INVESTIGADORES
PERRUCCI Daniel Roberto
artículos
Título:
Quantitative Fundamental Theorem of Algebra
Autor/es:
DANIEL PERRUCCI; MARIE-FRANCOISE ROY
Revista:
QUARTERLY JOURNAL OF MATHEMATICS
Editorial:
OXFORD UNIV PRESS
Referencias:
Lugar: Oxford; Año: 2019
ISSN:
0033-5606
Resumen:
Using subresultants, we modify a real-algebraic proof due to Eisermann of the Fundamental Theorem of Algebra ([FTA]) to obtain the following quantitative information: in order to prove the [FTA] for polynomials of degree d, the Intermediate Value Theorem ([IVT]) is required to hold onlyfor real polynomials of degree at most d^2 . We also explain that the classical proof due to Laplace requires [IVT] for real polynomials of exponential degree. These quantitative results highlight thedifference in nature of these two proofs.
