Universality in COVID-19 spread in view of the Gompertz function

Ohnishi, Akira; Namekawa, Yusuke; Fukui, Tokuro

doi:10.1101/2020.06.18.20135210

Cited by 13 publications

(11 citation statements)

References 29 publications

(58 reference statements)

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“…Figure 5 shows that, as the CSIR model solution predicts, for each country considered, the integral of the RMM and the RCO are linearly correlated to a high degree. As orthogonal correlative support for the veracity of the CSIR solution, we note that other authors (9) have observed that the daily COVID-19 case data from many countries can be fit with a Gompertz model. Since Equation 13 is also a Gompertz equation, those observations support the assertion that Equations 10 to 13 properly model epidemics.…”

Section: Figure 3 Complete Sir (Csir) Model Predictions For Number Of New Daily Cases A) Southsupporting

confidence: 74%

Characterizing and Managing an Epidemic: A First Principles Model and a Closed Form Solution to the Kermack and McKendrick Equations

Duclos¹,

Reichert

2021

Preprint

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We derived a closed-form solution to the original epidemic equations formulated by Kermack and McKendrick in 1927 (1). The complete solution is validated using independently measured mobility data and accurate predictions of COVID-19 case dynamics in multiple countries. It replicates the observed phenomenology, quantitates pandemic dynamics, and provides simple analytical tools for policy makers. Of particular note, it projects that increased social containment measures shorten an epidemic and reduce the ultimate number of cases and deaths. In contrast, the widely used Susceptible Infectious Recovered (SIR) models, based on an approximation to Kermack and McKendricks original equations, project that strong containment measures delay the peak in daily infections, causing a longer epidemic. These projections contradict both the complete solution and the observed phenomenology in COVID-19 pandemic data. The closed-form solution elucidates that the two parameters classically used as constants in approximate SIR models cannot, in fact, be reasonably assumed to be constant in real epidemics. This prima facie failure forces the conclusion that the approximate SIR models should not be used to characterize or manage epidemics. As a replacement to the SIR models, the closed-form solution and the expressions derived from the solution form a complete set of analytical tools that can accurately diagnose the state of an epidemic and provide proper guidance for public health decision makers.

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Section: Figure 3 Complete Sir (Csir) Model Predictions For Number Of New Daily Cases A) Southsupporting

confidence: 74%

Characterizing and Managing an Epidemic: A First Principles Model and a Closed Form Solution to the Kermack and McKendrick Equations

Duclos¹,

Reichert

2021

Preprint

View full text Add to dashboard Cite

show abstract

“…While the excess peaks look highly symmetrical around their maximum and can thus be reasonably well modeled with Gaussians, as described before, the peak of the spring 2020, associated with the COVID-19 pandemic, is clearly asymmetric. We have tried several possible parametrizations for that distribution, such as bifurcated Gaussians with a common peak, generalized logistics, or else, to reflect the asymmetry, but in the end we resolved to adopt the derivative of a Gompertz function [ 19 , 20 ] simply because it is customarily adopted by epidemiologists to describe epidemic evolution’s over time and we therefore considered it more suitable to our purpose.…”

Section: Methodsology Of the Data Analysismentioning

confidence: 99%

A Statistical Analysis of Death Rates in Italy for the Years 2015–2020 and a Comparison with the Casualties Reported from the COVID-19 Pandemic

Bonifazi

Lista

Menasce

et al. 2021

Infectious Disease Reports

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We analyze the data about casualties in Italy in the period 1 January 2015 to 30 September 2020 released by the Italian National Institute of Statistics (ISTAT). The aim of this article was the description of a statistically robust methodology to extract quantitative values for the seasonal excesses of deaths featured by the data, accompanying them with correct estimates of the relative uncertainties. We will describe the advantages of the method adopted with respect to others listed in literature. The data exhibit a clear sinusoidal behavior, whose fit allows for a robust subtraction of the baseline trend of casualties in Italy, with a surplus of mortality in correspondence to the flu epidemics in winter and to the hottest periods in summer. The overall quality of the fit to the data turns out to be very good, an indication of the validity of the chosen model. We discuss the trend of casualties in Italy by different classes of ages and for the different genders. We finally compare the data-subtracted casualties, as reported by ISTAT, with those reported by the Italian Department for Civil Protection (DPC) relative to the deaths directly attributed to the Coronavirus Disease 2019 caused by the SARS-CoV-2 virus (COVID-19), and we point out the differences in the two samples, collected under different assumptions.

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“…Covid-19 mortality above age 20 follows everywhere the so-called Gompertz law of mortality (in which death rates can be expressed as an exponential function of age). 23 24 25 As a result of this strong mathematical regularity, death rates unknown at one given age can be extrapolated from death rates observed at other ages. Another advantage of the Gompertz modeling is its partition of mortality into two main components: its age gradient (i.e., the slope, or the tempo of mortality) that corresponds to variations by age, and its intensity (the level or quantum of mortality) that captures the overall severity at all ages.…”

Section: Mortality Estimation Strategymentioning

confidence: 99%

Estimating the death toll of the Covid-19 pandemic in India

Guilmoto

2021

Preprint

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The absence of reliable registration of Covid-19 deaths in India has prevented the proper assessment and monitoring of what appears to be one of the worst episodes of coronavirus pandemic. India's relatively young age structure tends to conceal the severity of Covid-19 mortality, which is concentrated in older age groups. In this paper, we present four different demographic samples of Indian populations for which we have information on both their demographic structures and death outcomes. We show that we can model the age gradient of Covid-19 mortality in India and use this modeling for estimating the most accurate level of Covid-19 mortality in the country. Our findings point to a death toll of about 2.2 million persons by late May 2021. Once India's age structure taken into account, these figures correspond to one of the most severe examples of Covid-19 mortality in the world.

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Universality in COVID-19 spread in view of the Gompertz function

Cited by 13 publications

References 29 publications

Characterizing and Managing an Epidemic: A First Principles Model and a Closed Form Solution to the Kermack and McKendrick Equations

Characterizing and Managing an Epidemic: A First Principles Model and a Closed Form Solution to the Kermack and McKendrick Equations

A Statistical Analysis of Death Rates in Italy for the Years 2015–2020 and a Comparison with the Casualties Reported from the COVID-19 Pandemic

Estimating the death toll of the Covid-19 pandemic in India

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