 Fresnel Diffraction from a Rectangular Aperture

2.4.3 Fresnel Diffraction from a Complex Shape Aperture

2.4.4 The Diffraction Field of Refraction Prism Array by Using the

Rectangular Aperture Diffraction Formula

2.4.5 Fresnel Diffraction from a Triangle Aperture

2.5 Collins’Formula

2.5.1 Description of an Optical System by an ABCD Transfer Matrix

2.5.2 ABCD Law and Equivalent Paraxia Lens System8

2.5.3 Proof of Collins’Formula

2.6 Discussion of Optical Transform Properties of Single Lens System

Based on Collins’Formula

2.6.1 0bject in Front of the Lens

2.6.2 Object Behind the Lens

References

Chapter 3 Diffraction Numerical Calculation and Application

Examples

3.1 Relation between the Discrete and Analytical Fourier Transforms

……

Appendix C CD Contets in the Diffraction Calculation and Digital Holography

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