Energy Landscapes and Non-Archimedean Pseudo- Differential Operators as Tools for Studying the Spreading of Infectious Diseases in a Situation of Extreme Social Isolation
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Authors: V. A. AGUILAR-ARTEAGA, I. S. GUTIERREZ AND A. TORRESBLANCA-BADILLO
DOI: 10.46793/KgJMat2406.827AA
Abstract:
In this article, we introduce a new type of pseudo-differential equations naturally connected with non-archimedean pseudo-differential operators and whose symbols are new classes of negative definite functions in the p-adic context and in arbitrary dimension. These equations are proposed as a mathematical models to study the spreading of infectious diseases (say COVID-19) through a random walk on a complex energy landscape and taking into account social clusters in a situation of extreme social isolation.
Keywords:
Energy landscapes, pseudo-differential operators, negative definite functions, evolution equations, strong Markov processes, p-adic analysis.
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