Results 21 to 30 of about 843 (137)
Differentiable mappings on products with different degrees of differentiability in the two factors [PDF]
, 2014 We develop differential calculus of $C^{r,s}$-mappings on products of locally convex spaces and prove exponential laws for such mappings. As an application, we consider differential equations in Banach spaces depending on a parameter in a locally convex ...
Alexander Schmeding +34 more
core +4 more sources
Linear response for intermittent maps [PDF]
, 2016 We consider the one parameter family $\alpha \mapsto T_\alpha$ ($\alpha \in [0,1)$) of Pomeau-Manneville type interval maps $T_\alpha(x)=x(1+2^\alpha x^\alpha)$ for $x \in [0,1/2)$ and $T_\alpha(x)=2x-1$ for $x \in [1/2, 1]$, with the associated ...
Baladi, V., Todd, M.
core +5 more sources
Global Existence of Solutions of the Semiclassical Einstein Equation for Cosmological Spacetimes [PDF]
, 2014 We study the solutions of the semiclassical Einstein equation in flat cosmological spacetimes driven by a massive conformally coupled scalar field. In particular, we show that it is possible to give initial conditions at finite time to get a state for ...
Pinamonti, Nicola, Siemssen, Daniel
core +2 more sources
Explicit description of spherical rigid hypersurfaces in C² [PDF]
, 2015 a
Ezhov, V., Schmalz, G.
core +1 more source
A non-cooperative foundation for the continuous Raiffa solution [PDF]
, 2017 This paper provides a non-cooperative foundation for (asymmetric generalizations of) the continuous Raiffa solution. Specifically, we consider a continuous-time variation of the classic Ståhl–Rubinstein bargaining model, in which there is a finite ...
Driesen, Bram +2 more
core +1 more source
Strictly Dominated Strategies in the Replicator-Mutator Dynamics [PDF]
, 2011 The replicator-mutator dynamics is a set of differential equations frequently used in biological and socioeconomic contexts to model evolutionary processes subject to mutation, error or experimentation.
Izquierdo Millán, Luis Rodrigo +1 more
core +2 more sources
Critical Branching Brownian Motion with Killing
, 2015 We obtain sharp asymptotic estimates for hitting probabilities of a critical branching Brownian motion in one dimension with killing at 0 We also obtain sharp asymptotic formulas for the tail probabilities of the number of particles killed at 0.
Lalley, Steven P., Zheng, Bowei
core +1 more source
Stochastic mirror descent dynamics and their convergence in monotone variational inequalities [PDF]
, 2018 We examine a class of stochastic mirror descent dynamics in the context of monotone variational inequalities (including Nash equilibrium and saddle-point problems). The dynamics under study are formulated as a stochastic differential equation driven by a
Mertikopoulos, Panayotis +1 more
core +5 more sources
Proceedings in Applied Mathematics and Mechanics, Volume 26, Issue 1, March 2026.ABSTRACT Regularity properties of solutions for a class of quasi‐stationary models in one spatial dimension for stress‐modulated growth in the presence of a nutrient field are proven. At a given point in time the configuration of a body after pure growth is determined by means of a family of ordinary differential equations in every point in space ...
Julian Blawid, Georg Dolzmann
wiley +1 more source
, 2020 A system of polynomial ordinary differential equations (ODEs) is specified via a vector of multivariate polynomials, or vector field, $F$. A safety assertion $\psi\rightarrow[F]\phi$ means that the trajectory of the system will lie in a subset $\phi ...
Boreale, Michele
core +1 more source