Research articles (not abstracts) pubilshed in refereed conference proceedings.
  1. Sarvesh Kumar, Neela Nataraj and A. K. Pani ( 2007), Finite volume element method for the incompressible miscible displacement problems in porous media , PAMM. Proc. Appl. Math.Mech.7, pp. 2020015-2020016.

  2. L. Jones Doss and A. K. Pani (2006), Semidiscrete qualocation method for the Stefan problem, Industrial Mathematics, Eds. Mohan C. Joshi, Amiya K. Pani and Sanjeev V. Sabnis, Narosa Publ. House, New Delhi, pp.105-120.

  3. S. Nigam, Kannan M. Moudgalya and A. K. Pani (2006), Equivalent dynamic solution of an industrial HDPE slurry reactor, ESCAPE-16/PSE-2006, Gramisch- Partenkirchen, pp. 9-13.

  4. P. Dhanumjaya and A. K. Pani (2005), Finite element method for the extended Fisher- Kolmogorov (EFK) equation,Differential Equations and Dynamical Systems, Ed. D. Bhaguna, Narosa Publ. House, New Delhi.

  5. J. Agarwal, Kannan M. Moudgalya and A. K. Pani (2005)A nonlinear gas-liquid systems in the sliding motion, Differential Equations and Dynamical Systems, Ed. D. Bhaguna, Narosa Publ. House, New Delhi.

  6. Jyoti Agarwal, Kannan M. Moudgalya and A. K. Pani (2003), Sliding motion of discontinu- ous dynamical systems described by differential algebraic equations, Proceedings of the 2002 American Control Conference, Omni Press, pp. 795-800.

  7. Pradeepa Nair and A. K. Pani (2003), Semi-discrete finite element method for a class of visco- elastic problems with long memory under condition of friction, Proceeding of Hyp2002: Ninth International Conference on Hyperbolic Problems: Theory, Numerics and Applications, Springer Verlag, pp. 745-754.

  8. Prashant Vora, Kannan M. Moudgalya and A. K. Pani (2002), Control of higher index DAE system through a linear control law, Proceedings of the 2002 American Control Conference, Anchorage, Alaska, Omni Press, pp. 465-470.

  9. Joyti Agarwal, Kannan M. Moudgalya and A. K. Pani (2002), An effcient integration algo- rithm for a class of discontinuous dynamical systems in sliding motion, Proceedings of the 2002 American Control Conference, Anchorage, Alaska, Omni Press, pp. 689-703.

  10. Pradeepa Nair and A. K. Pani (2002), Finite element approximation to an evolutionary vari- ational inequality with a Volterra term, Proceeding of the First International Conference on Industrial Mathematics in the Indian Sub-Continent, (Eds. A.H. Siddiqi and M. Ko~cvara), Kluwer Academic Press, London, pp. 317{338.

  11. Rajen K. Sinha and A. K. Pani (1998), A qualocation method for hyperbolic integro-differential equations, in the Proceedings of 4th SIAM International Conference on Mathematical and Numerical Aspects of Wave Propagation (June 1-5, 1998- Colorado School of Mines, Colorado), Ed. J. A. De Santo, SIAM Publication, Philadelphia, pp. 723{726.

  12. A. K. Pani (1998). An H1-Galerkin mixed finite element method for the second order wave equations, in the Proceedings of 4th SIAM International Conference on Mathematical and Numerical Aspects of Wave Propagation (June 1-5, 1998- Colorado School of Mines, Colorado), Ed. J. A. De Santo, SIAM Publication, Philadelphia, pp. 648{651.

  13. L. Jones T. Doss and A. K. Pani (1997), A qualocation method for a second order semilinear two-point boundary value problem, Functional Analysis With Current Applications in Science, Technology and Industry, (Eds. M. Brokate and A. H. Siddiqi), Pitman Research Notes in Mathematics, pp. 128{144.

  14. M. A. Mohammed Ali and A. K. Pani (1997), Mixed Finite Element Methods for Compressible Miscible Displacement Problems in Reservoir Studies, Functional Analysis With Current Applications in Science, Technology and Industry, (Eds. M. Brokate and A. H. Siddiqi), Pitman Research Notes in Mathematics, pp. 332{352.

  15. A. K. Pani and R. S. Anderssen (1992), Finite element methods for identification of parameters in parabolic problems, CMA Proceedings of Mini-Conference on `Inverse Problems in Partial Differential Equations', Australian National University, Canberra (August 23-25, 1990). A. K. Pani and R. S. Anderssen (eds.), CMA Proceedings, 31, pp. 208-221.

  16. A. K. Pani and R. S. Anderssen (1992), A priori error estimates for finite element Galerkin approximations to a free boundary problem in polymer technology, CMA Proceedings of Mini- Conference on `Free and Moving Boundary and Diffusion Problems', Australian National University, Canberra (June 14-16, 1990), R. S. Anderssen, J.M. Hill and A. K. Pani (eds.), CMA Proceedings, 30, pp. 142-153.

  17. A. K. Pani (1990), A finite element approximation to a unidimensional nonlinear ablation problem, Proceeding of 6th International Conference on `Numerical Methods in Thermal Problems', Swansea 1989, R. W. Lewis (ed.), Peneridge Press, pp. 101-107.

  18. A. K. Pani and P. C. Das (1990), Finite element approximation to a single phase quasilinear Stefan problem, Proceedings of International Colloquium on `Free Boundary Problems : Theory and Applications'. Isree/Bavaria (West Germany) 1987, K.H. Hoffman and J. Sprekels (eds.), Pitman Research Notes in Mathematics Vol. 186, Longman Scientific & Technical Publ., pp. 582-588.

  19. P. K. Mishra and A. K. Pani (1986), A method of interpolation of scattered data to a regular grid, Proceedings of National Space Science Symposium, Guwahati University (Feb. 19-22).

  20. P. C. Das and A. K. Pani (1986), An H1-Galerkin method for quasilinear parabolic differential equations, Proceedings of International Conference on `Methods of Functional Analysis in Approximation Theory', IIT, Bombay 1985. C.A. Micchelli, D.V. Pai and B.V. Limaye (eds.) International Series of Numerical Mathematics 76, Birkhauser Verlag Publ., 356-370.

  21. A. K. Pani and P. C. Das (1985), C0-interior-penalty Galerkin method for slightly compressible miscible displacement in porous media, Proceedings of International Conference on Nonlinear Mechanics, Sanghai (China), Chein Wei Zang (ed.), Science Press, Sanghai, 1186-1191.