POPOV 300 



and others. Experimental study of the movement of the volu- 

 metric charge in the field of a corona of alternating cur- 

 rent. Izvest. Akad. Nauk S.S.S.R., Otdel. Tekh. Nauk, 1957, 

 #1. 



and V. I. Levitov. Reactive effects of a corona of alternat- 

 ing current. Electricity, 1956, #7. 



and N. B. Bogdanova. Methods of evaluating yearly losses 

 of energy on the corona. Electricity, 1957, #1. 



Biography: 



Corresponding Member of the U.S.S.R. Academy of Sciences, 

 V. I. Popkov. On the 50th Anniversary since the date of 

 birth and the 25th Anniversary of scientific activity. Elec- 

 tricity, 1958, #4, 94. 



Office: Institute of Energetics of USSR Academy of 



Sciences 

 Moscow, USSR 



Residence: Novopeschanaya, 21 

 Moscow, USSR 



Telephone: D7 24 18 



POPOV, YEVGENII PAVLOVICH (Automation Specialist) 



Ye. P. Popov was born in 1914. In 1939, upon completion of 

 the Bauman Moscow Advanced Technical School, he served in 

 the Soviet Army until 1943 when he began to work at the A. F. 

 Mozhaiskii Air Force Engineering Academy in Leningrad 

 where, in 1949, he became chairman of the Department of Auto- 

 mation and Remote Control. At the same time he was working 

 as a senior scientific worker at the U.S.S.R. Academy of Sci- 

 ences Institute of Electromechanics. He was awarded the de- 

 gree of Doctor of Technical Sciences in 1947 and the rank of 

 professor in 1948. Since 1942 he has been a member of the 

 Communist Party of the Soviet Union. He was elected, in 1960, 

 a Corresponding Member of the U.S.S.R. Academy of Sciences. 

 In 1949 he was awarded a Stalin Prize. 



Popov's works are primarily concerned with the theory of 

 automatic controls. 

 Bibliography: 



On the approximate study of self and forced oscillations on 

 nonlinear systems. Doklady Akad. Nauk S.S.S.R. 95, 5, 943- 

 946 (1954). Applied Mechanics Reviews 9, 654 (1956). 

 Approximate calculation of self-excited and forced vibrations 

 in nonlinear systems of higher order on the basis of the 

 harmonic linearization of nonlinearity. Izvest. Akad. Nauk 



