Add to ORKGAbstract. Motivated by the well-posedness of birth-and-growth processes, a stochastic geometric differential equation and, hence, a stochastic geometric dynamical system are proposed. In fact, a birth-and-growth process can be rigorously modeled as a suitable combination, involving the Minkowski sum and the Aumann integral, of two very general set-valued processes representing nucleation and growth dynamics, respectively. The simplicity of the proposed geometric approach allows to avoid problems of boundary regularities arising from an analytical definition of the front growth. In this framework, growth is generally anisotropic and, according to a mesoscale point of view, is non local, i.e. at a fixed time instant, growth is the same at eac...
Birth-and-growth processes provide a large class of mathematical models for many phase change ph...
We approximate stochastic processes in finite dimension by dynamical systems. We provide trajector...
AbstractWhen a system is acted upon by exterior disturbances, its time-development can often be desc...
Motivated by the well-posedness of birth-and-growth processes, a stochastic geometric differential e...
A birth-and-growth model is rigorously defined as a suitable combination, involving the Minkowski su...
In literature,birth-and-growth processes are the composition of a marked point process together with...
All the results of the present thesis have been obtained facing problems related to the study of the...
The paper considers a particular family of fuzzy monotone set–valued stochastic processes. In order ...
Nucleation and growth processes arise in a variety of natural and technological applications, such a...
We consider a birth and growth model for crystallization processes in d space dimensions, where grow...
Aim of this paper is to show the application of Stochastic Geometry in transformation kinetics theor...
Partially supported by the ASI and by the MURST 40% programme on "Nonlinear problems and applic...
We show that the Gompertz equation describes the evolution in time of the median of a geometric stoc...
The aim of this work is to establish essential properties of spatial birth-and-death processes with ...
Abstract Many real phenomena may be modelled as locally finite unions of d-dimensional time dependen...
Birth-and-growth processes provide a large class of mathematical models for many phase change ph...
We approximate stochastic processes in finite dimension by dynamical systems. We provide trajector...
AbstractWhen a system is acted upon by exterior disturbances, its time-development can often be desc...
Motivated by the well-posedness of birth-and-growth processes, a stochastic geometric differential e...
A birth-and-growth model is rigorously defined as a suitable combination, involving the Minkowski su...
In literature,birth-and-growth processes are the composition of a marked point process together with...
All the results of the present thesis have been obtained facing problems related to the study of the...
The paper considers a particular family of fuzzy monotone set–valued stochastic processes. In order ...
Nucleation and growth processes arise in a variety of natural and technological applications, such a...
We consider a birth and growth model for crystallization processes in d space dimensions, where grow...
Aim of this paper is to show the application of Stochastic Geometry in transformation kinetics theor...
Partially supported by the ASI and by the MURST 40% programme on "Nonlinear problems and applic...
We show that the Gompertz equation describes the evolution in time of the median of a geometric stoc...
The aim of this work is to establish essential properties of spatial birth-and-death processes with ...
Abstract Many real phenomena may be modelled as locally finite unions of d-dimensional time dependen...
Birth-and-growth processes provide a large class of mathematical models for many phase change ph...
We approximate stochastic processes in finite dimension by dynamical systems. We provide trajector...
AbstractWhen a system is acted upon by exterior disturbances, its time-development can often be desc...