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Sara Pollock

Orcid: 0000-0001-7896-350X

Affiliations:
  • University of Florida, Gainesville, FL, USA
  • Wright State University, Dayton, OH, United States (former)


According to our database1, Sara Pollock authored at least 27 papers between 2008 and 2024.

Collaborative distances:
  • Dijkstra number2 of five.
  • Erdős number3 of four.

Timeline

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PhD thesis 
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Links

Online presence:

On csauthors.net:

Bibliography

2024
Dynamically accelerating the power iteration with momentum.
[BibTeX]
[DOI]
Christian Austin
,
Sara Pollock
,
Yunrong Zhu
Numer. Linear Algebra Appl., December, 2024

Computational analysis of a contraction rheometer for the grade-two fluid model.
[BibTeX]
[DOI]
Sara Pollock
,
L. Ridgway Scott
CoRR, 2024

Analysis of the Picard-Newton iteration for the Navier-Stokes equations: global stability and quadratic convergence.
[BibTeX]
[DOI]
Sara Pollock
,
Leo G. Rebholz
,
Xuemin Tu
,
Mengying Xiao
CoRR, 2024

Analysis of an Adaptive Safeguarded Newton-Anderson Algorithm with Applications to Fluid Problems.
[BibTeX]
[DOI]
Matt Dallas
,
Sara Pollock
,
Leo G. Rebholz
CoRR, 2024

2023
Filtering for Anderson Acceleration.
[BibTeX]
[DOI]
Sara N. Pollock
,
Leo G. Rebholz
SIAM J. Sci. Comput., August, 2023

Accelerating the Computation of Tensor Z-Eigenvalues.
[BibTeX]
[DOI]
Sara Pollock
,
Rhea Shroff
CoRR, 2023

Numerically stable algorithm for Inverse Kinematics of 6R problem and its applications to macrocycles.
[BibTeX]
[DOI]
Xin Cao
,
Mikhail Ignatov
,
George Jones
,
Sara N. Pollock
,
Evangelos A. Coutsias
,
Dima Kozakov
Proceedings of the 14th ACM International Conference on Bioinformatics, 2023

2022
A simple extrapolation method for clustered eigenvalues.
[BibTeX]
[DOI]
Nilima Nigam
,
Sara N. Pollock
Numer. Algorithms, 2022

Newton-Anderson at Singular Points.
[BibTeX]
[DOI]
Matt Dallas
,
Sara Pollock
CoRR, 2022

2021
Acceleration of nonlinear solvers for natural convection problems.
[BibTeX]
[DOI]
Sara N. Pollock
,
Leo G. Rebholz
,
Mengying Xiao
J. Num. Math., 2021

An efficient nonlinear solver and convergence analysis for a viscoplastic flow model.
[BibTeX]
[DOI]
Sara N. Pollock
,
Leo G. Rebholz
,
Duygu Vargun
CoRR, 2021

Extrapolating the Arnoldi Algorithm To Improve Eigenvector Convergence.
[BibTeX]
[DOI]
Sara Pollock
,
L. Ridgway Scott
CoRR, 2021

2020
A Proof That Anderson Acceleration Improves the Convergence Rate in Linearly Converging Fixed-Point Methods (But Not in Those Converging Quadratically).
[BibTeX]
[DOI]
Claire Evans
,
Sara N. Pollock
,
Leo G. Rebholz
,
Mengying Xiao
SIAM J. Numer. Anal., 2020

A matrix analysis approach to discrete comparison principles for nonmonotone PDE.
[BibTeX]
[DOI]
Sara N. Pollock
,
Yunrong Zhu
Numer. Algorithms, 2020

2019
Anderson-Accelerated Convergence of Picard Iterations for Incompressible Navier-Stokes Equations.
[BibTeX]
[DOI]
Sara N. Pollock
,
Leo G. Rebholz
,
Mengying Xiao
SIAM J. Numer. Anal., 2019

Online basis construction for goal-oriented adaptivity in the generalized multiscale finite element method.
[BibTeX]
[DOI]
Eric T. Chung
,
Sara N. Pollock
,
Sai-Mang Pun
J. Comput. Phys., 2019

Fast convergence to higher multiplicity zeros.
[BibTeX]
[DOI]
Sara Pollock
CoRR, 2019

Benchmarking results for the Newton-Anderson method.
[BibTeX]
[DOI]
Sara Pollock
,
Hunter Schwartz
CoRR, 2019

Anderson acceleration for contractive and noncontractive operators.
[BibTeX]
[DOI]
Sara N. Pollock
,
Leo G. Rebholz
CoRR, 2019

2018
Uniqueness of discrete solutions of nonmonotone PDEs without a globally fine mesh condition.
[BibTeX]
[DOI]
Sara N. Pollock
,
Yunrong Zhu
Numerische Mathematik, 2018

2016
An Improved Method for Solving Quasi-linear Convection Diffusion Problems on a Coarse Mesh.
[BibTeX]
[DOI]
Sara N. Pollock
SIAM J. Sci. Comput., 2016

Stabilized and inexact adaptive methods for capturing internal layers in quasilinear PDE.
[BibTeX]
[DOI]
Sara N. Pollock
J. Comput. Appl. Math., 2016

Goal-oriented adaptivity for GMsFEM.
[BibTeX]
[DOI]
Eric T. Chung
,
Wing Tat Leung
,
Sara N. Pollock
J. Comput. Appl. Math., 2016

2015
Convergence of goal-oriented adaptive finite element methods for semilinear problems.
[BibTeX]
[DOI]
Michael J. Holst
,
Sara N. Pollock
,
Yunrong Zhu
Comput. Vis. Sci., 2015

2012
Convergence of goal-oriented adaptive finite element methods
[BibTeX]
[DOI]
Sara Pollock
PhD thesis, 2012

2008
Scaffold Topologies. 2. Analysis of Chemical Databases.
[BibTeX]
[DOI]
Michael J. Wester
,
Sara N. Pollock
,
Evangelos A. Coutsias
,
Tharun Kumar Allu
,
Sorel Muresan
,
Tudor I. Oprea
J. Chem. Inf. Model., 2008

Scaffold Topologies. 1. Exhaustive Enumeration up to Eight Rings.
[BibTeX]
[DOI]
Sara N. Pollock
,
Evangelos A. Coutsias
,
Michael J. Wester
,
Tudor I. Oprea
J. Chem. Inf. Model., 2008


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