We derive a Ewald decomposition for the Stokeslet in planar periodicity and a novel PME-type O(N logN) method for the fast evaluation of the resulting sums. The decom-position is the natural 2P counterpart to the classical 3P decomposition by Hasimoto, and is given in an explicit form not found in the literature. Truncation error estimates are provided to aid in selecting parameters. The fast, PME-type, method appears to be the first fast method for computing Stokeslet Ewald sums in planar periodicity, and has three attractive properties: it is spectrally accurate; it uses the minimal amount of memory that a gridded Ewald method can use; and provides clarity regarding numerical errors and how to choose parameters. Analytical and numerical r...
Numerical solution strategies for the Stokes eigenvalue problem based on the use of penalty formulat...
New analytical representations of the Stokes flows due to periodic arrays of point singularities in ...
Applications in electrostatics, magnetostatics, fluid mechanics, and elasticity often involve source...
A new method for Ewald summation in planar/slablike geometry, i.e. systems where periodicity applies...
A fast and spectrally accurate Ewald summation method for the evaluation of stokeslet, stresslet and...
This work contains two separate but related parts: one on spectrally accurate and fast Ewald meth...
A unified treatment for the fast and spectrally accurate evaluation of electrostatic potentials with...
Ewald summation is an efficient method for computing the periodic sums that appear when considering ...
This thesis deals with fast and efficient methods for electrostatic calculations with application in...
We present three new families of fast algorithms for classical potential theory, based on Ewald summ...
In a number of problems in computational physics, a finite sum of kernel functions centered at N par...
We present a numerical method for suspensions of spheroids of arbitrary aspect ratio, which sediment...
In this thesis, we present a fast multipole algorithm (FMA) for solving a periodic scattering proble...
Accurate and efficient computation of periodic free-space Green's functions using the Ewald method i...
The penalty method when applied to the Stokes problem provides a very efficient algorithm for solvin...
Numerical solution strategies for the Stokes eigenvalue problem based on the use of penalty formulat...
New analytical representations of the Stokes flows due to periodic arrays of point singularities in ...
Applications in electrostatics, magnetostatics, fluid mechanics, and elasticity often involve source...
A new method for Ewald summation in planar/slablike geometry, i.e. systems where periodicity applies...
A fast and spectrally accurate Ewald summation method for the evaluation of stokeslet, stresslet and...
This work contains two separate but related parts: one on spectrally accurate and fast Ewald meth...
A unified treatment for the fast and spectrally accurate evaluation of electrostatic potentials with...
Ewald summation is an efficient method for computing the periodic sums that appear when considering ...
This thesis deals with fast and efficient methods for electrostatic calculations with application in...
We present three new families of fast algorithms for classical potential theory, based on Ewald summ...
In a number of problems in computational physics, a finite sum of kernel functions centered at N par...
We present a numerical method for suspensions of spheroids of arbitrary aspect ratio, which sediment...
In this thesis, we present a fast multipole algorithm (FMA) for solving a periodic scattering proble...
Accurate and efficient computation of periodic free-space Green's functions using the Ewald method i...
The penalty method when applied to the Stokes problem provides a very efficient algorithm for solvin...
Numerical solution strategies for the Stokes eigenvalue problem based on the use of penalty formulat...
New analytical representations of the Stokes flows due to periodic arrays of point singularities in ...
Applications in electrostatics, magnetostatics, fluid mechanics, and elasticity often involve source...