Raytcho Lazarov
Affiliations: | Texas A & M University, College Station, TX, United States |
Area:
MathematicsGoogle:
"Raytcho Lazarov"Children
Sign in to add trainee| Stanimire Z. Tomov | grad student | 2002 | Texas A & M |
| Victor E. Ginting | grad student | 2004 | Texas A & M |
| Veselin A. Dobrev | grad student | 2007 | Texas A & M |
| Seul K. Kang | grad student | 2012 | Texas A & M |
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Publications
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| Jin B, Lazarov R, Sheen D, et al. (2016) Error estimates for approximations of distributed order time fractional diffusion with nonsmooth data Fractional Calculus and Applied Analysis. 19: 69-93 |
| Jin B, Lazarov R, Zhou Z. (2016) A Petrov-Galerkin finite element method for fractional convection-diffusion equations Siam Journal On Numerical Analysis. 54: 481-503 |
| Jin B, Lazarov R, Zhou Z. (2016) Two fully discrete schemes for fractional diffusion and diffusion-wave equations with nonsmooth data Siam Journal On Scientific Computing. 38: A146-A170 |
| Kraus J, Lazarov R, Lymbery M, et al. (2016) Preconditioning heterogeneous h(div) problems by additive schur complement approximation and applications Siam Journal On Scientific Computing. 38: A875-A898 |
| Efendiev Y, Lazarov R, Shi K. (2015) A multiscale HDG method for second order elliptic equations. Part I. Polynomial and homogenization-based multiscale spaces Siam Journal On Numerical Analysis. 53: 342-369 |
| Jin B, Lazarov R, Liu Y, et al. (2015) The Galerkin finite element method for a multi-term time-fractional diffusion equation Journal of Computational Physics. 281: 825-843 |
| Efendiev Y, Lazarov R, Moon M, et al. (2015) A spectral multiscale hybridizable discontinuous Galerkin method for second order elliptic problems Computer Methods in Applied Mechanics and Engineering. 292: 243-256 |
| Jin B, Lazarov R, Pasciak J, et al. (2014) Error analysis of a finite element method for the space-fractional parabolic equation Siam Journal On Numerical Analysis. 52: 2272-2294 |
| Jin B, Lazarov R, Zhou Z. (2014) An analysis of the L1 scheme for the subdiffusion equation with nonsmooth data Ima Journal of Numerical Analysis. 36: 197-221 |
| Jin B, Lazarov R, Lu X, et al. (2014) A simple finite element method for boundary value problems with a Riemann-Liouville derivative Journal of Computational and Applied Mathematics. 293: 94-111 |