Spelling suggestions: "subject:"dcaling limit"" "subject:"dcaling timit""
1 |
Limite de escala do modelo de armadilhas numa árvore / Scaling limit of the trap model on a treeGava, Renato Jacob 21 October 2011 (has links)
Nós apresentamos o processo K numa árvore, que é um processo de Markov com estados instantâneos e generaliza o processo K no grafo completo, como o limite do modelo de armadilha numa árvore, e aplicamos esse resultado para derivar um limite de escala para o modelo de armadilha do GREM. / We present the K process on a tree, which is a Markov process with instantaneous states and generalises the K process on the complete graph, as a limit of the trap model on a tree, and apply this result to derive a scaling limit to the GREM-like trap model.
|
2 |
Convergência de modelos de armadilhas no hipercubo / Convergence of trap models in the hypercubeLima, Paulo Henrique de Souza 22 February 2007 (has links)
Derivamos resultados para o Modelo de Armadilhas de Bouchaud no hipercubo a baixa temperatura. Este é um passeio aleatório simples simétrico em tempo contínuo que espera um tempo exponencial com taxa aleatória com distribuição no domínio de atração de uma lei estável de expoente menor do que 1. Os resultados recaem sobre o processo limite chamado K-processo, basicamente, um processo markoviano em um espaço de estados enumerável que entra em qualquer conjunto finito com distribuição uniforme. / We derive results for the Bouchaud trap model in the hypercube at low temperature. This is a continuous-time simple symmetric random walk on hypercube that waits a exponetial time with a random rate with distribution in the domain of attraction of a stable law of exponent lower than 1. The results arise to a scaling limit called k-process, roughly, a Markov process in a denumerable state space which enters finite sets with uniform distribution.
|
3 |
A teia Browniana radial / The Radial Brownian WebHenao, León Alexander Valencia 29 February 2012 (has links)
Introduzimos uma familia de trajetorias aleatorias coalescentes com certo tipo de comportamento radial a qual chamaremos de Teia Poissoniana radial discreta. Mostramos que o limite fraco na escala difusiva desta familia e uma familia de trajetorias aleatorias coalescentes que chamaremos de Teia Browniana radial. Por m, caraterizamos o objeto limite como um mapeamento continuo da Teia Browniana restrita num subconjunto de R2. / We introduce a family of coalescing random paths with certain kind of radial behavior. We call them the discrete radial Poisson Web. We show that under diusive scaling this family converges in distribution to a family of coalescing random paths which we call radial Brownian Web. Finally, we characterize the limiting object as a continuous mapping of the Brownian Web restricted to a subset of R2.
|
4 |
A teia Browniana radial / The Radial Brownian WebLeón Alexander Valencia Henao 29 February 2012 (has links)
Introduzimos uma familia de trajetorias aleatorias coalescentes com certo tipo de comportamento radial a qual chamaremos de Teia Poissoniana radial discreta. Mostramos que o limite fraco na escala difusiva desta familia e uma familia de trajetorias aleatorias coalescentes que chamaremos de Teia Browniana radial. Por m, caraterizamos o objeto limite como um mapeamento continuo da Teia Browniana restrita num subconjunto de R2. / We introduce a family of coalescing random paths with certain kind of radial behavior. We call them the discrete radial Poisson Web. We show that under diusive scaling this family converges in distribution to a family of coalescing random paths which we call radial Brownian Web. Finally, we characterize the limiting object as a continuous mapping of the Brownian Web restricted to a subset of R2.
|
5 |
Limite de escala do modelo de armadilhas numa árvore / Scaling limit of the trap model on a treeRenato Jacob Gava 21 October 2011 (has links)
Nós apresentamos o processo K numa árvore, que é um processo de Markov com estados instantâneos e generaliza o processo K no grafo completo, como o limite do modelo de armadilha numa árvore, e aplicamos esse resultado para derivar um limite de escala para o modelo de armadilha do GREM. / We present the K process on a tree, which is a Markov process with instantaneous states and generalises the K process on the complete graph, as a limit of the trap model on a tree, and apply this result to derive a scaling limit to the GREM-like trap model.
|
6 |
Convergência de modelos de armadilhas no hipercubo / Convergence of trap models in the hypercubePaulo Henrique de Souza Lima 22 February 2007 (has links)
Derivamos resultados para o Modelo de Armadilhas de Bouchaud no hipercubo a baixa temperatura. Este é um passeio aleatório simples simétrico em tempo contínuo que espera um tempo exponencial com taxa aleatória com distribuição no domínio de atração de uma lei estável de expoente menor do que 1. Os resultados recaem sobre o processo limite chamado K-processo, basicamente, um processo markoviano em um espaço de estados enumerável que entra em qualquer conjunto finito com distribuição uniforme. / We derive results for the Bouchaud trap model in the hypercube at low temperature. This is a continuous-time simple symmetric random walk on hypercube that waits a exponetial time with a random rate with distribution in the domain of attraction of a stable law of exponent lower than 1. The results arise to a scaling limit called k-process, roughly, a Markov process in a denumerable state space which enters finite sets with uniform distribution.
|
7 |
Limit theorems for generalizations of GUE random matricesBender, Martin January 2008 (has links)
This thesis consists of two papers devoted to the asymptotics of random matrix ensembles and measure valued stochastic processes which can be considered as generalizations of the Gaussian unitary ensemble (GUE) of Hermitian matrices H=A+A†, where the entries of A are independent identically distributed (iid) centered complex Gaussian random variables. In the first paper, a system of interacting diffusing particles on the real line is studied; special cases include the eigenvalue dynamics of matrix-valued Ornstein-Uhlenbeck processes (Dyson's Brownian motion). It is known that the empirical measure process converges weakly to a deterministic measure-valued function and that the appropriately rescaled fluctuations around this limit converge weakly to a Gaussian distribution-valued process. For a large class of analytic test functions, explicit formulae are derived for the mean and covariance functionals of this fluctuation process. The second paper concerns a family of random matrix ensembles interpolating between the GUE and the Ginibre ensemble of n x n matrices with iid centered complex Gaussian entries. The asymptotic spectral distribution in these models is uniform in an ellipse in the complex plane, which collapses to an interval of the real line as the degree of non-Hermiticity diminishes. Scaling limit theorems are proven for the eigenvalue point process at the rightmost edge of the spectrum, and it is shown that a non-trivial transition occurs between Poisson and Airy point process statistics when the ratio of the axes of the supporting ellipse is of order n -1/3. / Denna avhandling består av två vetenskapliga artiklar som handlar om gränsvärdessatser för slumpmatriser och måttvärda stokastiska processer. De modeller som studeras kan betraktas som generaliseringar av den gaussiska unitära ensembeln (GUE) av hermiteska n x n-matriser H=A+A†, där A är en matris vars element är oberoende, likafördelade, centrerade, komplexa normalfördelade stokastiska variabler. I artikel I betraktas ett system av växelverkande diffunderande partiklar på reella linjen, vissa specialfall av denna modell kan tolkas som egenvärdesdynamiken för matrisvärda Ornstein-Uhlenbeck-processer (Dysons brownska rörelse). Sedan tidigare är det känt att den empiriska måttprocessen konvergerar svagt mot en deterministisk måttvärd funktion och att fluktuationerna runt denna gräns, i lämplig skalning, konvergerer svagt mot en distributionsvärd gaussisk process. För en stor klass av analytiska testfunktioner härleds explicita formler för medelvärdes- och kovariansfunktionalerna för denna fluktuationsprocess. Artikel II behandlar en familj av slumpmatrisensembler som interpolerar mellan GUE och Ginibre-ensembeln, bestående av matriser A som ovan. För denna modell är egenvärdena komplexa och asymptotiskt likformigt fördelade i en ellips i komplexa planet. Skalningsgränsvärdessatser för egenvärdet med maximal realdel och för egenvärdespunktprocessen kring detta visas för ett allmänt val av interpolationsparametern i modellen. Då förhållandet mellan axlarna i den asymptotiska ellipsen är av storleksordning n-1/3 uppträder en övergångsfas mellan Airypunktprocess- och Poissonprocessbeteendena, typiska för GUE respektive Ginibre-ensembeln. / QC 20100705
|
8 |
Limites de escala em modelos de armadilhasSantos, Lucas Araújo 11 December 2015 (has links)
Submitted by Maike Costa (maiksebas@gmail.com) on 2016-03-28T13:00:07Z
No. of bitstreams: 1
arquivo total.pdf: 809257 bytes, checksum: 7406ef37d18bbaf1d9cdd5649f5cff19 (MD5) / Made available in DSpace on 2016-03-28T13:00:07Z (GMT). No. of bitstreams: 1
arquivo total.pdf: 809257 bytes, checksum: 7406ef37d18bbaf1d9cdd5649f5cff19 (MD5)
Previous issue date: 2015-12-11 / Let X = fX 0;X0 = 0g be a mean zero -stable random walk on Z with
inhomogeneous jump rates f 1
i ; i 2 Zg, with 2 (1; 2] and f i : i 2 Zg is a family of
independent random walk variables with common marginal distribution in the basis of
attraction of an -stable law with 2 (0; 2]. In this paper we derive results about the
long time behavior of this process, we obtain the scaling limit. To this end, rst we will
approach probability on metric spaces, speci cally treat the D space of the functions
that are right-continuous and have left-hand limits. We will also expose some results
dealing with stable laws that are directly related to the above problem. / Seja X = fX 0;X0 = 0g um passeio aleat orio de m edia zero -est avel sobre
Z com taxas de saltos n~ao homog^eneas f 1
i ; i 2 Zg, com 2 (1; 2] e f i : i 2 Zg
uma fam lia de vari aveis aleat orias independentes com distribui c~ao marginal comum
na bacia de atra c~ao de uma lei -est avel com 2 (0; 2]. Neste trabalho, obtemos
resultados sobre o comportamento a longo prazo deste processo obtendo seu limite
de escala. Para isso, faremos previamente um estudo sobre probabilidade em espa cos
m etricos, mais especi camente sobre o espa co D das fun coes cont nuas a direita com
limite a esquerda. Tamb em iremos expor alguns resultados que tratam de leis est aveis
que est~ao relacionadas diretamente ao problema supracitado.
|
9 |
Periodic Ising CorrelationsHystad, Grethe January 2009 (has links)
We consider the finite two-dimensional Ising model on a lattice with periodic boundaryconditions. Kaufman determined the spectrum of the transfer matrix on the finite,periodic lattice, and her derivation was a simplification of Onsager's famous result onsolving the two-dimensional Ising model. We derive and rework Kaufman's resultsby applying representation theory, which give us a more direct approach to computethe spectrum of the transfer matrix. We determine formulas for the spin correlationfunction that depend on the matrix elements of the induced rotation associated withthe spin operator. The representation of the spin matrix elements is obtained byconsidering the spin operator as an intertwining map. We wrap the lattice aroundthe cylinder taking the semi-infinite volume limit. We control the scaling limit of themulti-spin Ising correlations on the cylinder as the temperature approaches the criticaltemperature from below in terms of a Bugrij-Lisovyy conjecture for the spin matrixelements on the finite, periodic lattice. Finally, we compute the matrix representationof the spin operator for temperatures below the critical temperature in the infinite-volume limit in the pure state defined by plus boundary conditions.
|
10 |
Limit theorems for limit order booksPaulsen, Michael Christoph 21 August 2014 (has links)
Im ersten Teil der Dissertation wird ein diskretes stochastisches zustandsabhängiges Modell eines zweiseitigen Limit Orderbuchs als bestehend aus den Zustandsgrößen bester Bidpreis (Geldkurs), bester Askpreis (Briefkurs) und vorhandener Kauf- bzw. Verkaufsdichte definiert. Für eine einfache Skalierung mit zwei Zeitskalen wird ein Grenzwertsatz bewiesen. Die Veränderungen der besten Bid- und Askpreise werden im Sinne des Gesetzes der großen Zahlen skaliert und dies entspricht der langsameren Zeitskala. Das Platzieren bzw. Stornieren der Limitorder findet auf der schnelleren Zeitskala statt. Der Grenzwertsatz besagt, dass die fundamentalen Zustandsgrößen, gegeben Regularitätsbedingungen der einkommenden Order, fast sicher zu einem stetigen Limesmodell konvergieren. Im Limesmodell sind der beste Bidpreis und der beste Askpreis die eindeutigen Lösungen von zwei gekoppelten gewöhnlichen DGLen. Die Kauf- und Verkaufsdichten sind jeweils als eindeutige Lösungen von linearen hyperbolischen PDGLen, die anhand der Erwartungswerte der einkommenden Orderparameter festgelegt sind, gegeben. Die Lösungen sind in geschlossener Form erhältlich. Im zweiten Teil wird ein funktionaler zentraler Grenzwertsatz d.h. ein Invarianzprinzip für ein vereinfachtes Modell eines Limitorderbuches bewiesen. Unter einer natürlichen Skalierung konvergiert der zweidimensionale Preisprozess (Bid- und Askpreis) in Verteilung zu einer Semimartingal reflektierten Brownschen Bewegung in der zugelassenen Preismenge. Gleichzeitig konvergieren die Kauf- und Verkaufsdichten im schwachen Sinn zum Betrag einer zweiparametrischen Brownschen Bewegung. Es wird weiterhin anhand eines Beispiels gezeigt, wie man für das Modell im ersten Teil eine stochastiche PDGL, unter einer starken Stationaritätsannahme für die Orderplatzierungen und -stornierungen, herleiten kann. Im dritten Teil wird ein Mittelungs- bzw. ein Invarianzprinzip für diskrete Banach- bzw. Hilbertraumwertige stochastische Prozesse bewiesen. / In the first part of the thesis, we define a random state-dependent discrete model of a two-sided limit order book in terms of its key quantities best bid [ask] price and the standing buy [sell] volume density. For a simple scaling that introduces a slow time scaling, that is equivalent to the classical law of large numbers, for the bid/ask prices and a faster time scale for the limit volume placements/cancelations, that keeps the expected volume rate over the considered price interval invariant, we prove a limit theorem. The limit theorem states that, given regularity conditions on the random order flow, the key quantities converge in the sense of a strong law of large numbers to a tractable continuous limiting model. The limiting model is such that the best bid and ask price dynamics can be described in terms of two coupled ODE:s, while the dynamics of the relative buy and sell volume density functions are given as the unique solutions of two linear first-order hyperbolic PDE:s with variable coefficients, specified by the expectation of the order flow parameters. In the second part, we prove a functional central limit theorem i.e. an invariance principle for an order book model with block shaped volume densities close to the spread. The weak limit of the two-dimensional price process (best bid and ask price) is given by a semi-martingale reflecting Brownian motion in the set of admissible prices. Simultaneously, the relative buy and sell volume densities close to the spread converge weakly to the modulus of a two-parameter Brownian motion. We also demonstrate an example how to easily derive an SPDE for the relative volume densities in a simple case, when a strong stationarity assumption is made on the limit order placements and cancelations for the model suggested in the first part. In the third and final part of the thesis, we prove an averaging and an invariance principle for discrete processes taking values in Banach and Hilbert spaces, respectively.
|
Page generated in 0.2077 seconds