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Linear-implicit versions of strong Taylor numerical schemes for finite dimensional Itô stochastic differential equations (SDEs) are shown to have the same order as the original scheme. The combined truncation and global discretization error of an gamma strong linear-implicit Taylor scheme with time-step delta applied to the N dimensional Itô-Galerkin SDE for a class of parabolic stochastic partial differential equation (SPDE) with a strongly monotone linear operator with eigenvalues lambda 1 <= lambda 2 <= ... in its drift term is then estimated by K(lambda N -½ + 1 + delta gamma) where the constant K depends on the initial value, bounds on the other coefficients in the SPDE and the length of the time interval under consideration.
AMS subject classifications: 35R60, 60H15, 65M15, 65U05.
Martin Möller, Professor für Algebra und Geometrie an der Goethe-Universität, erhält in der dritten Ausschreibungsrunde des European Research Council (ERC) einen »Starting Independent Researcher Grant«. Mit dem 2007 erstmals ausgeschriebenen Programm der ERC-Grants will die Europäische Union (EU) europaweit kreative Wissenschaftler und zukunftsweisende Projekte fördern. Für den Bereich »Physical Sciences and Engineering « waren 1205 Bewerbungen aus der ganzen Welt eingegangen, 2873 für die Ausschreibung insgesamt. Alleiniges Kriterium bei der Begutachtung der Anträge ist wissenschaftliche Exzellenz. Mit den vom ERC bewilligten Mitteln in Höhe von einer Million Euro für die nächsten fünf Jahre will Möller seine Forschergruppe um vier Mitarbeiter erweitern.
We presented a proof for the classical stable limit laws under use of contraction method in combination with the Zolotarev metric. Furthermore, a stable limit law was proved for scaled sums of growing into sequences. This limit law was alternatively formulated for sequences of random variables defined by a simple degenerate recursion.
We present a new self-contained and rigorous proof of the smoothness of invariant fiber bundles for dynamic equations on measure chains or time scales. Here, an invariant fiber bundle is the generalization of an invariant manifold to the nonautonomous case. Our main result generalizes the “Hadamard-Perron theorem” to the time-dependent, infinite-dimensional, noninvertible, and parameter-dependent case, where the linear part is not necessarily hyperbolic with variable growth rates. As a key feature, our proof works without using complicated technical tools.
Dynamical systems driven by Gaussian noises have been considered extensively in modeling, simulation, and theory. However, complex systems in engineering and science are often subject to non-Gaussian fluctuations or uncertainties. A coupled dynamical system under a class of Lévy noises is considered. After discussing cocycle property, stationary orbits, and random attractors, a synchronization phenomenon is shown to occur, when the drift terms of the coupled system satisfy certain dissipativity and integrability conditions. The synchronization result implies that coupled dynamical systems share a dynamical feature in some asymptotic sense.
This work connects Markov chain imbedding technique (MCIT) introduced by M.V. Koutras and J.C. Fu with distributions concerning the cycle structure of permutations. As a final result program code is given that uses MCIT to deliver proper numerical values for these. The discrete distributions of interest are the one of the cycle structure, the one of the number of cycles, the one of the rth longest and shortest cycle and finally the length of a random chosen cycle. These are analyzed for equiprobable permutations as well as for biased ones. Analytical solutions and limit distributions are also considered to put the results on a safe, theoretical base.
Condensing phenomena for systems biology, ecology and sociology present in real life different complex behaviors. Based on local interaction between agents, we present another result of the Energy-based model presented by [20]. We involve an additional condition providing the total condensing (also called consensus) of a discrete positive measure. Key words: Condensing; consensus; random move; self-organizing groups; collective intelligence; stochastic modeling. AMS Subject Classifications: 81T80; 93A30; 37M05; 68U20
Tropical geometry is the geometry of the tropical semiring \[\mathbb{T}:=(\mathbb{R}\cup\{\infty\},\min,+).\] Classical algebraic structures correspond to tropical structures. If $I\lhd K[x_1,\ldots,x_n]$ is an ideal in a polynomial ring over a field $K$ with valuation $v$, then the classical algebraic variety correspond to the tropical variety $T(I)$. It is the set of all points $w$, such that the minimum $\min\{v(c_\alpha)+w\cdot\alpha\}$ is achieved twice for all $f=\sum_\alpha c_\alpha x^\alpha\in I$. So tropical geometry relates algebraic geometric problems with discrete geometric problems. In this thesis we obtain a tropical version of the Eisenbud-Evans Theorem which states that every algebraic variety in $\mathbb{R}^n$ is the intersection of $n$ hypersurfaces. We find out that in the tropical setting every tropical variety $T(I)$ can be written as an intersection of only $(n+1)$ tropical hypersurfaces. So we get a finite generating system of $I$ such that the corresponding tropical hypersurfaces intersect to the tropical variety, a so-called tropical basis. Let $I \lhd K[x_1,\ldots,x_n]$ be a prime ideal generated by the polynomials $f_1, \ldots, f_r$. Then there exist $g_0,\ldots,g_{n} \in I$ such that \[ T(I) \ = \ \bigcap_{i=0}^{n}T(g_i)\] and thus $\mathcal{G} := \{f_1, \ldots, f_r, g_0, \ldots, g_{n}\}$ is a tropical basis for $I$ of cardinality $r+n+1$. Tropical bases are discussed by Bogart, Jensen, Speyer, Sturmfels and Thomas where it is shown that tropical bases of linear polynomials of a linear ideal have to be very large. We do not restrict the tropical basis to consist of linear polynomials and therefore we get a shorter tropical basis. But the degrees of our polynomials can be very large. The main ingredient to get a short tropical basis is the use of projections, in particular geometrically regular projections. Together with the fact that preimages of projections of tropical varieties are themselves tropical varieties of a certain elimination ideal we get the desired result. Let $I \lhd K[x_1, \ldots, x_n]$ be an $m$-dimensional prime ideal and $\pi : \mathbb{R}^n \to \mathbb{R}^{m+1}$ be a rational projection. Then $\pi^{-1}(\pi(T(I)))$ is a tropical variety, namely \[ \pi^{-1}(\pi(T(I))) \ = \ T(J \cap K[x_1, \ldots, x_n]) \,\] Here $J$ is an ideal in $K[x_1,\ldots,x_n,\lambda_1,\ldots,\lambda_{n-m-1}]$ derived from the ideal $I$. We show that this elimination ideal is a principal ideal which yields a polynomial in our tropical basis. The advantage of our method is that we find our polynomials by projections and therefore we can use the results of Gelfand, Kapranov and Zelevinsky , of Esterov and Khovanskii , and of Sturmfels, Tevelev and Yu. With mixed fiber polytopes we get the structure and combinatorics of the image of a tropical variety and therefore the structure of the polynomials in our tropical basis. Let $I=\lhd K[x_1,\ldots,x_n]$ an $m$-dimensional ideal, generated by generic polynomials $f_1,\ldots, f_{n-m}$, $\pi:\mathbb{R}^n\to\mathbb{R}^{m+1}$ a projection and $\psi$ a projection presented by a matrix with a rowspace equal to the kernel of $\pi$. Then up to affine isomorphisms, the cells of the dual subdivision of $\pi^{-1} \pi T(I)$ are of the form \[ \sum_{i=1}^p \Sigma_{\psi} (C_{i1}^{\vee}, \ldots, C_{i{k}}^{\vee}) \] for some $p\in\mathbb{N}$ and faces $F_1, \ldots, F_p$ of $T(f_1)\cap\ldots\cap T(f_k)$ and the dual cell of $F_i\subseteq U = T(f_1)\cup\ldots\cup T(f_k)$ is given by $F_i^\vee=C_{i1}^{\vee}+ \ldots+ C_{ik}^{\vee}$ with faces $C_{i1}, \ldots, C_{i k}$ of $T(f_1), \ldots, T(f_{k})$. In case that we project a tropical curve we want to find the number of $(n-1)$-cells of the above form with $p>1$, i.e. the cells which are dual to vertices of $\pi(T(I))$ which are the intersection of the images of two non-adjacent $1$-cells of $T(I)$. Vertices of this type are called selfintersection points. We show that there exist a tropcal line $L_n\subset\mathbb{R}^n$ and a projection $\pi:\mathbb{R}^n\to\mathbb{R}^2$, such that $L_n$ has $\sum_{i=1}^{n-2}i$ selfintersection points. Furthermore we find tropical curves $\mathcal{C}\subset\mathbb{R}^n$, which are transversal intersections of $n-1$ tropical hypersurfaces of degrees $d_1,\ldots,d_{n-1}$ and a projection $\pi:\mathbb{R}^n\to\mathbb{R}^2$, such that $\mathcal{C}$ has at least $(d_1\cdot\ldots\cdot d_{n-1})^2\cdot \sum_{i=1}^{n-2}i) $ selfintersection points. A caterpillar is a certain simple type of a tropical line and for this type we show that it can have at most $\sum_{i=1}^{n-2}i$ selfintersection points.