Longitudinal tumor size and neutrophil‐to‐lymphocyte ratio are prognostic biomarkers for overall survival in patients with advanced non‐small cell lung cancer treated with … S Gavrilov, K Zhudenkov, G Helmlinger, J Dunyak, K Peskov, S Aksenov CPT: pharmacometrics & systems pharmacology 10 (1), 67-74, 2021 | 19 | 2021 |
Numerical methods for determining the inhomogeneity boundary in a boundary value problem for Laplace’s equation in a piecewise homogeneous medium SV Gavrilov, AM Denisov Computational Mathematics and Mathematical Physics 51, 1377-1390, 2011 | 11 | 2011 |
An iterative way of solving the inverse scattering problem for an acoustic system of equations in an absorptive layered nonhomogeneous medium AV Baev, SV Gavrilov Moscow University Computational Mathematics and Cybernetics 42, 55-62, 2018 | 10 | 2018 |
A workflow for the joint modeling of longitudinal and event data in the development of therapeutics: Tools, statistical methods, and diagnostics K Zhudenkov, S Gavrilov, A Sofronova, O Stepanov, N Kudryashova, ... CPT: Pharmacometrics & Systems Pharmacology 11 (4), 425-437, 2022 | 5 | 2022 |
A numerical method for determining the inhomogeneity boundary in the electrical impedance tomography problem in the case of piecewise-constant conductivity SV Gavrilov Mathematical Models and Computer Simulations 13, 579-585, 2021 | 4 | 2021 |
A numerical method for solving a three-dimensional electrical impedance tomography problem in the case of the data given on part of the boundary SV Gavrilov, AM Denisov Mathematical Models and Computer Simulations 8, 369-381, 2016 | 4 | 2016 |
Numerical method for determining the inhomogeneity boundary in the Dirichlet problem for Laplace’s equation in a piecewise homogeneous medium SV Gavrilov, AM Denisov Computational Mathematics and Mathematical Physics 50, 1391-1398, 2010 | 4 | 2010 |
Numerical method for solving an inverse problem for Laplace’s equation in a domain with an unknown inner boundary SV Gavrilov Computational Mathematics and Mathematical Physics 59, 59-65, 2019 | 3 | 2019 |
Numerical solution method for the electric impedance tomography problem in the case of piecewise constant conductivity and several unknown boundaries SV Gavrilov, AM Denisov Differential Equations 52, 877-886, 2016 | 3 | 2016 |
An iterative method for solving a 3D electrical impedance tomography problem in the case of piecewise constant conductivity and several measurements on the boundary SV Gavrilov Numerical methods and programming 14 (1), 26-30, 2013 | 3 | 2013 |
Iterative method for solving a three-dimensional electrical impedance tomography problem in the case of piecewise constant conductivity and one measurement on the boundary SV Gavrilov, AM Denisov Computational Mathematics and Mathematical Physics 52, 1139-1148, 2012 | 3 | 2012 |
Numerical solution methods for a nonlinear operator equation arising in an inverse coefficient problem SV Gavrilov, AM Denisov Differential Equations 57 (7), 868-875, 2021 | 2 | 2021 |
Longitudinal tumor size and NLR as predictive factors of individual survival compared to their baseline values in patients with non-small cell lung cancer treated with durvalumab. K Zhudenkov, S Gavrilov, K Peskov, G Helmlinger, S Aksenov Journal of Clinical Oncology 37 (15_suppl), e20047-e20047, 2019 | 2 | 2019 |
Numerical conditioning analysis of two-dimensional problems in electrical impedance tomography SV Gavrilov Numerical methods and programming 15 (2), 329-336, 2014 | 2 | 2014 |
The Inverse Scattering Problem in a Nonstationary Medium AV Baev, SV Gavrilov Computational Mathematics and Modeling 30, 218-229, 2019 | 1 | 2019 |
An iterative method for determining the shape and conductivity of a homogeneous inclusion in the two-dimensional electrical impedance tomography problem SV Gavrilov Numerical methods and programming 16 (4), 501-506, 2015 | 1 | 2015 |
Numerical method for solving a two-dimensional electrical impedance tomography problem in the case of measurements on part of the outer boundary SV Gavrilov, AM Denisov Computational Mathematics and Mathematical Physics 54, 1690-1699, 2014 | 1 | 2014 |
Numerical method for determining the inhomogeneity boundary in the electrical impedance tomography problem in the case of piecewise constant conductivity SV Gavrilov Matematicheskoe modelirovanie 32 (11), 59-69, 2020 | | 2020 |
Numerical method for determining the inhomogeneity boundary in the two-dimensional Electrical Impedance Tomography problem in the case of piecewise constant conductivity SV Gavrilov Ломоносовские чтения, 16-17, 2020 | | 2020 |
The analysis of different longitudinal biomarkers association with the overall survivalin non-small cell lung cancer by means of joint modeling A Sofronova, K Peskov, S Gavrilov, K Zhudenkov, O Stepanov BIOINFORMATICS OF GENOME REGULATION AND STRUCTURE/SYSTEMS BIOLOGY (BGRS/SB …, 2020 | | 2020 |