Search results for "Teoria"
showing 10 items of 2647 documents
Reciprocal lower bound on modulus of curve families in metric surfaces
2019
We prove that any metric space $X$ homeomorphic to $\mathbb{R}^2$ with locally finite Hausdorff 2-measure satisfies a reciprocal lower bound on modulus of curve families associated to a quadrilateral. More precisely, let $Q \subset X$ be a topological quadrilateral with boundary edges (in cyclic order) denoted by $\zeta_1, \zeta_2, \zeta_3, \zeta_4$ and let $\Gamma(\zeta_i, \zeta_j; Q)$ denote the family of curves in $Q$ connecting $\zeta_i$ and $\zeta_j$; then $\text{mod} \Gamma(\zeta_1, \zeta_3; Q) \text{mod} \Gamma(\zeta_2, \zeta_4; Q) \geq 1/\kappa$ for $\kappa = 2000^2\cdot (4/\pi)^2$. This answers a question concerning minimal hypotheses under which a metric space admits a quasiconfor…
Accessible parts of boundary for simply connected domains
2018
For a bounded simply connected domain $\Omega\subset\mathbb{R}^2$, any point $z\in\Omega$ and any $0<\alpha<1$, we give a lower bound for the $\alpha$-dimensional Hausdorff content of the set of points in the boundary of $\Omega$ which can be joined to $z$ by a John curve with a suitable John constant depending only on $\alpha$, in terms of the distance of $z$ to $\partial\Omega$. In fact this set in the boundary contains the intersection $\partial\Omega_z\cap\partial\Omega$ of the boundary of a John sub-domain $\Omega_z$ of $\Omega$, centered at $z$, with the boundary of $\Omega$. This may be understood as a quantitative version of a result of Makarov. This estimate is then applied to obta…
Algorithms for permutability in finite groups
2013
In this paper we describe some algorithms to identify permutable and Sylow-permutable subgroups of finite groups, Dedekind and Iwasawa finite groups, and finite T-groups (groups in which normality is transitive), PT-groups (groups in which permutability is transitive), and PST-groups (groups in which Sylow permutability is transitive). These algorithms have been implemented in a package for the computer algebra system GAP.
Curve packing and modulus estimates
2018
A family of planar curves is called a Moser family if it contains an isometric copy of every rectifiable curve in $\mathbb{R}^{2}$ of length one. The classical "worm problem" of L. Moser from 1966 asks for the least area covered by the curves in any Moser family. In 1979, J. M. Marstrand proved that the answer is not zero: the union of curves in a Moser family has always area at least $c$ for some small absolute constant $c > 0$. We strengthen Marstrand's result by showing that for $p > 3$, the $p$-modulus of a Moser family of curves is at least $c_{p} > 0$.
Mappings of Finite Distortion : Compactness of the Branch Set
2017
We show that an entire branched cover of finite distortion cannot have a compact branch set if its distortion satisfies a certain asymptotic growth condition. We furthermore show that this bound is strict by constructing an entire, continuous, open and discrete mapping of finite distortion which is piecewise smooth, has a branch set homeomorphic to an (n - 2)-dimensional torus and distortion arbitrarily close to the asymptotic bound. Peer reviewed
On generalised FC-groups in which normality is a transitive relation
2016
We extend to soluble FC∗ -groups, the class of generalised FC-groups introduced in [F. de Giovanni, A. Russo, G. Vincenzi, Groups with restricted conjugacy classes , Serdica Math. J. 28(3) (2002), 241 254], the characterisation of finite soluble T-groups obtained recently in [G. Kaplan, On T-groups, supersolvable groups and maximal subgroups , Arch. Math. 96 (2011), 19 25].
On the Modulus Duality in Arbitrary Codimension
2022
Abstract We study the modulus of dual families of $k$- and $(n-k)$-dimensional Lipschitz chains of Euclidean $n$-cubes and establish half of the modulus duality identity.
Cosmic perturbation theory and inflation
2015
Tässä pro gradu -tutkielmassa olen käynyt läpi yhden skalaarikentän synnyttämän kosmisen inflaation teoriaa. Tätä varten olen opiskellut kosmista häiriöteoriaa joka tutkii Friedmann-Robertson-Walker -avaruusajan ympärille kehitettyjen häiriöiden kehitystä inflaation aikana. Kosmiset häiriöt riippuvat mitan valinnasta, joten olen esitellyt hyvin tunnetut mittainvariantit muuttujat, Mukhanovin-Sasakin muuttujan q sekä mukanaliikkuvan kaarevuushäiriön R. Lasken skalaari- ja tensorihäiriöiden tehospektrit sekä relevantit spektriparametrit. Lopuksi käyn läpi kaksi yksinkertaista esimerkkiä, potenssilaki-inflaatio sekä Higgs-inflaatio. In this thesis I have reviewed the basic theory of single sca…
(K)over-bar* mesons in dense matter
2010
We study the properties of (K) over bar* mesons in nuclear matter using a unitary approach in coupled channels within the framework of the local hidden gauge formalism and incorporating the (K) over bar pi decay channel in matter. The in-medium (K) over bar *N interaction accounts for Pauli blocking effects and incorporates the (K) over bar* self-energy in a self-consistent manner. We also obtain the (K) over bar* (off-shell) spectral function and analyze its behavior at finite density and momentum. At a normal nuclear matter density, the (K) over bar* meson feels a moderately attractive potential, while the (K) over bar* width becomes five times larger than in free space. We estimate the t…
Giovanni Gentile. Tra teoria e prassi
2010
Ancora oggi, l’idealismo, in genere, e quello italiano, in particolare, sono considerati stereotipi di un paradigma speculativo, privo di riscontro pratico, come se il sostenitore della filosofia dello spirito fosse profondamente convinto della inutilità della filosofia pratica. Indubbiamente un filosofo,convinto del proprio ruolo e del proprio modello speculativo, non riconoscerà mai la primalità della prassi sulla teoria; ma sostenere la primalità della teoria non significa misconoscere la prassi. A qualunque corrente di pensiero ci si richiami, teoria e prassi sono sempre stati due aspetti strettamente connessi della filosofia; si può anche dire che la filosofia, in quanto tale, non mira…