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sfs shape from shading 由阴影到形状 tsai 的三篇论文以及代码，试验用图片。

校园失物招领系统的设计与实现毕业论文，本系统是基于asp.ent+ sql server的设计与实现。

介绍了三相异步电机的结构和原理，以及几种常见的交流调速系统，并着重阐述了调压调速系统。通过对调压调速系统各模块的分析，利用Matlab/Simulink建立了三相异步电机调压调速系统开环和闭环模型，得出了两种情况下的仿真结果，并对结果进行了分析、比较。本次仿真运用了软件中许多现成的模块，并将实验中所建模块封装起来，以便下次使用。使用时只需调出所需模块并置入相应的电机参数，就可方便地进行仿真，而且仿真的各变量结果可靠、稳定，证明该模型具有快捷、灵活、方便、直观等一系列优点。通过对三相异步电机的调压调速系统的仿真，验证了建模方法的有效性，并为以后在此基础上进行其他电机或调速系统研究提供了借鉴和方便

压缩包中有三个粒子滤波的演示程序，一个滤波，一个目标跟踪，一个机器人定位。关于效果，大家可以先看看http://blog.csdn.net/heyijia0327/article/details/41142679。再决定是否下载。

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本文首先介绍了GPS系统组成，在此基础上介绍了其定位的基本原理，然后通过对载体的运动进行动态建模将卡尔曼最优估计理论引入导航定位系统中，解决了滤波器的发散，非线性系统的线性化等一些常见问题，提高了系统的定位精度，并对卡尔曼滤波进行自适应的改进，进一步提高了其精确度和稳定性。接着讨论了GPS定位的误差源和它们对定位精度的影响，并分析了怎样改进定位性能，并对GPS完整性进行了研究，在对卫星导航系统中现有RAIM算法进行研究的基础上，讨论了故障卫星的探测与分离方法，提出了一种新的有效的探测和分离故障卫星的方法。文章的最后通过对整个定位过程进行仿真，对比了最小二乘算法和卡尔曼滤波算法的定位、测速精

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An introduction to stochastic processes through the use of RIntroduction to Stochastic Processes with R is an accessible and well-balanced presentation of the theory of stochastic processes, with an emphasis on real-world applications of probability theory in the natural and social sciences. The uINTRODUCTIONTO STOCHASTICPROCESSES WITH RINTRODUCTIONTO STOCHASTICPROCESSES WITH RROBERT P DOBROWWILEYCopyright o 2016 by John Wiley Sons, Inc. All rights reservedPublished by John Wiley Sons, Inc, Hoboken, New JerseyPublished simultaneously in CanadaNo part of this publication may be reproduced, stored in a retrieval system, or transmitted in any form orby any means, electronic, mechanical, photocopying, recording, scanning, or otherwise, except aspermitted under Section 107 or 108 of the 1976 United States Copyright Act, without either the priorwritten permission of the Publisher, or authorization through payment of the appropriate per-copy fee tothe Copyright Clearance Center, Inc, 222 Rosewood Drive, Danvers, MA,(978)750-8400, fax978)750-4470,oronthewebatwww.copyright.comRequeststothePublisherforpermissionshouldbe addressed to the Permissions Department, John Wiley sons, Inc, lll River Street, Hoboken, NJ07030,(201)748-6011,fax(201)748-6008,oronlineathttp://www.wiley.com/go/permissionsLimit of liability/ Disclaimer of warranty While the publisher and author have used their best efforts inpreparing this book, they make no representations or warranties with respect to the accuracy orcompleteness of the contents of this book and specifically disclaim any implied warranties ofmerchantability or fitness for a particular purpose. No warranty may be created or extended by salesrepresentatives or written sales materials. The advice and strategies contained herein may not be suitablefor your situation. You should consult with a professional where appropriate. Neither the publisher norauthor shall be liable for any loss of profit or any other commercial damages, including but not limited tospecial, incidental, consequential, or other damagesFor general information on our other products and services or for technical support, please contact ourCustomer Care Department within the United States at(800)762-2974, outside the United States at(317)572-3993 or fax(317)572-4002Wiley also publishes its books in a variety of electronic formats. Some content that appears in print maynot be available in electronic formats. For more information about Wiley products, visit our web site atwww.wiley.comLibrary of Congress Cataloging-in-Publication Data:Dobrow. Robert p. authorIntroduction to stochastic processes with r/ Robert P. Dobrowpages cmIncludes bibliographical references and indexISBN978-1-118-74065-1( cloth)1. Stochastic processes. 2. R( Computer program language)I. TitleQC20.7.S8D6320165192′302855133-dc232015032706Set in 10/12pt, Times-Roman by SPi Global, Chennai, IndiaPrinted in the united states of america1098765432112016To my familyCONTENTSPrefaceAcknowledgmentsList of Symbols and Notationabout the companion Website1 Introduction and review1.1 Deterministic and stochastic models. 11. 2 What is a Stochastic Process? 61. 3 Monte Carlo Simulation. 91.4 Conditional Probability, 101. 5 Conditional Expectation, 18Exercises. 342 Markov Chains: First Steps402.1 Introduction. 402.2 Markov Chain Cornucopia, 422.3 Basic Computations, 522. 4 Long-Term behavior-the Numerical evidence, 592.5 Simulation. 652.6 Mathematical Induction*. 68Exercises. 70CONTENTS3 Markov Chains for the long term763.1 Limiting Distrib763.2 Stationary Distribution, 803.3 Can you find the way to state a? 943.4 Irreducible markov Chains. 1033.5 Periodicity, 1063.6 Ergodic Markov Chains, 1093.7 Time Reversibility, 1143.8 Absorbing Chains, 1199 Regeneration and the strong markov property 1333.10 Proofs of limit Theorems*, 135Exercises. 1444 Branching processes1584.1 Introduction. 1584.2 Mean Generation Size. 1604.3 Probability Generating Functions, 1644.4 Extinction is Forever. 168Exercises. 1755 Markov Chain Monte Carlo1815.1 Introduction. 1815.2 Metropolis-Hastings Algorithm, 1875.3 Gibbs Sampler, 1975.4 Perfect Sampling*, 20.55.5 Rate of Convergence: the Eigenvalue Connection*, 2105.6 Card Shuffing and Total Variation Distance. 212Exercises. 2196 Poisson process2236.1 Introduction. 2236.2 Arrival. Interarrival Times. 2276.3 Infinitesimal Probabilities. 2346.4 Thinning, Superposition, 2386.5 Uniform Distribution. 2436.6 Spatial Poisson Process, 2496.7 Nonhomogeneous Poisson Process. 2536.8 Parting Paradox, 255Exercises. 2587 Continuous- Time markov Chains2657.1 Introduction. 265

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