A probabilistic description is essential for understanding growth processes in non-stationary states. In this paper, we compute time-dependent probability density functions (PDFs) in order to investigate stochastic logistic and Gompertz models, which are two of the most popular growth models. We consider different types of short-correlated multiplicative and additive noise sources and compare the time-dependent PDFs in the two models, elucidating the effects of the additive and multiplicative noises on the form of PDFs. We demonstrate an interesting transition from a unimodal to a bimodal PDF as the multiplicative noise increases for a fixed value of the additive noise. A much weaker (leaky) attractor in the Gompertz model leads to a signif...
Stochastic processes are ubiquitous in nature and laboratories, and play a major role across traditi...
Stochastic processes are ubiquitous in nature and laboratories, and play a major role across traditi...
A probabilistic description is essential for understanding the dynamics of stochastic systems far fr...
A probabilistic description is essential for understanding growth processes in non-stationary states...
Many systems in nature and laboratories are far from equilibrium and exhibit significant fluctuation...
Many systems in nature and laboratories are far from equilibrium and exhibit significant fluctuation...
In this paper we investigate the Shannon’s, Fisher’s and Tsallis’ information measures for the Gompe...
As a measure of sustainability, Fisher information is employed in the Gompertz growth model. The eff...
We elucidate the effect of different deterministic nonlinear forces on geometric structure of stocha...
AbstractThis paper aims to study the influence of colored noise to Gompertzian and Logistic growth m...
We study the effect of noise in an avascular tumor growth model. The growth mechanism we consider is...
A probabilistic description is essential for understanding the dynamics of stochastic systems far fr...
We propose a new methodology to understand a stochastic process from the perspective of information ...
ISBN 978-960-6766-32-9This paper investigates the stochastic linear and logistic (Verhulst, Gompertz...
The propagation of fake news in online social networks nowadays is becoming a crucial phenomenon. Co...
Stochastic processes are ubiquitous in nature and laboratories, and play a major role across traditi...
Stochastic processes are ubiquitous in nature and laboratories, and play a major role across traditi...
A probabilistic description is essential for understanding the dynamics of stochastic systems far fr...
A probabilistic description is essential for understanding growth processes in non-stationary states...
Many systems in nature and laboratories are far from equilibrium and exhibit significant fluctuation...
Many systems in nature and laboratories are far from equilibrium and exhibit significant fluctuation...
In this paper we investigate the Shannon’s, Fisher’s and Tsallis’ information measures for the Gompe...
As a measure of sustainability, Fisher information is employed in the Gompertz growth model. The eff...
We elucidate the effect of different deterministic nonlinear forces on geometric structure of stocha...
AbstractThis paper aims to study the influence of colored noise to Gompertzian and Logistic growth m...
We study the effect of noise in an avascular tumor growth model. The growth mechanism we consider is...
A probabilistic description is essential for understanding the dynamics of stochastic systems far fr...
We propose a new methodology to understand a stochastic process from the perspective of information ...
ISBN 978-960-6766-32-9This paper investigates the stochastic linear and logistic (Verhulst, Gompertz...
The propagation of fake news in online social networks nowadays is becoming a crucial phenomenon. Co...
Stochastic processes are ubiquitous in nature and laboratories, and play a major role across traditi...
Stochastic processes are ubiquitous in nature and laboratories, and play a major role across traditi...
A probabilistic description is essential for understanding the dynamics of stochastic systems far fr...