Jon Trevelyan

Durham University

H-index: 29

Europe-United Kingdom

About Jon Trevelyan

Jon Trevelyan, With an exceptional h-index of 29 and a recent h-index of 21 (since 2020), a distinguished researcher at Durham University, specializes in the field of Boundary element method, computational mechanics, waves, fracture mechanics.

His recent articles reflect a diverse array of research interests and contributions to the field:

An extended isogeometric boundary element formulation for three-dimensional linear elastic fracture mechanics

3D isogeometric indirect BEM solution based on virtual surface sources on the boundaries of Helmholtz acoustic problems

The solution of the wave-diffusion equation by a caputo derivative-based finite element method formulation

An isogeometric boundary element formulation for stress concentration problems in couple stress elasticity

eXtended Boundary Element Method (XBEM) for Fracture Mechanics and Wave Problems

Direct evaluation of stress intensity factors and T-stress for bimaterial interface cracks using the extended isogeometric boundary element method

Analysis of 2D contact problems under cyclic loads using IGABEM with Bézier decomposition

Frequency domain Bernstein-Bézier finite element solver for modelling short waves in elastodynamics

Jon Trevelyan Information

University	Durham University
Position	Professor of Engineering
Citations(all)	3385
Citations(since 2020)	1519
Cited By	2577
hIndex(all)	29
hIndex(since 2020)	21
i10Index(all)	72
i10Index(since 2020)	44
Email	Access Email
University Profile Page	Durham University
Google Scholar	View Google Scholar Profile

Jon Trevelyan Skills & Research Interests

Boundary element method

computational mechanics

waves

fracture mechanics

Top articles of Jon Trevelyan

Title	Journal	Author(s)	Publication Date
An extended isogeometric boundary element formulation for three-dimensional linear elastic fracture mechanics	Computer Methods in Applied Mechanics and Engineering	Matheus Rocha Jon Trevelyan Edson Denner Leonel	2024/4/1
3D isogeometric indirect BEM solution based on virtual surface sources on the boundaries of Helmholtz acoustic problems	Engineering with Computers	Ahmed Mostafa Shaaban Jon Trevelyan Timon Rabczuk	2024/2/6
The solution of the wave-diffusion equation by a caputo derivative-based finite element method formulation	Journal of the Brazilian Society of Mechanical Sciences and Engineering	RM Corrêa JAM Carrer BS Solheid J Trevelyan M Arndt ...	2023/5
An isogeometric boundary element formulation for stress concentration problems in couple stress elasticity	Computer Methods in Applied Mechanics and Engineering	Gabriel Hattori Jon Trevelyan PA Gourgiotis	2023/3/15
eXtended Boundary Element Method (XBEM) for Fracture Mechanics and Wave Problems	Partition of Unity Methods	Jon Trevelyan	2023/10/19
Direct evaluation of stress intensity factors and T-stress for bimaterial interface cracks using the extended isogeometric boundary element method	Theoretical and Applied Fracture Mechanics	HC Andrade J Trevelyan ED Leonel	2023/10/1
Analysis of 2D contact problems under cyclic loads using IGABEM with Bézier decomposition	Engineering Analysis with Boundary Elements	Fernando Morais de Loyola Thiago Doca Lucas Silveira Campos Jon Trevelyan Eder Lima de Albuquerque	2022/6/1
Frequency domain Bernstein-Bézier finite element solver for modelling short waves in elastodynamics	Applied Mathematical Modelling	N Benatia A El Kacimi O Laghrouche M El Alaoui Talibi J Trevelyan	2022/2/1
A NURBS-discontinuous and enriched isogeometric boundary element formulation for two-dimensional fatigue crack growth	Engineering Analysis with Boundary Elements	HC Andrade J Trevelyan Edson Denner Leonel	2022/1/1
A boundary element method formulation based on the Caputo derivative for the solution of the diffusion-wave equation	Engineering with Computers	JAM Carrer BS Solheid Jon Trevelyan Mohammed Seaïd	2022/10/1
An isogeometric boundary element method for heat transfer problems of multiscale structures in electronic packaging with arbitrary heat sources	Applied Mathematical Modelling	Yanpeng Gong Fei Qin Chunying Dong Jon Trevelyan	2022/9/1
The solution of the anomalous diffusion equation by a finite element method formulation based on the Caputo derivative	Journal of the Brazilian Society of Mechanical Sciences and Engineering	RM Corrêa JAM Carrer BS Solheid J Trevelyan	2022/6
A well simulator for homogeneous reservoirs based on formulations of the isogeometric boundary element method		Lúcio G Nascimento Gustavo SV Gontijo Éder L Albuquerque Lucas S Campos Jon Trevelyan ...	2021/4
A comparison of high-order and plane wave enriched boundary element basis functions for Helmholtz problems	Engineering Analysis with Boundary Elements	B Gilvey J Trevelyan	2021/1/1
Hybrid nearly singular integration for three-dimensional isogeometric boundary element analysis of coatings and other thin structures	Computer Methods in Applied Mechanics and Engineering	Yanpeng Gong Chunying Dong Fei Qin Gabriel Hattori Jon Trevelyan	2020/8/1
The Boundary Element Method applied to the solution of the diffusion-wave problem	Engineering Analysis with Boundary Elements	JAM Carrer BS Solheid J Trevelyan M Seaid	2020/8/1
Singular enrichment functions for Helmholtz scattering at corner locations using the boundary element method	International Journal for Numerical Methods in Engineering	B Gilvey J Trevelyan G Hattori	2020/2/15
Quadrature methods for highly oscillatory singular integrals	Journal of Computational Mathematics.	Jing Gao Marissa Condon Arieh Iserles BD Gilvey Jon Trevelyan	2020/11/30