Litcius/Paper detail

Generalized Beta Models and Population Growth: So Many Routes to Chaos

M. Fátima Brilhante, M. Ivette Gomes, Sandra Mendonça, Dínis Pestana, Pedro Pestaña

2023Fractal and Fractional11 citationsDOIOpen Access PDF

Abstract

Logistic and Gompertz growth equations are the usual choice to model sustainable growth and immoderate growth causing depletion of resources, respectively. Observing that the logistic distribution is geo-max-stable and the Gompertz function is proportional to the Gumbel max-stable distribution, we investigate other models proportional to either geo-max-stable distributions (log-logistic and backward log-logistic) or to other max-stable distributions (Fréchet or max-Weibull). We show that the former arise when in the hyper-logistic Blumberg equation, connected to the Beta (p,q) function, we use fractional exponents p−1=1∓1/α and q−1=1±1/α, and the latter when in the hyper-Gompertz-Turner equation, the exponents of the logarithmic factor are real and eventually fractional. The use of a BetaBoop function establishes interesting connections to Probability Theory, Riemann–Liouville’s fractional integrals, higher-order monotonicity and convexity and generalized unimodality, and the logistic map paradigm inspires the investigation of the dynamics of the hyper-logistic and hyper-Gompertz maps.

Topics & Concepts

Gompertz functionMathematicsLogistic functionWeibull distributionLogistic distributionConvexityPopulationLogistic regressionApplied mathematicsStatisticsCombinatoricsDemographySociologyEconomicsFinancial economicsFractional Differential Equations SolutionsComplex Systems and Time Series AnalysisStatistical Mechanics and Entropy