SCIENTIFIC ABSTRACT REZNIKOVSKIY, P. T. - REZNITSKIY, L. M.

S/081/61/000/021/089/094 Further investigation of methodic ... B107/B147 The asymmetry of the deformation cycle showed a considerable effect on the working capacity of rubber. The authors describe a method and device for testing rubber for fatigue with symmetrical shearing by producing torsional vibrations of the dumbbell sample. The curves for the fatigue strength as a function of the amplitude of dynamic deformation of shearing for NK and SKB rubber are intersecting. It is recommended to examine the fatigue properties of rubber with deformation amplitudes characteristic of the work of the material in the workpiece. The interaction of rubber with the medium, the appearance of local stress con- centrations on the sample surface, and-the asymmetry of the deformation cycle should be taken into account. rAbstracter's note: Complete translation. Card 2/2  7-Z f ld--,her J,~riv~tiv,~s of c,);,-L,)-)und fL;ncti--.ns wit-, .Dne Lritermedi;ite variable., J Truly 9. Month! List of Russian Accessions, Library of Congress, r i Uncl.  1. IIE~NIYOVSKIY, P. T. 2. USSR (6r-C') 4. Least Squares 7. Solving normal equations in the method of least squares by successive elimination of unknowns. Soob. GAISH, No. 54, 1950. 9. Monthly List of Russian Accessions, Library of Congress, May 1953. Unclassified.  1. M-IZIIIIKOV:;hIY, F. T. 2. US:j-R (600) 4. Least Squares 7. One variant in the method of least squares for solving a system of normal equations. Soob. GAISH, No. 54, 1950. 9. Monthly List of Russian Accessions, Library of Congress, 14ay -1953. Unclassified.  T 0-,,f  7';II-_(~-V-j~"Y' T. ht~. -Ii7!-trtnti-cm in them ll!~chnnics ;ind 1-1~ithrmpticnfaculty on -i KV 195' Di:5~sert:ltioa: "The! "Malytic-al The-,ory of 3ecular Long-Pcriod -PerturbAti-ane in the! Lotion of I-lercury.11 SO: Vc~;tnik ',c--kol-3ka-go Univcr-,itella, ~Icriya Fizi-kc-l-'~,.t,~ritatichesk.,Lkh i Yc:5tunmtv-nnr,y!,h N,,~uk, 'No. 1, 1-b7oc,,l, Fb 1953, PP 151-157: tran.,11. in jWs,T-2`)7-'2, 12 April 54, For ofjt'. utt only.  MZNIKOVSKT-Y. P.T. 'W- __~, Gravitation interpretation of an internal variant of a once-regularized reRtricted elliptical problem of three points. Tmdy GAISH 21:57-90 '52. (MLRA 7:6) (Problem of three bodies)  REZNIKOVSKIY, P.T. Resolution of the perturbation function of an internal variant of a once-regularized planar restricted circular problem of three points in Lagrangian elements. Trudy GAISH 21:91-114 '52. (MM 7:6) (Problem of three bodies)  REZNIKOVSKIY. P.T. ReSLlving the perturbation functions of the simplest regularized variants of a planar restricted elliptical problem of three points. Trudy GAISH 21:159-173 '52. (KLRA 7:6) (Problem of three bodies)  - ~-Z IV, - -NiKOVSK j t, I R  BAYEV, K.L.; SHISHAKOV, V.A.- REZNIKOVSKIY, P.To, redaktor; GAVRITX)V, 0 S.So, tekhnicheskiy- redak toy [Elements of cosmoUaphyl Ifachatki mirovedeniia. Izd. 4-e, perer. i dop. Moskva, Gos. izd-vo takhniko-teorato lit-ry, 1954. 123 P. (cosmog;raphy) (MIRA 8:4)  KULIKOV, Konstantin Ilekseyevich; REZNIKOVSKIY. P.T., redaktor; SAMSOMMKO, L.V.. redaktor; AKEIAMOV, redaktor [The fundamental constants of astronomy] FundamentalInye postoiian- nye astronomii. Moskva, Goa. izd-vo tekhniko-teoret. lit-ry, 1956, 340 p. (MIRA 9:7) (Astronomy)  POPOV. ]~'Jvel Ivanovich; REIZIIIKOVSKIY. P.T., red.; HURASHOVA, N.Ya., tekhn. red. [Popular manual of practical astronomy] Obshchedostupnaia praktiche- skaia astronomiia. Izd. 4, izpr. Moskva, Goa. izd-vo fiziko- matematicheskoi lit-ry, 1958. 159 P. (MIRA 11:6) (Astronomy, Spherical and practical)  UGORUDNIKOV, Kirill Pedorovich,;REZNIKOVSKIY, P.T.. red. KRYUCHLOVA. V. N. , takiin. red. 'LrDynamice of stellar systems] Dinamika, zvezdnykh siatem. KosL-va, Goa. izd-vo, fiziko-matematicheakoi lit-rr.1958. 627 P. (MIRA 11:12) (Stars)  AUTHOR: --Re~n47koxsICi~y ,__P.T. SOV/42- 13- 1,9/33 TTTLE: On the Region of Convergence of a Power Series Being the Solution of a Differential Equation (Ob oblast-i stepennogo ryada, predstavlyayushchego resheniye differentsiall- nogo uravneniya) PERIODICAL: Uspekhi matematicheskikh nauk, 1958,Vol 13,Nr 6,pp 145-150 (USSR) ABSTRACT: Given the differential equation (1) li = X(X, t x (X, t, 0) 0. dt Let the initial condition be (2) x = V for t = t (1) is written in the form t r (3) x = U + j X(x,t, r)dt t 0 and the solution is set up as (4) x = CK + x1 r+ x 2 r2..... . Card 1/3 On the interval It-t 014-~ T 'Let (V(xq^) majorize the funa-vion  On the Region of Convergence of a Power Series Being the SOV/42-13-6--i8/33 Solution of a Differential Equation X(X,tj/A); let O(x,o)=-O. Beside of (3) (5) z = a + T ~(Z,/A) is considered as a majorizing equation, where a Then (4) is majorized by the series (6) z = a + z ir + z 2r where (6) represents the series expansion of z which is given implicitly by (5). The condit-ion of convergence for (6) is (7) T !~ (z, P)