Titlebook: Quadratic Forms; Combinatorics and Nu Michael Barot,Jesús Arturo Jiménez González,José-A Book 2019 Springer Nature Switzerland AG 2019 inte

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Weakly Nonnegative Quadratic Forms,nd . positive roots of ., which can be used to characterize weak nonnegativity. We also describe . semi-unit forms, those forms not weakly nonnegative such that any proper restriction is weakly nonnegative. Diverse criteria for weak nonnegativity are provided, including Zeldych’s Theorem and a few a

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Positive Quadratic Forms, the theory of integral quadratic forms, . and ., are introduced in this chapter, and are used to provide a classification of positive unit forms in terms of .. A combinatorial characterization of such forms in terms of . is also presented.

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ey are concerned mostly with dynamical sys- tems in dimensions one and two, in particular with a view to their applications to foliated manifolds. An important chapter, however, is missing, which would have been dealing with structural stability. The publication of the French edition was re- alized

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