Three-Dimensional Modeling and Inversion of Gravity Data Based on Topography: Urals Case Study

Abstract: In this paper, the derivation of a concise closed form for the gravitational field of a polyhedron is presented. This formula forms the basis of the algorithm for calculating the gravitational field of an arbitrary shape body with high accuracy. Based on this algorithm, a method for gravity data inversion (creating density models of the Earth’s crust) has been developed. The algorithm can accept either regular or irregular polyhedron discretization for density model creation. The models are approximated with d… Show more

“…Another real-life application occurs in the parameter identification problem when mathematical models used in biology, physics, economics, etc., are often defined by a Partial Differential Equation (PDE) (see Example 1) [3,4]. It is known that in general the solution of such a PDE need not be an elementary function.…”

Parameter Choice Strategy That Computes Regularization Parameter before Computing the Regularized Solution

“…Another real-life application occurs in the parameter identification problem when mathematical models used in biology, physics, economics, etc., are often defined by a Partial Differential Equation (PDE) (see Example 1) [3,4]. It is known that in general the solution of such a PDE need not be an elementary function.…”

Parameter Choice Strategy That Computes Regularization Parameter before Computing the Regularized Solution