Qualitative forecast and temporal evolution ofthe disease spreading using a simplified modeland COVID-19 data for Italy

In a previous paper [1] a simplified SEIR model applied to COVID-19 cases detected in Italy, including the lockdown period, has shown a good fitting to the time evolution of the disease during the observed period.In this paper that model is applied to the initial data available for Italy in order to forecast, in a qualitative way, the time evolution of the disease spreading. The values obtained are to be considered indicative.The same model has been applied both to the data relating to Italy and to some italian regions generally finding good qualitative results.The only tuning parameter in the model is the ‘incubation period’ τ.In this modelization the tuning parameter, together with the calculated growth rate of the exponential curve used to approximate the early stage data, are in strong relationship with the compartments’ transfer rates.The relationships between the parameters simplify modeling by allowing a rough (not supported by statistical considerations) forecast of the time evolution, starting from the first period of growth of the diffusion.A simplified compartmental model that uses only the incubation period and the exponential growth rate as parameters is applied to the COVID-19 data for Italy in several periods of the initial growth of the diffusion showing the different stages of the spread evolution. The simplification is based on the strong protection measures that were in place in Italy during the lockdown period after the initial free diffusion.


Introduction
A simplified SEIR compartmental model seems to fit quite well the evolution of COVID-19 during the period of social isolation in Italy [1]. In this paper the model is used to forecast the diffusion behavior starting from the initial stage of infection growth.
The dataset is the same of the previous paper [1] and is available on the website [2] managed by italian government. The model used is a simplification of the Susceptible-Exposed-Infected-Recovered type (see [3], [5], [4]) and the simplification is based on the relationships between the model parameters and the growth rate of the exponential curve in the early stage of diffusion (see [1]). The dataset cover a period where after a initial growth of the COVID-19 diffusion a 'lockdown' period, characterized by strong social isolation rules, were imposed to act effectively against the rapid spread of the disease.
The lockdown period, simplifying, can also be thought of as a type of treatment for infective individuals. We can therefore imagine that infective individuals, detected daily, in general are managed ('treated') in such a way that they cannot infect other susceptible individuals. This 'treatment' includes both hospitalization and isolation. To avoid confusing the SEIR model with this simplification, in this context, we will call T (Treated) the compartment of infected people who are no longer able to transmit the pathogen.
The social isolation, also allows us to neglect any potential transfers between the various departments beyond the required path S → E → I → T . The 'treated' compartment in this case can be seen as a sample of individuals in whom the disease has been widespread and the spread is characterized by the model coefficients. The significance of the sample is related to the number of detections of the disease, and their distribution, carried out in the population.
The model can be set up easily once initial the growth rate is calculated and a suitable value for the incubation period is defined. In this work the data used are normalized to 1000 individuals in order to generalize the results. The first part of data, in the growing period, are used to calculate κ, the remaining data are used for comparison with the model's forecasting.

Conclusions
A simplified compartmental model [1] can be used to easily predict a qualitative behavior of a disease diffusion starting from the early stage. It is obviously necessary that the number of detections of the disease and their distribution, carried out in the population, are statistically significant, in this case the simplified model can be used to roughly estimate the qualitative behavior of the spread.
The only tuning parameter in the simplified model is the 'incubation period' τ . In this modelization the tuning parameter, together with the calculated growth rate κ of the exponential curve used to approximate the early stage data, are in strong relationship with the compartments' transfer rates. The relationships between the parameters simplify modeling by allowing a rough (not supported by statistical considerations) forecast of the time evolution, starting from the first period of growth of the diffusion.

Model parameters and detection criteria
The key parameters needed to set up a simplified SEIT model are (see [1]): • the incubation period τ ; • the rate k calculated in the first approximation of the initial exponential growth y(t) = y 0 e kt .

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. CC-BY 4.0 International license It is made available under a is the author/funder, who has granted medRxiv a license to display the preprint in perpetuity. (which was not certified by peer review) The copyright holder for this preprint this version posted June 23, 2020. It is important to note that the exponential growth k in this simplification appears as a dimensionless number. To avoid confusion we will use κ for the dimensionless parameter.
It is assumed that the number, the quality and the distribution of tests to detect the disease in the population are statistically significant; in this case, using the simplified SEIT model it is possible to easily characterize, in a qualitative way, the disease diffusion in the compartments S,E,I,T over time.
The system of differential equations for the simplified model S → E → I → T is: The temporal evolution follows a disruption of the equilibrium at t = 0: where N is the number of individuals susceptible to the disease. In this work the data are normalized to 1000 individuals.
In this simplification it is assumed (see [1]) a relationship between κ and the transfer rates α xy between the compartments x, y in the unique available path S → E → I → T .
where R 0 is the basic reproduction number calculated as spectral radius of the next generation matrix (see [3], [4], [5]) in the simplified model (see [1]).
In order to estimate κ it is important to define a criteria to detect the initial growth in an effective way.
The criteria used in this context is that a new κ is calculated when the daily variation ∆T t of the detected cases exceed the last maximum of daily variation.

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The copyright holder for this preprint this version posted June 23, 2020. . https://doi.org/10.1101/2020.06.22.20137133 doi: medRxiv preprint Table 1: Records corresponding to the days when exceeding the last maximum daily variation value. The growth rate κ is calculated as per (5). The full dataset is in tab. 2   is the author/funder, who has granted medRxiv a license to display the preprint in perpetuity.

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The copyright holder for this preprint this version posted June 23, 2020. . https://doi.org/10.1101/2020.06.22.20137133 doi: medRxiv preprint For each record in tab 1, a κ (eq. 5) has been calculated and the corresponding value of the detected casesT t is used to synchronize the model. The model parameters are then easily found using eq. 3 with τ as tuning parameter. The model results and the available data are normalized to 1000 individuals.
After some trial, good τ values has been found within 4 and 6 days. The next section 4 shows all results for τ = 5.2 while in the subsection 4.1 some results for τ = 4 and τ = 6 are shown. Table 3: Parameters of the model referring to Italy. Each κ is calculated using the detection criteria and reported in tab. 1. The only tuning parameter is the incubation period τ that in this case is assumed to be 5.2 day. The basic reproduction number is calculated as spectral radius of the next generation matrix and in this simplified model (see [1] and eq. 3) is equal to: The graphical results are shown in the following sections.

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Graphic results for Italy
In all graphs the orange point represent the day where the daily differences exceeds the previous maximum daily difference. In that day an exponential parameter κ is calculated (see eq. 5).
The simplified SEIT model parameters have been found using the relations in (3) with the only tuning parameter τ corresponding to an 'average' incubation period. All data are normalized and refers to 1000 individuals. The detected data used to estimate the model are represented with a thick gray line ending with an orange point. The remaining data are represented with a thin grey line in order to be compared with the model forecasting (green line).

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(which was not certified by peer review)
The copyright holder for this preprint this version posted June 23, 2020. . https://doi.org/10.1101/2020.06.22.20137133 doi: medRxiv preprint . CC-BY 4.0 International license It is made available under a is the author/funder, who has granted medRxiv a license to display the preprint in perpetuity.

(which was not certified by peer review)
The copyright holder for this preprint this version posted June 23, 2020. . https://doi.org/10.1101/2020.06.22.20137133 doi: medRxiv preprint . CC-BY 4.0 International license It is made available under a is the author/funder, who has granted medRxiv a license to display the preprint in perpetuity.

(which was not certified by peer review)
The copyright holder for this preprint this version posted June 23, 2020. . https://doi.org/10.1101/2020.06.22.20137133 doi: medRxiv preprint . CC-BY 4.0 International license It is made available under a is the author/funder, who has granted medRxiv a license to display the preprint in perpetuity.

(which was not certified by peer review)
The copyright holder for this preprint this version posted June 23, 2020. . https://doi.org/10.1101/2020.06.22.20137133 doi: medRxiv preprint . CC-BY 4.0 International license It is made available under a is the author/funder, who has granted medRxiv a license to display the preprint in perpetuity.

(which was not certified by peer review)
The copyright holder for this preprint this version posted June 23, 2020. . https://doi.org/10.1101/2020.06.22.20137133 doi: medRxiv preprint . CC-BY 4.0 International license It is made available under a is the author/funder, who has granted medRxiv a license to display the preprint in perpetuity.

(which was not certified by peer review)
The copyright holder for this preprint this version posted June 23, 2020. . https://doi.org/10.1101/2020.06.22.20137133 doi: medRxiv preprint . CC-BY 4.0 International license It is made available under a is the author/funder, who has granted medRxiv a license to display the preprint in perpetuity.

(which was not certified by peer review)
The copyright holder for this preprint this version posted June 23, 2020. . https://doi.org/10.1101/2020.06.22.20137133 doi: medRxiv preprint . CC-BY 4.0 International license It is made available under a is the author/funder, who has granted medRxiv a license to display the preprint in perpetuity.

(which was not certified by peer review)
The copyright holder for this preprint this version posted June 23, 2020. . https://doi.org/10.1101/2020.06.22.20137133 doi: medRxiv preprint . CC-BY 4.0 International license It is made available under a is the author/funder, who has granted medRxiv a license to display the preprint in perpetuity.

Sensibility to the tuning parameter
In order to have a qualitative feedback on the impact of the tuning parameter τ the graphs below represent the model for Italy with the detection κ calculated at t = 13 and t = 19 and three different τ between 4 to 6 days.

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Graphic results for some italian regions
This section contains some results for several regions of Italy referred to two κ detected in the growth phase. The tuning parameter τ is different for each region and is in a range between 4 to 6.5 days.

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(which was not certified by peer review)
The copyright holder for this preprint this version posted June 23, 2020. is the author/funder, who has granted medRxiv a license to display the preprint in perpetuity.

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. CC-BY 4.0 International license It is made available under a is the author/funder, who has granted medRxiv a license to display the preprint in perpetuity.

(which was not certified by peer review)
The copyright holder for this preprint this version posted June 23, 2020. is the author/funder, who has granted medRxiv a license to display the preprint in perpetuity. (which was not certified by peer review) The copyright holder for this preprint this version posted June 23, 2020. . https://doi.org/10.1101/2020.06.22.20137133 doi: medRxiv preprint

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. CC-BY 4.0 International license It is made available under a is the author/funder, who has granted medRxiv a license to display the preprint in perpetuity. (which was not certified by peer review) The copyright holder for this preprint this version posted June 23, 2020. . https://doi.org/10.1101/2020.06.22.20137133 doi: medRxiv preprint

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. CC-BY 4.0 International license It is made available under a is the author/funder, who has granted medRxiv a license to display the preprint in perpetuity. (which was not certified by peer review) The copyright holder for this preprint this version posted June 23, 2020. . https://doi.org/10.1101/2020.06.22.20137133 doi: medRxiv preprint . CC-BY 4.0 International license It is made available under a is the author/funder, who has granted medRxiv a license to display the preprint in perpetuity. (which was not certified by peer review) The copyright holder for this preprint this version posted June 23, 2020. . https://doi.org/10.1101/2020.06.22.20137133 doi: medRxiv preprint