Layton, A. T., & Layton, H. E. (2002). A semi-Lagrangian semi-implicit numerical method for models of the urine concentrating mechanism SIAM Journal on Scientific Computing, 23, 1526\textendash1548.
Reference author: Anita Layton
First name
Anita
Middle name
T
Last name
Layton
Layton, A. T., Christara, C. C., & Jackson, K. R. (2002). Optimal quadratic spline collocation methods for the shallow water equations on the sphere Submitted to Mathematics and Computers in Simulation.
Layton, A. T., & van de Panne, M. (2002). A numerically efficient and stable algorithm for animating water waves The Visual Computer, 18, 41\textendash53.
Layton, A. T., & Layton, H. E. (2002). A numerical method for renal models that represent tubules with abrupt changes in membrane properties Journal of Mathematical Biology, 45, 549\textendash567.
Layton, A. T., & Layton, H. E. (2005). A region-based mathematical model of the urine concentrating mechanism in the rat outer medulla. I. Formulation and base-case results American Journal of Physiology-Renal Physiology, 289, F1346\textendashF1366.
Layton, A. T., & Layton, H. E. (2005). A region-based mathematical model of the urine concentrating mechanism in the rat outer medulla. II. Parameter sensitivity and tubular inhomogeneity American Journal of Physiology-Renal Physiology, 289, F1367\textendashF1381.
Layton, A. T. (2005). Role of structural organization in the urine concentrating mechanism of an avian kidney Mathematical Biosciences, 197, 211\textendash230.
Layton, A. T., Moore, L. C., & Layton, H. E. (2005). Multistability in tubuloglomerular feedback and spectral complexity in spontaneously hypertensive rats American Journal of Physiology-Renal Physiology.
Layton, A. T. (2005). A methodology for tracking solute distribution in a mathematical model of the kidney Journal of Biological Systems, 13, 399\textendash419.
Layton, A. T., & Minion, M. L. (2005). Implications of the choice of quadrature nodes for Picard integral deferred corrections methods for ordinary differential equations BIT Numerical Mathematics, 45, 341\textendash373.
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