Vermolen FJ

Professor, Computational Mathematics, Department of Mathematics and Statistics, University of - Cited by 3,086 - Applied Mathematics - Porous Media Flow - Metallurgy - Mathematical Biology

Biography

Dr. Vermolen FJ is currently working at Pathology Department. Vermolen FJ is research interests includes Pathology in Luminescence. Vermolen FJ serving as an editorial member and reviewer of several international reputed journals. Vermolen FJ has successfully completed his Administrative responsibilities. Vermolen FJ has authored of many research articles/books related to Medicine.

Title

Cited by

Year

A phenomenological model for cell and nucleus deformation during cancer metastasis

J Chen, D Weihs, M Van Dijk, FJ VermolenBiomechanics and modeling in mechanobiology 17, 1429-1450, 2018201

2018

Computational modeling of therapy on pancreatic cancer in its early stages

J Chen, D Weihs, FJ VermolenBiomechanics and modeling in mechanobiology 19, 427-444, 2020202

2020

Agent-based modelling and parameter sensitivity analysis with a finite-element method for skin contraction

Q Peng, F VermolenBiomechanics and Modeling in Mechanobiology 19, 2525-2551, 2020202

2020

Network-inspired versus Kozeny–Carman based permeability-porosity relations applied to Biot’s poroelasticity model

M Rahrah, LA Lopez-Peña, F Vermolen, B MeulenbroekJournal of Mathematics in Industry (1), 1-21, 2020202

2020

Uncertainty quantification on a spatial Markov-chain model for the progression of skin cancer

F Vermolen, I PölönenJournal of Mathematical Biology 0 (3), 545-573, 2020202

2020

Equilibrium Path Analysis Including Bifurcations with an Arc-Length Method Avoiding A Priori Perturbations

HM Verhelst, M Möller, JHD Besten, FJ Vermolen, ML KaminskiNumerical Mathematics and Advanced Applications ENUMATH 2019: European …, 2020202

2020

A moving finite element framework for fast infiltration in nonlinear poroelastic media

M Rahrah, F VermolenComputational Geosciences 25, 93-804, 2021202

2021

Stability of a one-dimensional morphoelastic model for post-burn contraction

G Egberts, F Vermolen, P van ZuijlenJournal of Mathematical Biology 83 (3), 24, 2021202

2021

A formalism for modelling traction forces and cell shape evolution during cell migration in various biomedical processes

Q Peng, FJ Vermolen, D WeihsBiomechanics and Modeling in Mechanobiology 20 (4), 1459-1475, 2021202

2021

A network model for the biofilm growth in porous media and its effects on permeability and porosity

LA Lopez-Peña, B Meulenbroek, F VermolenComputing and Visualization in Science 21, 11-22, 2019201

2019

A cellular automata model of oncolytic virotherapy in pancreatic cancer

J Chen, D Weihs, FJ VermolenBulletin of Mathematical Biology 82 (8), 103, 2020202

2020

Point forces and their alternatives in cell-based models for skin contraction

Q Peng, F VermolenNumerical Mathematics and Advanced Applications ENUMATH 2019: European …, 2020202

2020

Numerical methods to compute stresses and displacements from cellular forces: Application to the contraction of tissue

Q Peng, FJ VermolenJournal of Computational and Applied Mathematics 0, 113892, 2022202

2022

Sensitivity and feasibility of a one-dimensional morphoelastic model for post-burn contraction

G Egberts, F Vermolen, P van ZuijlenBiomechanics and Modeling in Mechanobiology 20 (6), 217-2167, 2021202

2021

The future of burn care from a complexity science perspective

PPM van Zuijlen, HI Korkmaz, VM Sheraton, TM Haanstra, A Pijpe, ...Journal of Burn Care & Research 4 (6), 112-121, 2022202

2022

Uncertainty quantification in injection and soil characteristics for Biot’s poroelasticity model

M Rahrah, F VermolenNumerical Mathematics and Advanced Applications ENUMATH 2017, 645-652, 2019201

2019

Numerical methods to solve elasticity problems with point sources

Q Peng, F VermolenReports of the Delft Institute of Applied Mathematics, Delft University, the …, 2019201

2019

Guest editorial to the special issue: computational mathematics aspects of flow and mechanics of porous media

V Fred, C Rodrigo, F Gaspar, K KundanComputational Geosciences 25 (2), 601-602, 2021202

2021

Point forces in elasticity equation and their alternatives in multi dimensions

Q Peng, FJ VermolenMathematics and Computers in Simulation 199, 182-201, 2022202

2022

Some mathematical properties of morphoelasticity

G Egberts, D Smits, F Vermolen, P ZuijlenNumerical Mathematics and Advanced Applications ENUMATH 019: European …, 000

2020

Referred From: https://scholar.google.com/citations?user=IZ6-FSsAAAAJ&hl=en

Cited by

Citations	3086
h-index	31
i10-index	75

Vermolen FJ

Biography

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