Isaac Harari, Publications

• Book
• Articles
  • Accepted
  • Submitted
• Chapters in Books
• Editing
• Reports

Book

• I. Harari, G.M. Hulbert, R.M. Ferencz, and T.J.R. Hughes, Solutions Manual for The Finite Element Method: Linear Static and Dynamic Finite Element Analysis by Thomas J.R. Hughes. Prentice-Hall, Englewood Cliffs, New Jersey, 1990.

Articles

1. J.R. O'Leary and I. Harari, “Finite element analysis of stiffened plates,” Computers & Structures, 21(5), 973–985 (1985).
   [ ZMATH ABSTRACT ]
2. L.P. Franca, I. Harari, T.J.R. Hughes, M. Mallet, F. Shakib, T.E. Spelce, F. Chalot, and T.E. Tezduyar, ``A Petrov-Galerkin finite element method for the compressible Euler and Navier-Stokes equations,'' pp. 19-43 in Numerical Methods for Compressible Flows - Finite Difference, Element and Volume Techniques, AMD-Vol. 78 (eds. T.E. Tezduyar and T.J.R. Hughes). ASME, New York, 1986.
3. I. Harari and T.J.R. Hughes, ``Design and analysis of finite element methods for the Helmholtz equation in exterior domains,'' Applied Mechanics Reviews, 43(5), 2, 366-373, ASME (1990).
4. I. Harari and T.J.R. Hughes, ``Finite element methods for the Helmholtz equation in an exterior domain: Model problems,'' Computer Methods in Applied Mechanics and Engineering, 87(1), 59-96 (1991).
   [ ADS ABSTRACT | MathSciNet REVIEW | ZMATH ABSTRACT ]
5. I. Harari and T.J.R. Hughes, ``Analysis of continuous formulations underlying the computation of time-harmonic acoustics in exterior domains,'' Computer Methods in Applied Mechanics and Engineering, 97(1), 103-124 (1992).
   [ MathSciNet ABSTRACT | ZMATH REVIEW ]
6. I. Harari and T.J.R. Hughes, ``A cost comparison of boundary element and finite element methods for problems of time-harmonic acoustics,'' Computer Methods in Applied Mechanics and Engineering, 97(1), 77-102 (1992).
   [ MathSciNet ABSTRACT ]
7. I. Harari and T.J.R. Hughes, ``What are C and h?: inequalities for the analysis and design of finite element methods,'' Computer Methods in Applied Mechanics and Engineering, 97(2), 157-192 (1992).
   [ MathSciNet REVIEW | ZMATH ABSTRACT | ScienceDirect ABSTRACT ]
8. I. Harari and T.J.R. Hughes, ``Galerkin/least-squares finite element methods for the reduced wave equation with non-reflecting boundary conditions in unbounded domains,'' Computer Methods in Applied Mechanics and Engineering, 98(3), 411-454 (1992).
   [ MathSciNet ABSTRACT | ZMATH ABSTRACT ]
9. I. Harari and T.J.R. Hughes, ``Stabilized finite element methods for steady advection-diffusion with production,'' Computer Methods in Applied Mechanics and Engineering, 115(1-2), 165-191 (1994).
   [ MathSciNet ABSTRACT ]
10. I. Harari and T.J.R. Hughes, ``Studies of domain-based formulations for computing exterior problems of acoustics,'' International Journal for Numerical Methods in Engineering, 37(17), 2935-2950 (1994).
    [ MathSciNet ABSTRACT | Journal ABSTRACT ]
11. I. Harari and E. Turkel, ``Accurate finite difference methods for time-harmonic wave propagation,'' Journal of Computational Physics, 119(2), 252-270 (1995).
    [ MathSciNet ABSTRACT | ZMATH REVIEW | ScienceDirect ABSTRACT ]
12. T.J.R. Hughes, A. Masud, and I. Harari, ``Numerical assessment of some membrane elements with drilling degrees of freedom,'' Computers & Structures, 55(2), 297-314 (1995).
    [ MathSciNet ABSTRACT ]
13. I. Harari and G. Blejer, ``Finite element methods for the interaction of acoustic fluids with elastic solids,'' pp. 39-48 in Acoustics of Submerged Structures, DE-Vol. 84-2 (eds. R.P. Daddazio, M.M. Ettouney and N.N. Abboud). ASME, New York, 1995.
14. T.J.R. Hughes, A. Masud, and I. Harari, ``Dynamic analysis and drilling degrees of freedom,'' International Journal for Numerical Methods in Engineering, 38(19), 3193-3210 (1995).
    [ MathSciNet ABSTRACT | ZMATH ABSTRACT | Journal ABSTRACT ]
15. I. Harari, K. Grosh, T.J.R. Hughes, M. Malhotra, P.M. Pinsky, J.R. Stewart, and L.L. Thompson, ``Recent developments in finite element methods for structural acoustics,'' Archives of Computational Methods in Engineering, 3(2-3), 131-309 (1996).
    [ ABSTRACT | MathSciNet REVIEW | Journal ABSTRACT ]
16. I. Harari, ``Accurate finite difference representation of Neumann boundary data for time-harmonic wave propagation,'' Journal of Computational Acoustics, 4(4), 425-432 (1996).
    [ Journal ABSTRACT ]
17. I. Harari, ``Reducing spurious dispersion, anisotropy and reflection in finite element analysis of time-harmonic acoustics,'' Computer Methods in Applied Mechanics and Engineering, 140(1-2), 39-58 (1997).
    [ MathSciNet ABSTRACT | ScienceDirect ABSTRACT ]
18. I. Harari and D. Avraham, ``High-order finite element methods for acoustic problems,'' Journal of Computational Acoustics, 5(1), 33-51 (1997).
    [ Journal ABSTRACT ]
19. I. Harari, P.E. Barbone, and J.M. Montgomery, ``Finite element formulations for exterior problems: Application to hybrid methods, non-reflecting boundary conditions and infinite elements,'' International Journal for Numerical Methods in Engineering, 40(15), 2791-2805 (1997).
    [ ABSTRACT | Journal ABSTRACT ]
20. I. Harari, P.E. Barbone, M. Slavutin, and R. Shalom, ``Boundary infinite elements for the Helmholtz equation in exterior domains,'' International Journal for Numerical Methods in Engineering, 41(6), 1105-1131 (1998).
    [ ABSTRACT | Journal ABSTRACT | ZMATH ABSTRACT ]
21. I. Harari, I. Patlashenko, and D. Givoli, ``Dirichlet-to-Neumann maps for unbounded wave guides,'' Journal of Computational Physics, 143(1), 200-223 (1998).
    [ ABSTRACT | ZMATH REVIEW | ScienceDirect ABSTRACT ]
22. I. Harari, ``A unified variational approach to domain-based computation of exterior problems of time-harmonic acoustics,'' Applied Numerical Mathematics, 27(4), 417-441 (1998).
    [ ABSTRACT | ScienceDirect ABSTRACT ]
23. I. Harari and Z. Shohet, ``On non-reflecting boundary conditions in unbounded elastic solids,'' Computer Methods in Applied Mechanics and Engineering, 163(1-4), 123-139 (1998). Erratum: Ibid. 169(1-2), 191-192 (1999).
    [ ABSTRACT | ScienceDirect ABSTRACT | ScienceDirect ERRATUM ]
24. I. Harari, R. Shalom, and P.E. Barbone, ``Higher-order boundary infinite elements,'' Computer Methods in Applied Mechanics and Engineering, 164(1-2), 107-119 (1998).
    [ ABSTRACT | ScienceDirect ABSTRACT ]
25. P.E. Barbone, J.M. Montgomery, O.M. Michael, and I. Harari, ``Scattering by a hybrid asymptotic/finite element method,'' Computer Methods in Applied Mechanics and Engineering, 164(1-2), 141-156 (1998).
    [ ScienceDirect ABSTRACT ]
26. I. Harari and S. Haham, ``Improved finite element methods for elastic waves,'' Computer Methods in Applied Mechanics and Engineering, 166(1-2), 143-164 (1998).
    [ ABSTRACT | ScienceDirect ABSTRACT ]
27. I. Harari, P. Barai, and P.E. Barbone, ``Numerical and spectral investigations of Trefftz infinite elements,'' International Journal for Numerical Methods in Engineering, 46(4), 553-577 (1999).
    [ ABSTRACT | Journal ABSTRACT ]
28. I. Harari, M. Slavutin, and E. Turkel, ``Analytical and numerical studies of a finite element PML for the Helmholtz equation," Journal of Computational Acoustics 8(1), 121-137 (2000).
    [ ABSTRACT | Journal ABSTRACT ]
29. I. Harari, ``Finite element dispersion of cylindrical and spherical acoustic waves,'' Computer Methods in Applied Mechanics and Engineering, 190(20-21), 2533-2542 (2001).
    [ ABSTRACT | ScienceDirect ABSTRACT ]
30. I. Harari, P. Barai, P.E. Barbone, and M. Slavutin, ``Three-dimensional infinite elements based on a Trefftz formulation,'' Journal of Computational Acoustics, 9(2), 381-394 (2001).
    [ ABSTRACT | Journal ABSTRACT ]
31. I. Harari, L.P. Franca, and S.P. Oliveira, ``Streamline design of stability parameters for advection-diffusion problems,'' Journal of Computational Physics 171(1), 115-131 (2001).
    [ ABSTRACT | ScienceDirect ABSTRACT ]
32. P.E. Barbone and I. Harari, ``Nearly H¹-optimal finite element methods," Computer Methods in Applied Mechanics and Engineering 190(43-44), 5679-5690 (2001).
    [ ABSTRACT | MathSciNet ABSTRACT | ScienceDirect ABSTRACT ]
33. C. Farhat, I. Harari, and L.P. Franca, ``The discontinuous enrichment method,'' Computer Methods in Applied Mechanics and Engineering 190(48), 6455-6479 (2001).
    [ ABSTRACT | ScienceDirect ABSTRACT ]
34. I. Harari, S. Frey, and L.P. Franca, ``A note on a recent study of stabilized finite element computations for heat conduction," Computational Mechanics 28(1), 63-65 (2002).
    [ ABSTRACT | Journal ABSTRACT ]
35. I. Harari and C.L. Nogueira, ``Reducing dispersion of linear triangular elements for the Helmholtz equation,'' Journal of Engineering Mechanics 128(3), 351-358 (2002).
    [ ABSTRACT | Journal ABSTRACT ]
36. C. Farhat, I. Harari, and U. Hetmaniuk, ``A discontinuous Galerkin method with Lagrange multipliers for the solution of Helmholtz problems in the mid-frequency regime," Computer Methods in Applied Mechanics and Engineering 192(11-12), 1389-1419 (2003).
    [ ABSTRACT | ScienceDirect ABSTRACT ]
37. A. Nesliturk and I. Harari, ``The nearly-optimal Petrov-Galerkin method for convection-diffusion problems,'' Computer Methods in Applied Mechanics and Engineering 192(22-24), 2501-2519 (2003).
    [ ABSTRACT | ScienceDirect ABSTRACT ]
38. C. Farhat, I. Harari, and U. Hetmaniuk, “The discontinuous enrichment method for multiscale analysis,” Computer Methods in Applied Mechanics and Engineering 192(28-30), 3195-3209 (2003).
    [ ABSTRACT | ScienceDirect ABSTRACT ]
39. I. Harari, C. Farhat, and U. Hetmaniuk, ``Multiple-stencil dispersion analysis of the Lagrange multipliers in a discontinuous Galerkin method for the Helmholtz equation," Journal of Computational Acoustics 11(2), 239-254 (2003).
    [ ABSTRACT | Journal ABSTRACT ]
40. I. Harari and F. Magoulès, ``Numerical investigations of stabilized finite element computations for acoustics," Wave Motion 39(4), 339-349 (2004).
    [ ABSTRACT | ScienceDirect ABSTRACT ]
41. I. Harari, “Stability of semidiscrete formulations for parabolic problems at small time steps,” Computer Methods in Applied Mechanics and Engineering 193(15-16), 1491–1516 (2004).
    [ ABSTRACT | ScienceDirect ABSTRACT ]
42. I. Harari and R. Djellouli, “Analytical study of the effect of wave number on the performance of local absorbing boundary conditions for acoustic scattering,” Applied Numerical Mathematics 50(1), 15–47 (2004).
    [ ABSTRACT | ScienceDirect ABSTRACT ]
43. S. Krylov, I. Harari, and Y. Cohen, “Stabilization of electrostatically actuated microstructures using parametric excitation,” Journal of Micromechanics and Microengineering 15(6), 1188–1204 (2005).
    [ ABSTRACT | IoP ABSTRACT ]
44. I. Harari, “A survey of finite element methods for time-harmonic acoustics,” Computer Methods in Applied Mechanics and Engineering 195(13-16), 1594–1607 (2006).
    [ ABSTRACT | ScienceDirect ABSTRACT ]
45. I. Harari, R. Tezaur, and C. Farhat, “A study of higher-order discontinuous Galerkin and quadratic least-squares stabilized finite element computations for acoustics,” Journal of Computational Acoustics 14(1), 1–19 (2006).
    [ ABSTRACT | Journal ABSTRACT ]
46. R.C. Reiner, Jr., R. Djellouli, and I. Harari, “The performance of local absorbing boundary conditions for acoustic scattering from elliptical shapes,” Computer Methods in Applied Mechanics and Engineering 195(29-32), 3622–3665 (2006).
    [ ABSTRACT | ScienceDirect ABSTRACT ]
47. I. Harari and U. Albocher, “Studies of FE/PML for exterior problems of time-harmonic elastic waves,” Computer Methods in Applied Mechanics and Engineering 195(29-32), 3854–3879 (2006).
    [ ABSTRACT | ScienceDirect ABSTRACT ]
48. S. Krylov, I. Harari, and D. Gadasi, “Consistent loading in structural reduction procedures for beam models,” International Journal for Multiscale Computational Engineering 4(5-6), 559–584 (2006).
    [ ABSTRACT | Journal ABSTRACT ]
49. H.M. Mourad, J. Dolbow, and I. Harari, “A bubble-stabilized finite element method for Dirichlet constraints on embedded interfaces,” International Journal for Numerical Methods in Engineering 69(4), 772–793 (2007).
    [ ABSTRACT | Journal ABSTRACT ]
50. E. Grosu and I. Harari, “Stability of semidiscrete formulations for elastodynamics at small time steps,” Finite Elements in Analysis and Design 43(6-7), 533–542 (2007).
    [ ABSTRACT | ScienceDirect ABSTRACT ]
51. R.C. Reiner, Jr., R. Djellouli, and I. Harari, “Analytical and numerical investigation of the performance of the BGT2 condition for low frequency acoustic scattering problems,” Journal of Computational and Applied Mathematics 204(2), 526–536 (2007).
    [ ABSTRACT | Journal ABSTRACT ]
52. I. Harari and K. Gosteev, “Bubble-based stabilization for the Helmholtz equation,” International Journal for Numerical Methods in Engineering 70(10), 1241–1260 (2007).
    [ ABSTRACT | Journal ABSTRACT ]
53. I. Harari and G. Hauke, “Semidiscrete formulations for transient transport at small time steps,” International Journal for Numerical Methods in Fluids 54(6-8), 731–743 (2007).
    [ ABSTRACT | Journal ABSTRACT ]
54. A.A. Oberai, P.E. Barbone, and I. Harari, “The adjoint weighted equation for steady advection in a compressible fluid,” International Journal for Numerical Methods in Fluids 54(6-8), 683–693 (2007).
    [ ABSTRACT | Journal ABSTRACT ]
55. P.E. Barbone, A.A. Oberai, and I. Harari, “Adjoint weighted variational formulation for direct computational solution of an inverse heat conduction problem,” Inverse Problems 23(6), 2325–2342 (2007).
    [ ABSTRACT | IOP ABSTRACT ]
56. E. Grosu and I. Harari, “Studies of the discontinuous enrichment method for two-dimensional acoustics,” Finite Elements in Analysis and Design 44(5), 272–287 (2008).
    [ ABSTRACT | ScienceDirect ABSTRACT ]
57. I. Harari, “Multiscale finite elements for acoustics: continuous, discontinuous, and stabilized methods,” International Journal for Multiscale Computational Engineering 6(6), 511–531 (2008).
    [ ABSTRACT | Journal ABSTRACT ]
58. J. Dolbow and I. Harari, “An efficient finite element method for embedded interface problems,” International Journal for Numerical Methods in Engineering 78(2), 229–252 (2009).
    [ ABSTRACT | Journal ABSTRACT | Journal ERRATUM ]
59. U. Albocher, A.A. Oberai, P.E. Barbone, and I. Harari, “Adjoint-weighted equation for inverse problems of incompressible plane-stress elasticity,” Computer Methods in Applied Mechanics and Engineering 198(30-32), 2412–2420 (2009).
    [ ABSTRACT | ScienceDirect ABSTRACT ]
60. E. Grosu and I. Harari, “Three-dimensional element configurations for the discontinuous enrichment method for acoustics,” International Journal for Numerical Methods in Engineering 78(11), 1261–1291 (2009).
    [ ABSTRACT | Journal ABSTRACT ]
61. I. Harari and N. Makmel, “Dispersion analysis of the discontinuous enrichment method for plane-strain elasticity,” International Journal for Computational Methods in Engineering Science & Mechanics 10(5), 303–316 (2009).
    [ ABSTRACT | Journal ABSTRACT ]
62. P.E. Barbone, C.E. Rivas, I. Harari, U. Albocher, A.A. Oberai, and Y. Zhang, “Adjoint-weighted variational formulation for the direct solution of inverse problems of general linear elasticity with full interior data,” International Journal for Numerical Methods in Engineering 81(13), 1713–1736 (2010).
    [ ABSTRACT | Journal ABSTRACT ]
63. I. Harari and J. Dolbow, “Analysis of an efficient finite element method for embedded interface problems,” Computational Mechanics 46(1), 205–211 (2010).
    [ ABSTRACT | Journal ABSTRACT ]
64. A. Embar, J. Dolbow, and I. Harari, “Imposing Dirichlet boundary conditions with Nitsche's method and spline-based finite elements,” International Journal for Numerical Methods in Engineering 83(7), 877–898 (2010).
    [ ABSTRACT | Journal ABSTRACT ]
65. I. Harari, R. Ganel, and E. Grosu, “Stabilized finite elements for time-harmonic elastic waves,” Computer Methods in Applied Mechanics and Engineering 200(21-22), 1774–1786 (2011).
    [ ABSTRACT | ScienceDirect ABSTRACT ]
66. I. Harari, I. Sokolov, and S. Krylov, “Consistent loading for thin plates,” Journal of Mechanics of Materials and Structures 6(5), 765–790 (2011).
    [ ABSTRACT | Journal ABSTRACT ]
67. I. Sokolov, S. Krylov, and I. Harari, “Electromechanical analysis of micro-beams based on planar finite-deformation theory,” Finite Elements in Analysis and Design 49(1), 28–34 (2012).
    [ ABSTRACT | ScienceDirect ABSTRACT ]
68. I. Harari and E. Shavelzon, “Embedded kinematic boundary conditions for thin plate bending by Nitsche's approach,” International Journal for Numerical Methods in Engineering 92(1), 99–114 (2012).
    [ ABSTRACT | Journal ABSTRACT ]
69. Y. Zhang, A.A. Oberai, P.E. Barbone, and I. Harari, “Solution of the time-harmonic viscoelastic inverse problem with interior data in two dimensions,” International Journal for Numerical Methods in Engineering 92(13), 1100–1116 (2012).
    [ ABSTRACT | Journal ABSTRACT ]
70. M. Lan, H. Waisman, and I. Harari, “A direct analytical method to extract mixed-mode components of strain energy release rates from Irwin's integral using extended finite element method,” International Journal for Numerical Methods in Engineering 95(12), 1033–1052 (2013).
    [ ABSTRACT | Journal ABSTRACT ]
71. M. Lan, H. Waisman, and I. Harari, “A high order extended finite element method for extraction of mixed-mode strain energy release rates in arbitrary crack settings based on Irwin's integral,” International Journal for Numerical Methods in Engineering 96(12), 787–812 (2013).
    [ ABSTRACT | Journal ABSTRACT ]
72. U. Albocher, P.E. Barbone, A.A. Oberai, and I. Harari, “Uniqueness and direct solution of inverse problems of isotropic incompressible three-dimensional elasticity,” Journal of the Mechanics and Physics of Solids 73, 55–68 (2014).
    [ ABSTRACT | Journal ABSTRACT ]
73. U. Albocher, P.E. Barbone, M.S. Richards, A.A. Oberai, and I. Harari, “Approaches to accommodate noisy data in the direct solution of inverse problems in incompressible plane-strain elasticity,” Inverse Problems in Science & Engineering 22(8), 1307–1328 (2014).
    [ ABSTRACT | Journal ABSTRACT ]
74. T. Saksala, D. Brancherie, I. Harari, and A. Ibrahimbegovic, “Combined continuum damage-embedded discontinuity model for explicit dynamic fracture analyses of quasi-brittle materials,” International Journal for Numerical Methods in Engineering 101(3), 230–250 (2015).
    [ ABSTRACT | Journal ABSTRACT ]
75. G. Song, H. Waisman, M. Lan, and I. Harari, “Extraction of Stress Intensity Factors from Irwin's integral using high order XFEM on triangular meshes,” International Journal for Numerical Methods in Engineering 102(3-4), 528–550 (2015).
    [ ABSTRACT | Journal ABSTRACT ]
76. I. Harari and E. Grosu, “A unified approach for embedded boundary conditions for fourth-order elliptic problems,” International Journal for Numerical Methods in Engineering 104(7), 655–675 (2015).
    [ ABSTRACT | Journal ABSTRACT ]
77. W. Jiang, C. Annavarapu, J. Dolbow and I. Harari, “A robust Nitsche's formulation for interface problems with spline-based finite elements,” International Journal for Numerical Methods in Engineering 104(7), 676–696 (2015).
    [ ABSTRACT | Journal ABSTRACT ]
78. I. Sokolov, S. Krylov, and I. Harari, “Extension of non-linear beam models with deformable cross-sections,” Computational Mechanics 56(6), 999–1021 (2015).
    [ ABSTRACT | Journal ABSTRACT ]
79. Y. Zhang, P.E. Barbone, I. Harari, and A.A. Oberai, “Uniqueness of the interior plane strain time-harmonic viscoelastic inverse problem,” Journal of the Mechanics and Physics of Solids 92, 345–355 (2016).
    [ ABSTRACT | Journal ABSTRACT ]
80. D. Schillinger, I. Harari, M.-C. Hsu, D. Kamensky, K.F.S. Stoter, Y. Yu, and Y. Zhao, “The non-symmetric Nitsche method for the parameter-free imposition of weak boundary and coupling conditions in immersed finite elements,” Computer Methods in Applied Mechanics and Engineering 309, 325–352 (2016).
    [ ABSTRACT | Journal ABSTRACT ]
81. Z. Zou, W. Aquino, and I. Harari, “Nitsche's method for Helmholtz problems with embedded interfaces,” International Journal for Numerical Methods in Engineering 110(7), 618–636 (2017).
    [ ABSTRACT | Journal ABSTRACT ]
82. Y. Wang, H. Waisman, and I. Harari, “Direct evaluation of stress intensity factors for curved cracks using Irwin's integral and a high-order extended finite element method,” International Journal for Numerical Methods in Engineering 112(7), 629–654 (2017).
    [ ABSTRACT | Journal ABSTRACT ]
83. I. Harari and U. Albocher, “Spectral investigations of Nitsche's method,” Finite Elements in Analysis and Design 145, 20–31 (2018).
    [ ABSTRACT | Journal ABSTRACT ]

Accepted for publication

1. B. San, H. Waisman, and I. Harari, “Analytical and numerical shape optimization of structures under self-weight and mass constraints,” Journal of Engineering Mechanics (2019).
   [ ABSTRACT ]
2. P.E. Barbone, N. Nazari, and, I. Harari, “Stabilized finite elements for time-harmonic waves in incompressible and nearly incompressible elastic solids,” International Journal for Numerical Methods in Engineering (2019).
   [ ABSTRACT ]

Submitted for publication

1. I. Harari and U. Albocher, “Complementary solutions of Nitsche's method,” Journal of Scientific Computing (2018).
   [ ABSTRACT ]

Chapters in Books

1. F. Chalot et al., ``Calculation of two-dimensional compressible Euler flows with a new Petrov-Galerkin finite element method,'' pp. 88-104 in Notes on Numerical Fluid Mechanics, Vol. 26 (eds. A. Dervieux, B. van Leer, J. Périaux and A. Rizzi). Vieweg, Braunshwieg, 1989.
2. I. Harari and T.J.R. Hughes, ``Numerical methods for the Helmholtz equation with non-reflecting boundary conditions in exterior domains,'' pp. 379-388 in The Finite Element Method in the 1990's (eds. E. Oñate, J. Periaux and A. Samuelsson). Springer-Verlag/CIMNE, Barcelona, 1991.
3. I. Harari, P.E. Barbone, P. Barai, M. Slavutin, and S. Shmulman, ``Trefftz infinite elements for acoustic computation in unbounded domains," pp. 161-168 in Developments in Computational Mechanics with High Performance Computing (ed. B.H.V. Topping). Civil-Comp Press, Edinburgh, 1999.
4. I. Harari, ``Acoustics," pp. 292-307 in Finite Element Methods: 1970's and Beyond (eds. L.P. Franca, T.E. Tezduyar, and A. Masud). CIMNE, Barcelona, 2004.
5. I. Harari, “Dispersion, Pollution, and Resolution,” pp. 37–56 in Computational Acoustics of Noise Propagation in Fluids - Finite and Boundary Element Methods (eds. S. Marburg and B. Nolte). Springer, Heidelberg, 2008.

Editing

1. J. Bielak and I. Harari, guest editors, ``Enabling methodologies for large-scale computational structural acoustics," Special issue of the Journal of Computational Acoustics, 5(1), (1997) 136 p.
2. D. Givoli and I. Harari, guest editors, ``Exterior problems of wave propagation," Special issue of Computer Methods in Applied Mechanics and Engineering, 164(1-2), (1998) 272 p.
3. R.J. Astley, K. Gerdes, D. Givoli, and I. Harari, guest editors, ``Finite element methods for wave propagation," Special issue of the Journal of Computational Acoustics, 8(1), (2000) 257 p.
4. D. Givoli and I. Harari, guest editors, ``New computational methods for wave propagation," Special issue of Wave Motion, 39(4), (2004) 101 p.
5. F. Magoulès and I. Harari, guest editors, ``Absorbing boundary conditions," Special issue of Computer Methods in Applied Mechanics and Engineering, 195(29-32), (2006) 352 p.
6. I. Harari and S. Krylov, guest editors, “Analysis and design of MEMS/NEMS,” Special issue of Finite Elements in Analysis and Design 49(1), (2012) 78 p.
7. J. Dolbow, C. Farhat, I. Harari, and A. Lew, guest editors, “Advances in Embedded Interface Methods,” Special issue of the International Journal for Numerical Methods in Engineering 104(7), (2015) 280 p.

Reports

1. I. Harari, Particulate Considerations in the Design of Semiconductor Fabrication Equipment. ADT Report, Applied Materials, Inc., Santa Clara, California, 1986.
2. I. Harari, ``No-swirl, axisymmetric flow of an ideal gas: SUPG finite element method for the solution of the Euler equations,'' Progress Report, Applied Mechanics Division, Stanford University, Stanford, California, August 1986.
3. I. Harari and T.J.R. Hughes, ``Mach 6.34 viscous flow over cylindrical leading edge: SUPG solution,'' Progress Report, Applied Mechanics Division, Stanford University, Stanford, California, July 1987.
4. I. Harari and T.J.R. Hughes, ``Mach 6.47 viscous flow over cylindrical leading edge: G/LS solution,'' Progress Report, Applied Mechanics Division, Stanford University, Stanford, California, September 1988.
5. T.J.R. Hughes, A. Masud and I. Harari, ``Slightly compressible formulation of the Navier-Stokes equations for flow simulation over a submarine,'' Research Brief, Applied Mechanics Division, Stanford University, Stanford, California, June 1990.
6. T.J.R. Hughes, A. Masud and I. Harari, ``Drilling degrees of freedom for dynamic analysis,'' Research Brief, Applied Mechanics Division, Stanford University, Stanford, California, January 1991.
7. I. Harari and T.J.R. Hughes, Computational Methods for Problems of Acoustics with Particular Reference to Exterior Domains. SUDAM Report No. 91-1, Applied Mechanics Division, Stanford University, Stanford, California, June 1991.
8. I. Harari and E. Turkel, ``Accurate finite difference methods for time-harmonic wave propagation,'' ICASE Report No. 94-13, Institute for Computer Applications in Science and Engineering, NASA Langley Research Center, Hampton, Virginia, March 1994.
   [ ICASE ABSTRACT | Storming Media ABSTRACT ]
9. I. Harari and P.E. Barbone, ``Finite element formulations for exterior domains: Application to hybrid methods, non-reflecting boundary conditions and infinite elements,'' Report No. AM-96-001, Department of Aerospace and Mechanical Engineering, Boston University, Boston, Massachusetts, January 1996.
10. I. Harari, P.E. Barbone and M. Slavutin, ``Boundary infinite elements,'' Report No. AM-96-009, Department of Aerospace and Mechanical Engineering, Boston University, Boston, Massachusetts, March 1996.
11. I. Harari, L.P. Franca, and S.P. Oliveira, ``Streamline design of stability parameters for advection-diffusion problems,'' Report No. 160, Center for Computational Mathematics, University of Colorado at Denver, Denver, Colorado, June 2000.
12. C. Farhat, I. Harari, and L.P. Franca, ``The discontinuous enrichment method,'' Report No. CU-CAS-00-20, Center for Aerospace Structures, University of Colorado at Boulder, Boulder, Colorado; Report No. 164, Center for Computational Mathematics, University of Colorado at Denver, Denver, Colorado, August 2000.
13. C. Farhat, I. Harari, and U. Hetmaniuk, ``A discontinuous Galerkin method with Lagrange multipliers for the solution of Helmholtz problems in the mid-frequency regime,'' Report No. CU-CAS-02-15, Center for Aerospace Structures, University of Colorado at Boulder, Boulder, Colorado, 2002.
14. I. Harari and R. Djellouli, ``Analytical study of the effect of wave number on the performance of local absorbing boundary conditions for acoustic scattering," Report No. CU-CAS-02-21, Center for Aerospace Structures, University of Colorado at Boulder, Boulder, Colorado, February 2003.
15. L. Demkowicz, and I. Harari, “Robust discontinuous Petrov Galerkin (DPG) methods for reaction-dominated diffusion,” ICES Report 14-36, The Institute for Computational Engineering and Sciences, The University of Texas at Austin, December 2014.

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