| Title: | The truncated moment problem on reducible cubic curves I : Parabolic and circular type relations |
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| Authors: | ID Yoo, Seonguk (Author)
ID Zalar, Aljaž (Author) |
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| Files: |  PDF - Presentation file, download (867,92 KB)
MD5: 98996DE45AE3AA335B58FA1310FC0965
 URL - Source URL, visit https://link.springer.com/article/10.1007/s11785-024-01554-w
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| Language: | English |
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| Typology: | 1.01 - Original Scientific Article |
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| Organization: |  IMFM - Institute of Mathematics, Physics, and Mechanics
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| Abstract: | In this article we study the bivariate truncated moment problem (TMP) of degree $2k$ on reducible cubic curves. First we show that every such TMP is equivalent after applying an affine linear transformation to one of 8 canonical forms of the curve. The case of the union of three parallel lines was solved by the second author (2022), while the degree 6 cases by the first author (2017). Second we characterize in terms of concrete numerical conditions the existence of the solution to the TMP on two of the remaining cases concretely, i.e., a union of a line and a circle, and a union of a line and a parabola. In both cases we also determine the number of atoms in a minimal representing measure. |
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| Keywords: | truncated moment problems, K-moment problems, K-representing measure, minimal measure, moment matrix extensions |
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| Publication status: | Published |
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| Publication version: | Version of Record |
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| Publication date: | 01.07.2024 |
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| Year of publishing: | 2024 |
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| Number of pages: | 54 str. |
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| Numbering: | Vol. 18, iss. 5, [article no.] 111 |
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| PID: | 20.500.12556/DiRROS-19116  |
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| UDC: | 517.9 |
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| ISSN on article: | 1661-8254 |
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| DOI: | 10.1007/s11785-024-01554-w |
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| COBISS.SI-ID: | 199070723 |
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| Note: |
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| Publication date in DiRROS: | 18.06.2024 |
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| Views: | 345 |
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| Downloads: | 215 |
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