Abstract:We introduce the novel concept of a resolving decomposition of a polynomial module as a combinatorial structure that allows for the effective construction of free resolutions. It provides a unifying framework for recent results of the authors for different types of bases.
Let k be a field of arbitrary characteristic, A a Noetherian k-algebra and consider the polynomial ring A[x] = A[x0, . . . , xn]. We consider homogeneous submodules of A[x] m having a special set of generators: a marked basis over a quasi-stable module. Such a marked basis inherits several good properties of a Gröbner basis, including a Noetherian reduction relation. The set of submodules of A[x] m having a marked basis over a given quasi-stable module has an affine scheme structure that we are able to exhibit. Furthermore, the syzygies of a module generated by such a marked basis are generated by a marked basis, too (over a suitable quasi-stable module in ⊕ m ′ i=1 A[x](−di)). We apply the construction of marked bases and related properties to the investigation of Quot functors (and schemes). More precisely, for a given Hilbert polynomial, we can explicitely construct (up to the action of a general linear group) an open cover of the corresponding Quot functor made up of open functors represented by affine schemes. This gives a new proof that the Quot functor is the functor of points of a scheme. We also exhibit a procedure to obtain the equations defining a given Quot scheme as a subscheme of a suitable Grassmannian. Thanks to the good behaviour of marked bases with respect to Castelnuovo-Mumford regularity, we can adapt our methods in order to study the locus of the Quot scheme given by an upper bound on the regularity of its points.
We describe a novel approach to the computation of free resolutions and of Betti numbers of polynomial modules based on a combination of the theory of involutive bases with algebraic discrete Morse theory. This approach allows for the first time to compute Betti numbers (even single ones) without determining a whole resolution which in many cases drastically reduces the computation time.
We introduce the novel concept of a resolving decomposition of a polynomial module as a combinatorial structure that allows for the effective construction of free resolutions. It provides a unifying framework for recent results of the authors for different types of bases.
Human as a living creature has two component; body (soma) and mind/soul (psyche). The reciprocal relationship between them has been studied in philosophy and medical field. A supporting theory states "A disturbance in one component would cause a disturbance to the other". Example of the possible disturbance is stress (mentally) or physical pain/symptoms (physically). The theory has a similar definition to a specific clinical disorder; somatic symptoms disorder (SSD) that will be used as a moderator. This study aims to know the relationship between perceived stress (PSS) and physical symptoms (PHQ), and in what level would SSD moderate the relation between both variables. The subjects of this research were 152 medical students whom are doing internship. The data gathered were processed using SPSS and analyzed with regression with moderator model. The results shows a significant relationship between PSS and PHQ (r 2 of 0.40, p=0.000<0.001). The focal predictor shows the moderator only works only for subjects that are categorized on "low" in SSD score. Showing up to 0.2533 scores as effect and p=0.0001<0.001. Linear regression between PSS and PHQ shows an r 2 =0.18, p=0.000<0.001; indicating that with or without SSD, the relationship between PSS and PHQ remain to have a significant relation.
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