The Extremal Truncated Moment Problem

The Extremal Truncated Moment Problem

. For a degree 2 n real d -dimensional multisequence to have a representing measure μ , it is necessary for the associated moment matrix to be positive semidefinite and for the algebraic variety associated to β, , to satisfy rank card as well as the following consistency condition: if a polynomial v...

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Veröffentlicht in:Integral equations and operator theory 2008-02, Vol.60 (2), p.177-200
Hauptverfasser: Curto, Raúl E., Fialkow, Lawrence A., Möller, H. Michael
Format: Artikel
Sprache:eng
Schlagworte:
Analysis
Mathematics
Mathematics and Statistics
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Zusammenfassung:. For a degree 2 n real d -dimensional multisequence to have a representing measure μ , it is necessary for the associated moment matrix to be positive semidefinite and for the algebraic variety associated to β, , to satisfy rank card as well as the following consistency condition: if a polynomial vanishes on , then . We prove that for the extremal case , positivity of and consistency are sufficient for the existence of a (unique, rank -atomic) representing measure. We also show that in the preceding result, consistency cannot always be replaced by recursiveness of .
ISSN:0378-620X
1420-8989
DOI:10.1007/s00020-008-1557-x