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A moment theoretic approach to estimate the cardinality of certain algebraic varieties
- Curto, Raul E.;
- Yoo, Seonguk
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0초록
For n is an element of N, we consider the algebraic variety V obtained by intersecting n+ 1 algebraic curves of degree n in R-2, when the leading terms of the associated bivariate polynomials are all different. We provide a new proof, based on the Flat Extension Theorem from the theory of truncated moment problems, that the cardinality of V cannot exceed ((2) (n+1)). In some instances, 2 this provides a slightly better estimate than the one given by Bezout's Theorem. Our main result contributes to the growing literature on the interplay between linear algebra, operator theory, and real algebraic geometry.
키워드
Flat Extension Theorem; planar algebraic curves; truncated moment problems; Bezout's Theorem
- 제목
- A moment theoretic approach to estimate the cardinality of certain algebraic varieties
- 저자
- Curto, Raul E.; Yoo, Seonguk
- 발행일
- 2022-00
- 유형
- Article
- 권
- 28
- 페이지
- 357 ~ 366