Rilevare e curare la violenza all’infanzia: l’esperienza pugliese di GIADA

This article illustrates the path built over a decade by the Interdisciplinary Assistance Group for Abused Women and Children (GIADA) which has gradually taken on a stable dimension at the “Giovanni XXIII” Pediatric Hospital in Bari. The article describes the functions performed and the architecture of the Apulian model in which GIADA acts as a Level III Center for the prevention, diagnosis and treatment of the different forms of violence against children.

TINJAUAN AL-QUR’AN DAN PRINSIP PEMBEBANAN DALAM PENENTUAN DIMENSI KESTABILAN PONDASI BANGUNAN

Foundation is a part of building construction having function continuously to support entire or all the building burden to ground. One of the factor of buildingcon truction should be supported by the sturdy foundation, and sturdy foundation depend on his compiler composition and dimension of foundation. Therefore it is needed tire calculations of foundation so that we get well guaranted of his stability. Besides that, ground factor also have stability of structure, because the ground sustain the foundation and place where burden given by foundation. Power factor support the ground against the foundation action is highly varied, it is _depend on composition and nature of ground, information concerning energy number support of this ground can be shown passing investigation _of ground. To guarantee security in a building one of the among others is to looking for comparison between foundations and well-balanced ground. The dimension of foundation must be enough and fit with the power of ground. Detennination of building foundation is very influenced by energy support the ground. And energy support the ground depict strength of ground to accepted burden. Energy support the ground is very influenced by character, nature, type, structure, formation, and component compiler of ground, besides also usage of foundation type is also influenced by contour, ground water face and topography. Energy support the ground explained by some concept or theories, among others is Terzaghi theory and accepted encumbering principle or apply at the foundation structure. From both this concept determinable of enough and stable dimension of strength sustain a building. The foundation dimension is reckoned by the minimum or smallest measure or dimension, but have ever been optimal to sustain the burden befall it.

Preparation and characterization of silicone rubber cured via catalyst-free aza-Michael reaction

A novel silicone rubber of high strength and stable dimension was cured via catalyst-free aza-Michael reaction.

On self-injective algebras of stable dimension zero

Let A be a self-injective algebra over an algebraically closed field. We study the stable dimension of A, which is the dimension of the stable module category of A in the sense of Rouquier. Then we prove that A is representation-finite if the stable dimension of A is zero.

On self-injective algebras of stable dimension zero

LetAbe a self-injective algebra over an algebraically closed field. We study the stable dimension ofA, which is the dimension of the stable module category ofAin the sense of Rouquier. Then we prove thatAis representation-finite if the stable dimension ofAis zero.

On a class of stable conditional measures

The dynamics of endomorphisms (smooth non-invertible maps) presents many differences from that of diffeomorphisms or that of expanding maps; most methods from those cases do not work if the map has a basic set of saddle type with self-intersections. In this paper we study the conditional measures of a certain class of equilibrium measures, corresponding to a measurable partition subordinated to local stable manifolds. We show that these conditional measures are geometric probabilities on the local stable manifolds, thus answering in particular the questions related to the stable pointwise Hausdorff and box dimensions. These stable conditional measures are shown to be absolutely continuous if and only if the respective basic set is a non-invertible repeller. We find also invariant measures of maximal stable dimension, on folded basic sets. Examples are given, too, for such non-reversible systems.

Socjologia krytyczna na peryferiach

The paper proposes a redefinition of the rules of critical sociology in the context of peripheral countries, among them Poland and also Russia and other countries of Central and Eastern Europe. The proposed theoretical model refers to the notions of cultural and political capital as understood and defined by Pierre Bourdieu. The cultural capital in particular is believed to be the key and most stable dimension of inequality in Poland, as well as an important source of inequalities in other dimensions. It has been suggested that critical sociology of the Polish periphery should focus its interests precisely on this issue. At the same time the position that overlooks the cultural dimension of inequalities and treats interests defined in terms of culture as “irrational” is considered to be a manifestation of “Orientalism” and lack of respect for the important social resources of the population.

Inverse Pressure Estimates and the Independence of Stable Dimension for Non-Invertible Maps

We study the case of an Axiom A holomorphic non-degenerate (hence non-invertible) mapf: ℙ2ℂ → ℙ2ℂ, where ℙ2ℂ stands for the complex projective space of dimension 2. Letδs(x)denote a basic set for f of unstable index 1, and x an arbitrary point of Λ; we denote byδs(x)the Hausdorff dimension of∩ Λ, whereris some fixed positive number andis the local stable manifold atxof sizer;δs(x)is calledthe stable dimension at x. Mihailescu and Urba ńnski introduced a notion of inverse topological pressure, denoted by P−, which takes into consideration preimages of points. Manning and McCluskey studied the case of hyperbolic diffeomorphisms on real surfaces and give formulas for Hausdorff dimension. Our non-invertible situation is different here since the local unstable manifolds are not uniquely determined by their base point, instead they depend in general on whole prehistories of the base points. Hence our methods are different and are based on using a sequence of inverse pressures for the iterates off, in order to give upper and lower estimates of the stable dimension. We obtain an estimate of the oscillation of the stable dimension on Λ. When each pointxfrom Λ has the same numberd′of preimages in Λ, then we show thatδs(x)is independent of x; in factδs(x)is shown to be equal in this case with the unique zero of the mapt → P(tϕs−log d′). We also prove the Lipschitz continuity of the stable vector spaces over Λ; this proof is again different than the one for diffeomorphisms (however, the unstable distribution is not always Lipschitz for conformal non-invertible maps). In the end we include the corresponding results for a real conformal setting.