SemOpenAlex |

SemOpenAlex

Matches in SemOpenAlex for { <https://semopenalex.org/work/W2765827710> ?p ?o ?g. }

Showing items 1 to 100 of ±114 with 100 items per page.

W2765827710 abstract "Let $X$ be a centered Gaussian random variable in a separable Hilbert space ${mathbb H}$ with covariance operator $Sigma.$ We study a problem of estimation of a smooth functional of $Sigma$ based on a sample $X_1,dots ,X_n$ of $n$ independent observations of $X.$ More specifically, we are interested in functionals of the form $langle f(Sigma), Brangle,$ where $f:{mathbb R}mapsto {mathbb R}$ is a smooth function and $B$ is a nuclear operator in ${mathbb H}.$ We prove concentration and normal approximation bounds for plug-in estimator $langle f(hat Sigma),Brangle,$ $hat Sigma:=n^{-1}sum_{j=1}^n X_jotimes X_j$ being the sample covariance based on $X_1,dots, X_n.$ These bounds show that $langle f(hat Sigma),Brangle$ is an asymptotically normal estimator of its expectation ${mathbb E}_{Sigma} langle f(hat Sigma),Brangle$ (rather than of parameter of interest $langle f(Sigma),Brangle$) with a parametric convergence rate $O(n^{-1/2})$ provided that the effective rank ${bf r}(Sigma):= frac{{bf tr}(Sigma)}{|Sigma|}$ (${rm tr}(Sigma)$ being the trace and $|Sigma|$ being the operator norm of $Sigma$) satisfies the assumption ${bf r}(Sigma)=o(n).$ At the same time, we show that the bias of this estimator is typically as large as $frac{{bf r}(Sigma)}{n}$ (which is larger than $n^{-1/2}$ if ${bf r}(Sigma)geq n^{1/2}$). In the case when ${mathbb H}$ is finite-dimensional space of dimension $d=o(n),$ we develop a method of bias reduction and construct an estimator $langle h(hat Sigma),Brangle$ of $langle f(Sigma),Brangle$ that is asymptotically normal with convergence rate $O(n^{-1/2}).$ Moreover, we study asymptotic properties of the risk of this estimator and prove minimax lower bounds for arbitrary estimators showing the asymptotic efficiency of $langle h(hat Sigma),Brangle$ in a semi-parametric sense." @default.
W2765827710 created "2017-11-10" @default.
W2765827710 creator A5029726246 @default.
W2765827710 date "2017-10-25" @default.
W2765827710 modified "2023-09-27" @default.
W2765827710 title "Asymptotically Efficient Estimation of Smooth Functionals of Covariance Operators" @default.
W2765827710 cites W10800830 @default.
W2765827710 cites W1507943102 @default.
W2765827710 cites W1520752838 @default.
W2765827710 cites W1573820523 @default.
W2765827710 cites W1575147392 @default.
W2765827710 cites W1594572592 @default.
W2765827710 cites W166129609 @default.
W2765827710 cites W1964861319 @default.
W2765827710 cites W1966255961 @default.
W2765827710 cites W1966661241 @default.
W2765827710 cites W1968050463 @default.
W2765827710 cites W1974637548 @default.
W2765827710 cites W1975757206 @default.
W2765827710 cites W1976422186 @default.
W2765827710 cites W1983960282 @default.
W2765827710 cites W1988734172 @default.
W2765827710 cites W1994938797 @default.
W2765827710 cites W2016517500 @default.
W2765827710 cites W2020120128 @default.
W2765827710 cites W2023135717 @default.
W2765827710 cites W2025612377 @default.
W2765827710 cites W2033086316 @default.
W2765827710 cites W2033111980 @default.
W2765827710 cites W2034053830 @default.
W2765827710 cites W2069119359 @default.
W2765827710 cites W2097714737 @default.
W2765827710 cites W2127083166 @default.
W2765827710 cites W2141020861 @default.
W2765827710 cites W2184972281 @default.
W2765827710 cites W2286233054 @default.
W2765827710 cites W2312228542 @default.
W2765827710 cites W2344998188 @default.
W2765827710 cites W2519690476 @default.
W2765827710 cites W2524946712 @default.
W2765827710 cites W2755452090 @default.
W2765827710 cites W2796930163 @default.
W2765827710 cites W2798707604 @default.
W2765827710 cites W2894818825 @default.
W2765827710 cites W2950690525 @default.
W2765827710 cites W2963077963 @default.
W2765827710 cites W2963211500 @default.
W2765827710 cites W2963278901 @default.
W2765827710 cites W2963350409 @default.
W2765827710 cites W2963437636 @default.
W2765827710 cites W2963686084 @default.
W2765827710 cites W2963967287 @default.
W2765827710 cites W2964189310 @default.
W2765827710 cites W2965497096 @default.
W2765827710 cites W3006977772 @default.
W2765827710 cites W3099550161 @default.
W2765827710 cites W3102937696 @default.
W2765827710 cites W93530381 @default.
W2765827710 hasPublicationYear "2017" @default.
W2765827710 type Work @default.
W2765827710 sameAs 2765827710 @default.
W2765827710 citedByCount "2" @default.
W2765827710 countsByYear W27658277102018 @default.
W2765827710 crossrefType "posted-content" @default.
W2765827710 hasAuthorship W2765827710A5029726246 @default.
W2765827710 hasConcept C103692563 @default.
W2765827710 hasConcept C105795698 @default.
W2765827710 hasConcept C114614502 @default.
W2765827710 hasConcept C121332964 @default.
W2765827710 hasConcept C122123141 @default.
W2765827710 hasConcept C134306372 @default.
W2765827710 hasConcept C185429906 @default.
W2765827710 hasConcept C2778049214 @default.
W2765827710 hasConcept C33923547 @default.
W2765827710 hasConcept C62520636 @default.
W2765827710 hasConcept C62799726 @default.
W2765827710 hasConceptScore W2765827710C103692563 @default.
W2765827710 hasConceptScore W2765827710C105795698 @default.
W2765827710 hasConceptScore W2765827710C114614502 @default.
W2765827710 hasConceptScore W2765827710C121332964 @default.
W2765827710 hasConceptScore W2765827710C122123141 @default.
W2765827710 hasConceptScore W2765827710C134306372 @default.
W2765827710 hasConceptScore W2765827710C185429906 @default.
W2765827710 hasConceptScore W2765827710C2778049214 @default.
W2765827710 hasConceptScore W2765827710C33923547 @default.
W2765827710 hasConceptScore W2765827710C62520636 @default.
W2765827710 hasConceptScore W2765827710C62799726 @default.
W2765827710 hasLocation W27658277101 @default.
W2765827710 hasOpenAccess W2765827710 @default.
W2765827710 hasPrimaryLocation W27658277101 @default.
W2765827710 hasRelatedWork W1953795971 @default.
W2765827710 hasRelatedWork W1970742630 @default.
W2765827710 hasRelatedWork W1999202288 @default.
W2765827710 hasRelatedWork W2028993004 @default.
W2765827710 hasRelatedWork W2047052425 @default.
W2765827710 hasRelatedWork W2156873977 @default.
W2765827710 hasRelatedWork W2228424262 @default.
W2765827710 hasRelatedWork W2461720516 @default.
W2765827710 hasRelatedWork W2908328269 @default.
W2765827710 hasRelatedWork W2941799177 @default.