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CE Home > People > Faculty Directory > Sonia Mogilevskaya

Sonia Mogilevskaya
Senior Research Associate

Sonia Mogilevskaya

Contact Information:

  • Office: CivE 161
  • Phone: (612)625-4810
  • Fax: (612)626-7750
  • E-mail: mogil003@umn.edu

Research Interests:

Sonia Mogilevskaya's expertise is in the area of applied mathematics and computational mechanics, with special emphasis on problems involving geomaterials and composite materials. Her current research projects include: (1) modeling fracture propagation in infinite, semi-infinite and finite domains with inclusions, holes and notches, with special loading conditions (poroelastic and thermal effects, etc.) taken into account, and (2) computational modeling of materials with inhomogeneities, such as inclusions, voids and cracks.

Selected Publications:

Huang, Y., Mogilevskaya, S.G. and Crouch, S.L. 2006. Complex variable boundary integral method for linear viscoelasticity. Part I-basic formulations. Engineering Analysis with Boundary Elements 30: 1049-1056.

Wang, J., Crouch, S.L. and Mogilevskaya, S.G. 2005. A fast and accurate algorithm for a Galerkin boundary integral method. Computational Mechanics 37: 96-109.

Wang, J., Mogilevskaya, S.G. and Crouch, S.L. 2005. An embedding method for circular inhomogeneities in a finite convex domain. International Journal for Solids and Structures 42: 4588-4612.

Legros, B., Mogilevskaya, S.G. and Crouch, S.L. 2004. A boundary integral method for multiple circular inclusions in an elastic half-plane. Engineering Analysis with Boundary Elements 28: 1083-1098.

Mogilevskaya, S.G., Crouch, S.L. 2004. A Galerkin boundary integral method for multiple circular elastic inclusions with uniform interphase layers. International Journal for Solids and Structures 41: 1285-1311.

Mogilevskaya, S.G., Crouch, S.L. 2001. A Galerkin boundary integral method for multiple circular elastic inclusions. International Journal for Numerical Methods in Engineering 52: 1069-1106.

Mogilevskaya, S.G. 2000: Complex hypersingular integral equation for the piece-wise homogeneous half-plane with cracks. International Journal of Fracture, 102: 177-204.

Mogilevskaya, S.G. and Linkov, A.M. 1998. Complex fundamental solutions and complex variables boundary element method in elasticity. Computational Mechanics, 22: 88-92.

Mogilevskaya, S.G. 1997. Numerical modelling of 2-D smooth crack growth. International Journal of Fracture, 87: 389-405.

Linkov, A.M. and Mogilevskaya, S.G. 1994. Complex hypersingular integrals and integral equations in plane elasticity. Acta Mechanica, 105: 189-205.

Education:

  • Ph.D., 1987, Scotchinsky Research Institute of Mining, Russian Academy of Sciences, Moscow
 
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