Essec\Faculty\Model\Contribution {#2188
  #_index: "academ_contributions"
  #_id: "13137"
  #_source: array:26 [
    "id" => "13137"
    "slug" => "harmonic-analysis-meets-stationarity-a-general-framework-for-series-expansions-of-special-gaussian-processes"
    "yearMonth" => "2023-05"
    "year" => "2023"
    "title" => "Harmonic analysis meets stationarity: A general framework for series expansions of special Gaussian processes"
    "description" => "NDAOUD, M. (2023). Harmonic analysis meets stationarity: A general framework for series expansions of special Gaussian processes. <i>Bernoulli: A Journal of Mathematical Statistics and Probability</i>, 29(3), pp. 2295 - 2317."
    "authors" => array:1 [
      0 => array:3 [
        "name" => "NDAOUD Mohamed"
        "bid" => "B00791786"
        "slug" => "ndaoud-mohamed"
      ]
    ]
    "ouvrage" => ""
    "keywords" => []
    "updatedAt" => "2023-07-04 17:03:16"
    "publicationUrl" => "https://projecteuclid.org/journals/bernoulli/volume-29/issue-3/Harmonic-analysis-meets-stationarity--A-general-framework-for-series/10.3150/22-BEJ1542.short"
    "publicationInfo" => array:3 [
      "pages" => "2295 - 2317"
      "volume" => "29"
      "number" => "3"
    ]
    "type" => array:2 [
      "fr" => "Articles"
      "en" => "Journal articles"
    ]
    "support_type" => array:2 [
      "fr" => "Revue scientifique"
      "en" => "Scientific journal"
    ]
    "countries" => array:2 [
      "fr" => null
      "en" => null
    ]
    "abstract" => array:2 [
      "fr" => """
        In this paper, we present a new approach to derive series expansions for some Gaussian processes based on harmonic analysis of their\n
        covariance function. In particular, we propose a new simple rate-optimal\n
        series expansion for fractional Brownian motion. The convergence of the\n
        latter series holds in mean square and uniformly almost surely, with a rateoptimal decay of the remainder of the series. We also develop a general\n
        framework of convergent series expansions for certain classes of Gaussian\n
        processes with stationarity. Finally, an application to optimal functional\n
        quantization is described.
        """
      "en" => """
        In this paper, we present a new approach to derive series expansions for some Gaussian processes based on harmonic analysis of their\n
        covariance function. In particular, we propose a new simple rate-optimal\n
        series expansion for fractional Brownian motion. The convergence of the\n
        latter series holds in mean square and uniformly almost surely, with a rateoptimal decay of the remainder of the series. We also develop a general\n
        framework of convergent series expansions for certain classes of Gaussian\n
        processes with stationarity. Finally, an application to optimal functional\n
        quantization is described.
        """
    ]
    "authors_fields" => array:2 [
      "fr" => "Systèmes d’Information, Sciences de la Décision et Statistiques"
      "en" => "Information Systems, Decision Sciences and Statistics"
    ]
    "indexedAt" => "2024-04-26T05:21:53.000Z"
    "docTitle" => "Harmonic analysis meets stationarity: A general framework for series expansions of special Gaussian processes"
    "docSurtitle" => "Journal articles"
    "authorNames" => "<a href="/cv/ndaoud-mohamed">NDAOUD Mohamed</a>"
    "docDescription" => "<span class="document-property-authors">NDAOUD Mohamed</span><br><span class="document-property-authors_fields">Information Systems, Decision Sciences and Statistics</span> | <span class="document-property-year">2023</span>"
    "keywordList" => ""
    "docPreview" => "<b>Harmonic analysis meets stationarity: A general framework for series expansions of special Gaussian processes</b><br><span>2023-05 | Journal articles </span>"
    "docType" => "research"
    "publicationLink" => "<a href="https://projecteuclid.org/journals/bernoulli/volume-29/issue-3/Harmonic-analysis-meets-stationarity--A-general-framework-for-series/10.3150/22-BEJ1542.short" target="_blank">Harmonic analysis meets stationarity: A general framework for series expansions of special Gaussian processes</a>"
  ]
  +lang: "en"
  +"_type": "_doc"
  +"_score": 8.657789
  +"parent": null
}