Linear scaling computation of forces for the domain-decomposition linear Poisson-Boltzmann method.

The Linearized Poisson-Boltzmann (LPB) equation is a popular and widely accepted model for accounting solvent effects in computational (bio-) chemistry. In the present article, we derive the analytical forces using the domain-decomposition-based LPB-method with a van-der Waals or solvent-accessible surface. We present an efficient strategy to compute the forces and its implementation, allowing linear scaling of the method with respect to the number of atoms using the fast multipole method.

NCIPLOT4: Fast, Robust, and Quantitative Analysis of Noncovalent Interactions.

The NonCovalent Interaction index (NCI) enables identification of attractive and repulsive noncovalent interactions from promolecular densities in a fast manner. However, the approach remained up to now qualitative, only providing visual information. We present a new version of NCIPLOT, NCIPLOT4, which allows quantifying the properties of the NCI regions (volume, charge) in small and big systems in a fast manner.

Theoretical analysis of screened many-body electrostatic interactions between charged polarizable particles.

This paper builds on two previous studies [Lindgren et al., J. Comput.

Meshing molecular surfaces based on analytical implicit representation.

We develop an algorithm for meshing molecular surfaces that is based on patch-wise meshing using an advancing-front method adapted to the particular case of molecular surfaces. We focus on the solvent accessible surface (SAS) and the solvent excluded surface (SES). The essential ingredient is a newly developed analysis of such surfaces in [18] that allows to describe all SES-singularities a priori and therefore a complete characterization of the SES.