MATHEMATICAL MODELING OF GLOBAL COVID-19 FATALITIES

Abstract

OBJECTIVE. DETERMINE WAS MATHEMATICALLY MODELED USING THE EXPRESSION N = M⁄(1 + Q × E−K×T), WHICH IS A PREDICTIVE EQUATION. USING THIS MODEL, THE NUMBER OF DEATHS DUE TO COVID-19 WORLDWIDE WAS ESTIMATED.DESIGN. CORRELATIONAL, PROSPECTIVE, PREDICTIVE AND TRANSVERSAL STUDY. PARTICIPANS. THE DATA ON DECEASED INDIVIDUALS DUE TO THE COVID-19 DISEASE UP TO NOVEMBER 5, 2022, WAS CONSIDERED. MAIN MEASUREMENT. THIS DATA WAS USED TO ANALYZE THE PANDEMIC DISPERSION, WHICH WAS DETERMINED TO EXHIBIT LOGISTIC SIGMOIDAL BEHAVIOR. BY DERIVING EQUATION 3, THE RATE OF DEATHS DUE TO COVID-19 WORLDWIDE WAS CALCULATED, OBTAINING THE PREDICTIVE MODEL REPRESENTED IN FIGURE 3.RESULTS. USING EQUATION (5), THE CRITICAL TIME TC = 447 DAYS AND THE MAXIMUM SPEED (FORMULA PRESENTED) MÁX = 1 525 028,553 PERSONS/DAY AND THE DATE WHEN THE GLOBAL DEATH RATE DUE TO COVID-19 REACHED ITS MAXIMUM WAS JULY 6, 2021. THE PEARSON CORRELATION COEFFICIENT BETWEEN THE ELAPSED TIME (T) AND THE NUMBER OF DECEASED INDIVIDUALS (N) WORLDWIDE, BASED ON 33 CASES, WAS R = −0,9365. CONCLUSIONS. THIS INDICATES THAT THE RELATIONSHIP BETWEEN ELAPSED TIME AND THE NUMBER OF DECEASED INDIVIDUALS IS REAL, WITH NO SIGNIFICANT DIFFERENCE, SHOWING THAT THE PREDICTIVE MODEL PROVIDES A HIGH ESTIMATION OF THE CORRELATED DATA.THERE IS A "VERY STRONG CORRELATION" BETWEEN ELAPSED TIME (T) AND THE NUMBER OF DECEASED INDIVIDUALS (N) WITH 87,7 % OF THE VARIANCE IN N EXPLAINED BY T, UE TO THE COVID-19 DISEASE. THESE MODELS HELP US PREDICT THE BEHAVIOR OF DISEASE LIKE COVID-19. © 2024 BY THE AUTHORS; LICENSEE LEARNING GATE.