Approximation of Potential Energy Surfaces with Spherical Harmonics

11/08/2019

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In this note we detail a framework to systematically derive polynomial basis functions for approximating isometry and permutation invariant functions, particularly with an eye to modelling potential energy surfaces. Our presentation builds and expands on (Drautz, Phys. Rev. B 99, 2019). We clarify how to modify this construction to guarantee that the basis becomes complete, and moreover show how to obtain an orthogonal basis.

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Approximation of Potential Energy Surfaces with Spherical Harmonics

Spherical Basis Functions in Hardy Spaces with Localization Constraints

Bezier developable surfaces

Orthogonal polynomials in and on a quadratic surface of revolution

The loss of the property of locality of the kernel in high-dimensional Gaussian process regression on the example of the fitting of molecular potential energy surfaces

Digital quantum simulation of Schrödinger dynamics using adaptive approximations of potential functions

A gyroscopic polynomial basis in the sphere

A wide diversity of 3D surfaces Generator using a new implicit function

Approximation of Potential Energy Surfaces with Spherical Harmonics

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Spherical Basis Functions in Hardy Spaces with Localization Constraints

Bezier developable surfaces

Orthogonal polynomials in and on a quadratic surface of revolution

The loss of the property of locality of the kernel in high-dimensional Gaussian process regression on the example of the fitting of molecular potential energy surfaces

Digital quantum simulation of Schrödinger dynamics using adaptive approximations of potential functions

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