SCIENTIFIC ABSTRACT KARPEL, N.G. - KARPENKO, A.P.

   aA   . . . . . . . . . . . . . . . .  RUBINSHTM.R.B.; KAML'.P.G. ~ Using nomographic computation methods in the Dractice of spectrum analysis. Izv. AN SSSR. Ser. fiz. 19 no.1:128-129 Ja-F '55. (KIRA 8:9) (Spectrum analysis) (Spectrometer)  KARPELI, Ya.D.; MOTYGINA, S.A. Use of synchronous motors in the petroleum refining industry and In petroleum chemistry. Prom. energ. 15 no.9:23-25 S 160. (MMA 13: 10) (Petroleum industr7--Electric equipment) (Electric motors, Synchronous)  KARPELI, Ya.D., inzh. Start network of synchronous motors. Energetik 12 no-3:25-26 Mr '64. (MIRA 17:4)  PRASLICKA, Mj T A_XM, 7.; MUZ, L. Effect of controlled hypothermia on survival and peripheral blood pic- ture in mice an&xat.& following irradiation. Cesk. f.Ysiol. 7 no.3:284- 285 MaY 58.. 1. Ustav biologie lek. fak. v Kosiciach a Ustav biofyziky GSAV, Brno. (BWOD GELIS, count, eff. of hypothermia in irradiated animals (Cz)) (RADLtTIOMS, eff. eff. of hypothermia on survival & blood count (Cs)) (HYI-POTERMTk. eff. an blood count & survival in irradiated animals (Cz))      USSR/Mathematics Modern Algebra 21 Aug 52 Matrices CDO VIClassification of the Simple Subgroups of Real Form of a Group of ComiDlex Unimodular Matrices, 11 F. I. Karpelevich, Moscow State U "DAN SSSR" Vol 85, No 6, pp 1205-8 Considers the vectors x+iy (x, y in real Lie algebra R) and associates with each real algebra R a complex Lie algebra designated by [Rj, which is defined in a real manner by the familiar commutative operation or 23BT90 imaginarie.c;. Algebra R is called the real form of algebra Zt-7, following E. Cartan. Established theo- rems relating these two algebras. Submitted by Acad A. N. Kolmogorov I Jul 52., 238T90 U  XWIevla, F. L Surfaces of traddavIty-of a geralsimple subgroup of the group or motions of a stric M_ CO- Doklady Akad- Nauk SSSR (N.5.) 93, 401-404 (1953). (116ssian) Tl~js work is based on the well known results of E. Cartan on senli-simple groups. If T2 is a symmetric Riemann space 4negative curvature, its Mup of motions 0 is serni-simple mid e iTstationary subgroup D 71s- a ~maxjma ~cmpa~, t sub- group of 0. Let C bp the Lie nig-,bra of 0 and p(g, h), g, h c G, the Cartait ULvariant bilinear form. Let H be a sub- space of G. The set of elements X of G such that V(X, h) = 0 for all h c H is called the orthogonal complement of H (in G). Let 6~ be a semi-simple subgroup of 0 and 6 a maximal compact subgroup of 6. Let 1~ and i1 be their subalgebras and 2 the orthogonal complement of fr in 0. Then 0 is canonically imbedded in G if there exists a maximal zzompact subalgebra H of G such that RCH and kCX. The twor theorems the author proves are as follows. Let 6 be canoni- cally imbedded in G and let RCII and XCX. If M is a point whose stationary subalgebra is Ir and S is the surface of transitivity qf d, containing 411', then Z is totally geodesic (with respect'to the metric fp(aj)). The other theorem states that if 6 is a semi-simple subgroup of 0 then it is canonically imbedded in 0. /0   KAMLEVICH F.I. --, 1, - I ~ "-- 111. 1-1 1 1 1 1 Simple subalgebras of real Lie algebras. Trudy Mosk.mat. ob-va 4: .3-112 155. (K[,RA 8:7) (Groups. Theory of) (Spaces, Generalized)  KARPELEVICH, F. 1. Cand Phys-Math Soi --(diae), __~groups of Lla!s I(SU groups and homogeneous egpsswea6-vfl- space.V Mos, 1956. 3 pp 20 cm. (Mos Order of Lenin and Order-of Labor Red Banner State U im M. V. Lomonosov. Meohan-Math Fawalty), 100 copies (KL, 7-57, 104)  A W_ "Z V 1_7 SUBJECT USSR/MLTR M TICS/Topology CARD 1/1 PG - 990 AUTHOR KARPHLEVICK F.I. TITLE -apaoe of homogensou7,;paoes. PERIODICAL Uspechi mat.Nauk 11, 3t 131-138 56) reviewed 7/1957 The principal.resul-t of the present paper is the proof of the following theoremi The factor space a/k, where G and.H are seni-aimple group.apaces ca'a be. fibred homogeneously. liere the fibres. are Euclidean- spaces and the basis is a space.K/P, where K and.P are maximal compact.subgroups of a and H respectively. After some consi-derations and definitions on the fibre space of group spaoes.the author introduces the essential.notion of the generalized Grassmann space. This is.the.totality k3j of all totally geodesic manifolds S of a symmetric Riemannian-3pace of non-positive curvature, where the S are obtained one from another by the.transformations of S. Now it is shown that every homogeneous space M with a semi-simple motion gro G can be mapped homomorphically onto such a generalized Grassmann spaceUIS1 . The above mentioned theorem then follows in essential by showing at first that fS1 can be fibred in the above manner.  ,n p and :-A,~'., :-1;,-:7-1 CIF. F.T I I'LE: Zonal Spherical Functi.~)ns %nd- c C,'-. metric Spaces Laplasa na np,',.otor~-kh frostranst-vakh). PZHIODICAL: Dol-lady Al-ade:j-;, -115-.'~ 7"01 113 P-. 0- 1 1 , , A -7,3T Il, A C T Let IM- G/111 be a homot.,enpous space with compact subCroup 11. As a Laplace operator on M :--crorlln- to [Hef.1] a difforontial oper-tor a is J,not-,' .,11 'ielh'c or.71 it 2 with the tra,,iqlation o:,-er,,ttors. Let R be the Tn~--nifold cf functions on )TL are coristant or,, "he trans-4tivity sur- faces of the suh.'~-rouo 11. Each Laplace onerator induces a cc,-r- tain differential operator on 11; -illis i; denoted a~i the ra-- dial Dart of 6. , in symbols Let the space X+ (11 be the manifold of the 1--dimensional. sub3paces of the ii-li- mensional complex space; let ),V(,- be dual to ac.. n , I- cording to Cartan and finally let )ALO be the sDace of ~M n,k complex matrices with k-lines and n-k rorrs. in the present, paper the author calculates the A of the LaDlace or~~vitorszj and the zonal spherical functions belon.-ing to the -irredu- I.-Ird 1/2  tonal Spherical Functions and Laplace Operators on Some Sym- 20-118-1-1/56 metric Spaces cible representations in the spaces 'N + and 0 n,k ' kn,k n,k - 1 Soviet and 1 foreign reference are quoted. ASSOCIATIONt Moskovakiy -osudarstvennyy universitet imeni ?,!.I!.Lomonosova U (moscow state University imeni 7-.V.Lomonosov) P_R_'-':MNTED: June 24,1957 by P.S. Aleksandrov, Academician SUBI.ITTED: June 21,1957 AIAILADLEt Library of Congress Card 2/2  16(1) MAZE I BOOK EXPEA)ITATION sov/.x-,60 V"sOYuZZnY7 matematicheakly a2yezd. 3rd, Moscow, 1956 Trudy. t. 4z Xretkoye noderzhanlyc acktatonny1ch dokladov. Doklady imostrannykh uchonykh (Trannactionz of the 3rd All-UnIon tic ALL Conference in Moscow. vol. 4; SummarY Of Sectional Reports. Reports of Foreign Scientists) Koo~ow, lzd-vo AN SSSR, lq:~9. 247 p. 2,200 copies printed. Sponsoring AZency; Akademiya nauk ASSR. Hatwizatichookly In.titut. Todh. Rd.s G.M. Shevchanko; Editorial Board: A.A. Abramov, V.G. boltyan3kly, A.R. Vasil-yov, B.V. Nedvadev, A.D. Mychkin, S.K. Mikol-okly (Resp. Ed.), A.G. PostnIkov, Yu. V. Prokhorov. K.A ' ftbrLSkow, P. L. 011yanov, V.A. Uspenskly, X.G. Chotayev, 0. Y.. Shllov, and A.I. Shirshov. PURPOSE. This bobk In Intended for methematiclans and physicists. COVURAM: The book to Volume rV or the Transactions or the Third All- Union Mathematical Conference, held In June and juiy 1956. -no "In. P - a. The first part contains a=- marine of the papers presented by Soviet scientists at the Con- f:renc. that were not included Ln the first two volumna. The .cond part contains the text or reports submitteti to the editor by non %ol tat scientists. In those cases when the non-Soviet act- ontist did not submit a copy or his paper to the editor, the t it 1a of the paper to cited and, ir the paper was printed in a Previous volume , r`e forence is made to the appropriate volume. The papers, both Soviet and non -,Soviet, cover various topics In number theory, algebra, differential and integral equations, function t eary, functional analysis, probability theory, topology, mathematical problems or mechanics And physics, computational mathematIcs, mathematical logic And the fourtestions or mothemattes, and the history of mathematics. _K_-X2_-I0vicb, 7.1- (900cow). Sevt1slaple subgroup& of real MW - - ---------- -_ 10 jhrb~ vcrdlOVsk). Solvable equations of prime ovror~ ~V-A 5 Mukhamnedzhan, Ich. Kft. (SvardlOvsk). On the theory of in- 12 -!qrktn,j~m~(Koscow). Rings as "to with one operation wubjected to a single Identity 13 3ectlm on Differential and Integral Equations 1KAz&n'). Integral equAtIons of Inverse 'boundary value problems 14 Win2j;rx4_2~~Koscow) On the upper bound of characteristic _U01ces In small p*rturbations 14 shik x-r. Roscoe). Solution of boundary value problems roin-elih ~Kl;tr;a In e-rt,l, n-,1-1 14 y  5 16(1),16(2) 05794 AUTHORS: Karpelevich,F.I., Tutubalin,V.N., and Shur,N.G. SOV/52-4-4-5/13 .Limit Theorems for the Compositions of Distributions in the TITLEs Lobachevskiy Plane and Space PERIODICAL: Teoriya, veroyatnostey i yeye 5rimeneniya, 1959, Vol 4, Ur 4, pp 432-436 (USSR ABSTRACT: The authors investigate random variables in the Lobachevskiy space or plane L. The Borel measure is called symmetrical if for every Borel set r and every rotation h around the coordinate origin 0 it holds: 44-(hrl -_,Ac ((I), The composition (r) is defined by Ir),,A,&2(ax), where 9 /WI *)V'2 S,~-, (,Ix- x L is a motion in L which transforms 0 into the point x. Theorem 1: Let ?(vt) be a bounded zonal spherical function (Compare f-R-f 2-7). Then ST(q)'Io., (dx) j'P(9)P'2 (dx), where ~-3(0,x) is the noneurlidean distance Card 1/3 between 0 and x and )'1' P-2 are symmetrical measu-.res.  05794 Limit Theorems for the Compositions of Distributions 3OV/52-4-4-5/13 in the Lobachevskiy Plane and Space Definition: the function f(9) is called 1,1 characteristic function of firs Tind for the finite symmetrical measure /,%,, OlerepVA) -tA. 'X;5(0,X)C-Aj)~ Theorem 2: Let A,--.n be a sequence of symmetrical measures, P-n (L)t!5il; let its characteristic functions converge to f(g), Then "A-n converges weakly to a measure ^tbe characteristic function of which is f(3 ), where /tA~L),,-- 1 ~ Definition: f ~ is called a characteristic function of second kind. -fo Theorem 31 If g n(_q) converges to g(g), if lim h(r,-) - 0 and if c0 h(~)' d~), then the measures,~,r converge weakly 0 0 t 0 Card 2/3  6 05794 Limit Theorems for the Compositions of Distributions SOV/52-4-4-5/13 in the Lobachevskiy Plane and Space Definition: Let the dispersion of ,"^-be D(JA-) -0 f (0) is =f0 It holds DVtl~~2) - D(p~,) + D(/A,2) Theorem 4 treats the convergence of the sequence ~'n,1*A'n,2* ... *P"n , k The authors mention N1 Ye.Gertsenshteyni and V,B.Vasillyev, There are 2 Soviet references. SUBMIT7ED: December 25, 1958 Card 3/3  16(1) AUTHOR: Karpelevich, F.I~ SOV/20-124-6-5/';~ TITLEs Geodesics and Harm-orlic Functions on Symmetric Spaces (Geodezi- cheskiye linii J_ garmonicheskiye funktsii na simmetricheskikh prostranstvakh) PERIODICAL:' Doklady Akadem-4i nauk SSSR,1959,Vol 124,Nr 6,pl; 110.9-1202(USSR)/ ABSTRACT: Let G be a connected semisimple Lie group, K its maximum com- pact subgroup and YZIthe homogeneous space G/K. With respect to the invariant metric Zq is a symmetric Riemannian space with nonnegative curvature. Let the distance ~ 2) between two geodesics ~,, and jf~"2be definei in a natural way. The set of the geodesics, the distance of which from ~, vanishes: JQ,~,)=O is denoted as the zero bundle with the geodesic ~0. Let the sDace 'P of these zero bundles be considered. Let ~p (FO) be the set of the zarr_- bundles f' , for which 9 (1-,,F)