This picture showsHadi Minbashian

Dr. rer. nat.

Hadi Minbashian

Research assistant
Institute of Applied Analysis and Numerical Simulation
Chair of Applied Mathematics

Contact

Pfaffenwaldring 57
70569 Stuttgart
Deutschland

  1. H. Minbashian, H. Adibi, and M. Denghan, “An adaptive space-time shock capturing method with high order wavelet bases for the system of shallow water equations,” International Journal of Numerical Methods for Heat & Fluid Flow, vol. 28, no. 12, Art. no. 12, 2017, doi: 10.1108/HFF-08-2017-0320.
  2. H. Minbashian, H. Adibi, and M. Denghan, “An adaptive wavelet space-time SUPG method for hyperbolic conservation laws,” Numerical Methods for Partial Differential Equations, vol. 33, no. 6, Art. no. 6, 2017, doi: 10.1002/num.22180.
  3. H. Minbashian, “Wavelet-based multiscale methods for numerical solution of hyperbolic conservation laws,” Dissertation, Tehran, 2017.
  4. H. Minbashian, H. Adibi, and M. Denghan, “An adaptive space-time shock capturing method with high order wavelet bases for the system of shallow water equations,” vol. 28, no. 12, Art. no. 12, 2017, doi: 10.1108/HFF-08-2017-0320.
  5. H. Minbashian, H. Adibi, and M. Denghan, “On resolution of boundary layers of exponential profile with small thickness using an upwind method in IGA.” 2017.
  6. H. Minbashian, H. Adibi, and M. Denghan, “An adaptive wavelet space-time SUPG method for hyperbolic conservation laws,” vol. 33, no. 6, Art. no. 6, 2017, doi: 10.1002/num.22180.
  7. A. A. Hemmat, A. Rivaz, and H. Minbashian, “Numerical Solution of Linear Fredholm Integral Equations by Using Daubechies Wavelets,” presented at the 23rd International Conference of the Jangjeon Mathematical Society, Ahvaz, Iran, 2010.
  8. M. Kargar, H. Minbashian, and M. A. Yaghoobi, “Fuzzy Multicriteria Convex Quadratic Programming Model for Data Classification,” presented at the 4th International Conference on Fuzzy Information & Engineering (ICFIE), Amol, Iran, 2010.
  9. A. A. Hemmat, A. Rivaz, and H. Minbashian, “Approximating Functions by Using Daubechies Wavelets and comparison with Other Approximation Methods,” presented at the 4th Iranian Conference on Applied Mathematics, Zahedan/Sistan & Baluchistan, Iran, 2010.
  10. M. Kargar, H. Minbashian, and M. Mashinchi, “Solving Delay Differential Equation with Fuzzy Coefficients,” presented at the 10th Iranian Conference on Fuzzy Systems, Theran, Iran, 2010.
  11. M. Kargar, H. Minbashian, and M. A. Yaghoobi, “Fuzzy Multicriteria Convex Quadratic Programming Model for Data Classification,” presented at the 4th International Conference on Fuzzy Information & Engineering (ICFIE), Amol, Iran, 2010.
  12. A. A. Hemmat, A. Rivaz, and H. Minbashian, “Approximating Functions by Using Daubechies Wavelets and comparison with Other Approximation Methods,” presented at the 4th Iranian Conference on Applied Mathematics, Zahedan/Sistan & Baluchistan, Iran, 2010.
  13. A. A. Hemmat, A. Rivaz, and H. Minbashian, “Numerical Solution of Linear Fredholm Integral Equations by Using Daubechies Wavelets,” presented at the 23rd International Conference of the Jangjeon Mathematical Society, Ahvaz, Iran, 2010.
  14. M. Kargar, H. Minbashian, and M. Mashinchi, “Solving Delay Differential Equation with Fuzzy Coefficients,” presented at the 10th Iranian Conference on Fuzzy Systems, Theran, Iran, 2010.
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