MeanSquareEstimation.pptVIP

  1. 1、本文档共33页,可阅读全部内容。
  2. 2、有哪些信誉好的足球投注网站(book118)网站文档一经付费(服务费),不意味着购买了该文档的版权,仅供个人/单位学习、研究之用,不得用于商业用途,未经授权,严禁复制、发行、汇编、翻译或者网络传播等,侵权必究。
  3. 3、本站所有内容均由合作方或网友上传,本站不对文档的完整性、权威性及其观点立场正确性做任何保证或承诺!文档内容仅供研究参考,付费前请自行鉴别。如您付费,意味着您自己接受本站规则且自行承担风险,本站不退款、不进行额外附加服务;查看《如何避免下载的几个坑》。如果您已付费下载过本站文档,您可以点击 这里二次下载
  4. 4、如文档侵犯商业秘密、侵犯著作权、侵犯人身权等,请点击“版权申诉”(推荐),也可以打举报电话:400-050-0827(电话支持时间:9:00-18:30)。
  5. 5、该文档为VIP文档,如果想要下载,成为VIP会员后,下载免费。
  6. 6、成为VIP后,下载本文档将扣除1次下载权益。下载后,不支持退款、换文档。如有疑问请联系我们
  7. 7、成为VIP后,您将拥有八大权益,权益包括:VIP文档下载权益、阅读免打扰、文档格式转换、高级专利检索、专属身份标志、高级客服、多端互通、版权登记。
  8. 8、VIP文档为合作方或网友上传,每下载1次, 网站将根据用户上传文档的质量评分、类型等,对文档贡献者给予高额补贴、流量扶持。如果你也想贡献VIP文档。上传文档
查看更多
MeanSquareEstimation

* 16. Mean Square Estimation Given some information that is related to an unknown quantity of interest, the problem is to obtain a good estimate for the unknown in terms of the observed data. Suppose represent a sequence of random variables about whom one set of observations are available, and Y represents an unknown random variable. The problem is to obtain a good estimate for Y in terms of the observations Let represent such an estimate for Y. Note that can be a linear or a nonlinear function of the observation Clearly represents the error in the above estimate, and the square of (16-1) (16-2) PILLAI the error. Since is a random variable, represents the mean square error. One strategy to obtain a good estimator would be to minimize the mean square error by varying over all possible forms of and this procedure gives rise to the Minimization of the Mean Square Error (MMSE) criterion for estimation. Thus under MMSE criterion,the estimator is chosen such that the mean square error is at its minimum. Next we show that the conditional mean of Y given X is the best estimator in the above sense. Theorem1: Under MMSE criterion, the best estimator for the unknown Y in terms of is given by the conditional mean of Y gives X. Thus Proof : Let represent an estimate of Y in terms of Then the error and the mean square error is given by (16-3) (16-4) PILLAI Since we can rewrite (16-4) as where the inner expectation is with respect to Y, and the outer one is with respect to Thus To obtain the best estimator we need to minimize in (16-6) with respect to In (16-6), since and the variable appears only in the integrand term, minimization of

文档评论(0)

118books + 关注
实名认证
文档贡献者

该用户很懒,什么也没介绍

1亿VIP精品文档

相关文档