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Bayraktar, Turgay; Bloom, Thomas; Levenberg, Norm
{
"@context": "https://schema.org/",
"@id": 270930,
"@type": "ScholarlyArticle",
"creator": [
{
"@type": "Person",
"affiliation": "Sabanci Univ, Fac Engn & Nat Sci, TR-34956 Tuzla, Istanbul, Turkiye",
"name": "Bayraktar, Turgay"
},
{
"@type": "Person",
"affiliation": "Univ Toronto, Dept Math, Toronto, ON M5S 2E4, Canada",
"name": "Bloom, Thomas"
},
{
"@type": "Person",
"affiliation": "Indiana Univ, Dept Math, Bloomington, IN 47405 USA",
"name": "Levenberg, Norm"
}
],
"datePublished": "2023-01-01",
"description": "<p>We generalize some previous results on random polynomials in several complex variables. A standard setting is to consider random polynomials H-n(z) := Sigma(mn)(j=1) a(j)p(j)(z) that are linear combinations of basis polynomials {p(j)} with i.i.d. complex random variable coefficients {a(j)} where {p(j)} form an orthonormal basis for a Bernstein-Markov measure on a compact set K subset of C-d. Here mn is the dimension of P-n, the holomorphic polynomials of degree at most n in C-d. We consider more general bases {p(j)}, which include, e.g., higher-dimensional generalizations of Fekete polynomials. Moreover we allow H-n(z) := Sigma(mn)(j=1) a(nj)p(nj)(z), i.e., we have an array of basis polynomials {p(nj)} and random coefficients {a(nj)}. This always occurs in a weighted situation. We prove results on convergence in probability and on almost sure convergence of 1/n log vertical bar H-n vertical bar in L-loc(1)(C-d) to the (weighted) extremal plurisubharmonic function for K. We aim for weakest possible sufficient conditions on the random coefficients to guarantee convergence.</p>",
"headline": "RANDOM POLYNOMIALS IN SEVERAL COMPLEX VARIABLES",
"identifier": 270930,
"image": "https://aperta.ulakbim.gov.tr/static/img/logo/aperta_logo_with_icon.svg",
"license": "http://www.opendefinition.org/licenses/cc-by",
"name": "RANDOM POLYNOMIALS IN SEVERAL COMPLEX VARIABLES",
"url": "https://aperta.ulakbim.gov.tr/record/270930"
}
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