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Grigorieva, Ellina Valerievna

Professor
Candidate of physico-mathematical sciences (1996)
Speciality: 01.01.02 (Differential equations, dynamical systems, and optimal control)
E-mail:

Biography

Ellina Grigorieva was born and raised in Moscow, Russia. From the age of two, her family members noted that she could sing a melody accurately and beautifully, even before she could clearly talk. As a young girl, Ellina trained professionally as a musician and attended music school, where she studied violin and piano for seven years. During college, she sang soprano and traveled all over the world with the Moscow State University Academic Choir. It was during one of these trips that Ellina witnessed the fall of the Berlin Wall and the subsequent reunification of Germany.

After winning a math Olympiad, Ellina was admitted to Lomonosov Moscow State University without exams. She graduated with summa cum laude honors and a gold medal, and went on to earn her Ph.D. in physical and mathematical sciences.

Today, Ellina still loves singing and playing classical and modern pop music. Her weekends are busy, and she can often be found working on a new scientific research paper, attending the Dallas Symphony, viewing an opera, or shopping with her daughter Sasha.


https://www.mathnet.ru/eng/person75867
List of publications on Google Scholar

Publications in Math-Net.Ru Citations
2022
1. E. N. Khailov, E. V. Grigorieva, A. D. Klimenkova, “Optimal combination treatment protocols for a controlled model of blood cancer”, Trudy Inst. Mat. i Mekh. UrO RAN, 28:3 (2022),  222–240  mathnet  elib 1
2021
2. N. L. Grigorenko, E. N. Khailov, E. V. Grigorieva, A. D. Klimenkova, “Optimal strategies of CAR T-Cell therapy in the treatment of leukemia within the Lotka-Volterra predator-prey model”, Trudy Inst. Mat. i Mekh. UrO RAN, 27:3 (2021),  43–58  mathnet  elib 1
3. N. L. Grigorenko, E. N. Khailov, E. V. Grigorieva, A. D. Klimenkova, “Lotka–Volterra Competition Model with a Nonmonotone Therapy Function for Finding Optimal Strategies in the Treatment of Blood Cancers”, Trudy Inst. Mat. i Mekh. UrO RAN, 27:2 (2021),  79–98  mathnet  elib; Proc. Steklov Inst. Math. (Suppl.), 317, suppl. 1 (2022), S71–S89  isi  scopus 2
4. E. N. Khailov, E. V. Grigorieva, “Connecting a Third-Order Singular Arc with Nonsingular Arcs of Optimal Control in a Minimization Problem for a Psoriasis Treatment Model”, Trudy Mat. Inst. Steklova, 315 (2021),  271–283  mathnet; Proc. Steklov Inst. Math., 315 (2021), 257–269  isi  scopus
2020
5. N. L. Grigorenko, E. N. Khailov, E. V. Grigorieva, A. D. Klimenkova, “Optimal Strategies in the Treatment of Cancers in the Lotka–Volterra Mathematical Model of Competition”, Trudy Inst. Mat. i Mekh. UrO RAN, 26:1 (2020),  71–88  mathnet  elib; Proc. Steklov Inst. Math. (Suppl.), 313, suppl. 1 (2021), S100–S116  isi  scopus 4
2019
6. E. N. Khailov, E. V. Grigorieva, “On a Third-Order Singular Arc of Optimal Control in a Minimization Problem for a Mathematical Model of Psoriasis Treatment”, Trudy Mat. Inst. Steklova, 304 (2019),  298–308  mathnet  mathscinet  elib; Proc. Steklov Inst. Math., 304 (2019), 281–291  isi  scopus 2
2013
7. E. N. Khailov, E. V. Grigorieva, “On the extensibility of solutions of nonautonomous quadratic differential systems”, Trudy Inst. Mat. i Mekh. UrO RAN, 19:4 (2013),  279–288  mathnet  mathscinet  elib 2
2012
8. N. V. Bondarenko, E. V. Grigor'eva, E. N. Khailov, “Minimization problem of pollution in mathematical model of biological wastewater treatment”, Zh. Vychisl. Mat. Mat. Fiz., 52:4 (2012),  614–627  mathnet  elib 1

Presentations in Math-Net.Ru
1. Optimal strategies for combining drug and oncolytic virus therapies in a cancer treatment model
E. N. Khailov, E. V. Grigorieva
International Conference “Differential Equations and Optimal Control” dedicated to the centenary of the birth of Academician Evgenii Frolovich Mishchenko
June 8, 2022 17:50   
2. Optimal two- stage treatment protocol for a blood cancer model
E. V. Grigorieva
Seminar on mathematical modeling in biology and medicine
March 24, 2022 16:30   
3. Optimal strategies of the psoriasis treatment by suppressing the interactions between T-lymphocytes, keratinocytes and dendritic cells
E. N. Khailov, E. V. Grigorieva
International conference "Systems Analysis: Modeling and Control" in memory of Academician A. V. Kryazhimskiy
June 1, 2018 14:30
4. An optimal control problem for a mathematical model of psoriasis
E. N. Khailov, E. V. Grigorieva
International Conference "Mathematical Theory of Optimal Control" dedicated to the 90th birthday of Academician R. V. Gamkrelidze
June 2, 2017 16:05

Organisations
 
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