| Optimal reduction of numerical dispersion for wave propagation problems. Part 2: Application to 2-D isogeometric elements A Idesman, B Dey Computer Methods in Applied Mechanics and Engineering 321, 235-268, 2017 | 32 | 2017 |
| The use of the local truncation error for the increase in accuracy of the linear finite elements for heat transfer problems A Idesman, B Dey Computer Methods in Applied Mechanics and Engineering 319, 52-82, 2017 | 24 | 2017 |
| New 25-point stencils with optimal accuracy for 2-D heat transfer problems. Comparison with the quadratic isogeometric elements A Idesman, B Dey Journal of Computational Physics 418, 109640, 2020 | 20* | 2020 |
| Compact high-order stencils with optimal accuracy for numerical solutions of 2-D time-independent elasticity equations A Idesman, B Dey Computer Methods in Applied Mechanics and Engineering 360, 112699, 2020 | 19 | 2020 |
| A new 3-D numerical approach to the solution of PDEs with optimal accuracy on irregular domains and Cartesian meshes A Idesman, B Dey Computer Methods in Applied Mechanics and Engineering 354, 568-592, 2019 | 19 | 2019 |
| A new numerical approach to the solution of PDEs with optimal accuracy on irregular domains and Cartesian meshes—part 2: numerical simulations and comparison with FEM B Dey, A Idesman Archive of Applied Mechanics 90 (12), 2649-2674, 2020 | 18* | 2020 |
| The treatment of the Neumann boundary conditions for a new numerical approach to the solution of PDEs with optimal accuracy on irregular domains and Cartesian meshes A Idesman, B Dey Computer Methods in Applied Mechanics and Engineering 365, 112985, 2020 | 18 | 2020 |
| Accurate numerical solutions of 2-D elastodynamics problems using compact high-order stencils A Idesman, B Dey Computers & Structures 229, 106160, 2020 | 16 | 2020 |
| A new numerical approach to the solution of the 2-D Helmholtz equation with optimal accuracy on irregular domains and Cartesian meshes A Idesman, B Dey Computational Mechanics 65, 1189-1204, 2020 | 14 | 2020 |
| Optimal local truncation error method for solution of wave and heat equations for heterogeneous materials with irregular interfaces and unfitted Cartesian meshes A Idesman, B Dey Computer Methods in Applied Mechanics and Engineering 384, 113998, 2021 | 9 | 2021 |
| A high-order numerical approach with Cartesian meshes for modeling of wave propagation and heat transfer on irregular domains with inhomogeneous materials A Idesman, B Dey Computer Methods in Applied Mechanics and Engineering 370, 113249, 2020 | 5 | 2020 |
| The numerical solution of the 3D Helmholtz equation with optimal accuracy on irregular domains and unfitted Cartesian meshes A Idesman, B Dey Engineering with Computers, 1-23, 2022 | 4 | 2022 |
| 3rd and 11th orders of accuracy of ‘linear’and ‘quadratic’elements for Poisson equation with irregular interfaces on Cartesian meshes A Idesman, B Dey International Journal of Numerical Methods for Heat & Fluid Flow 32 (8 …, 2022 | 3 | 2022 |
| Optimal local truncation error method to solution of 2‐D time‐independent elasticity problems with optimal accuracy on irregular domains and unfitted Cartesian meshes A Idesman, B Dey International Journal for Numerical Methods in Engineering 123 (11), 2610-2630, 2022 | 3 | 2022 |
| A level set approach for the computational study of a yield stress fluid filling a thin mold B Dey, W Ortiz, H Cleaves, A McMaster, J McConnell, K Tjiptowidjojo, ... Journal of Non-Newtonian Fluid Mechanics 312, 104987, 2023 | 2 | 2023 |
| Optimal local truncation error method for solution of elasticity problems for heterogeneous materials with irregular interfaces and unfitted Cartesian meshes A Idesman, B Dey, M Mobin Mechanics of Advanced Materials and Structures 30 (2), 356-372, 2023 | 2 | 2023 |
| The 10-th order of accuracy of ‘quadratic’elements for elastic heterogeneous materials with smooth interfaces and unfitted Cartesian meshes A Idesman, B Dey, M Mobin Engineering with Computers 38 (5), 4605-4629, 2022 | 2 | 2022 |
| Optimal local truncation error method for 2‐D elastodynamics problems on irregular domains and unfitted Cartesian meshes A Idesman, B Dey International Journal for Numerical and Analytical Methods in Geomechanics …, 2022 | 1 | 2022 |
| Stress Birth and Death: Disruptive Computational Mechanics and Novel Diagnostics for Fluid-to-Solid Transitions R Rao, J McConnell, A Grillet, A McMaster, R Bhakta, H Cleaves, ... Sandia National Lab.(SNL-NM), Albuquerque, NM (United States), 2022 | | 2022 |
| Computational modeling of yield stress fluid flow in a thin mold using the level set method B Dey | | 2021 |
IdesmanProfessor of Mechanical Engineering, Texas Tech UniversityVerified email at ttu.edu
