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KILLING VECTORS IN EMPTY SPACE ALGEBRAICALLY SPECIAL METRICS.I.HELD A.1976; GEN. RELATIV. GRAVITAT.; G.B.; DA. 1976; VOL. 7; NO 2; PP. 177-198; BIBL. 18 REF.Article

FINITE GENERALIZED MOTIONS IN X4, II.ABE S.1974; TENSOR; JAP.; DA. 1974; VOL. 28; NO 3; PP. 293-302; BIBL. 10 REF.Article

KILLING VECTORS IN EMPTY SPACE ALGEBRAICALLY SPECIAL METRICS. II.HELD A.1976; J. MATH. PHYS.; U.S.A.; DA. 1976; VOL. 17; NO 1; PP. 39-45; BIBL. 14 REF.Article

BIMETRIC KILLING VECTORS AND GENERATION LAWS IN BIMETRIC THEORIES OF GRAVITATIONISRAELIT M.1981; GEN. RELATIV. GRAVIT.; ISSN 0001-7701; GBR; DA. 1981; VOL. 13; NO 6; PP. 523-529; BIBL. 6 REF.Article

KILLING VECTOR IN PLANE HH SPACES.FINLEY JD III; PLEBANSKI JF.1978; J. MATH. PHYS.; U.S.A.; DA. 1978; VOL. 19; NO 4; PP. 760-766; BIBL. 14 REF.Article

REMARKS ON CERTAIN SEPARABILITY STRUCTURES AND THEIR APPLICATIONS TO GENERAL RELATIVITYBENENTI S; FRANCAVIGLIA M.1979; GEN. RELATIV. GRAVITAT.; GBR; DA. 1979; VOL. 10; NO 1; PP. 79-92; BIBL. 20 REF.Article

UNIQUENESS OF TIME LIKE KILLING VECTOR FIELDS.IHRIG E; SEN DK.1975; ANN. INST. HENRI POINCARE, A; FR.; DA. 1975; VOL. 23; NO 3; PP. 297-301; BIBL. 2 REF.Article

KILLING VECTOR FIELDS ON COMPLETE RIEMANNIAN MANIFOLDSYOROZU S.1982; PROC. AM. MATH. SOC.; ISSN 0002-9939; USA; DA. 1982; VOL. 84; NO 1; PP. 115-120; BIBL. 5 REF.Article

KILLING VECTORS AND MAXIMAL SLICING IN GENERAL RELATIVITYMURCHADHA N.1980; PHYS. LETT. SECT. A; ISSN 0375-9601; NLD; DA. 1980; VOL. 77; NO 2-3; PP. 103-104; BIBL. 10 REF.Article

NULL INFINITY AND KILLING FIELDSASHTEKAR A; SCHMIDT BG.1980; J. MATH. PHYS.; USA; DA. 1980; VOL. 21; NO 4; PP. 862-867; BIBL. 18 REF.Article

SPACELIKE MOTIONS ADMITTED BY THE MAGNETOFLUID SPACE-TIMESPRASAD G; SINHA BB.1979; NUOVO CIMENTO, B; ITA; DA. 1979; VOL. 52; NO 1; PP. 105-112; ABS. ITA; BIBL. 18 REF.Article

CONTINUOUS GROUPS OF THE KASNER SPACETIMESHARRIS RA; ZUND JD.1982; TENSOR; ISSN 0040-3504; JPN; DA. 1982; VOL. 36; NO 3; PP. 270-274; BIBL. 2 REF.Article

THE FORM OF KILLING VECTORS IN EXPENDING H H SPACESSONNLEITNER SA; FINLEY JD.1982; J. MATH. PHYS. (N. Y.); ISSN 0022-2488; USA; DA. 1982; VOL. 23; NO 1; PP. 116-122; BIBL. 12 REF.Article

THE STRUCTURE OF THE SPACE OF SOLUTIONS OF EINSTEIN'S EQUATIONS. I: ONE KILLING FIELDFISCHER AE; MARSDEN JE; MONCRIEF V et al.1980; ANN. INST. HENRI POINCARE A; ISSN 0020-2339; FRA; DA. 1980; VOL. 33; NO 2; PP. 147-194; BIBL. 2 P.Article

ON HARMONIC AND KILLING VECTOR FIELDS IN A SUBMANIFOLDSHETTY DJ.1980; INDIAN J. PURE APPL. MATH.; ISSN 0019-5588; IND; DA. 1980; VOL. 11; NO 8; PP. 983-987; BIBL. 7 REF.Article

A NOTE ON KILLING VECTORS IN ALGEBRAICALLY SPECIAL VACUUM SPACE-TIMESCATENACCI R; MARZUOLI A; SALMISTRARO F et al.1980; GEN. RELATIV. GRAVIT.; ISSN 0001-7701; GBR; DA. 1980; VOL. 12; NO 7; PP. 575-580; BIBL. 9 REF.Article

CONFORMAL KILLING HORIZONSDYER CC; HONIG E.1979; J. MATH. PHYS.; USA; DA. 1979; VOL. 20; NO 3; PP. 409-412; BIBL. 19 REF.Article

KILLING VECTORS IN GAUGE SUPERSYMMETRYKANNENBERG L.1978; J. MATH. PHYS.; USA; DA. 1978; VOL. 19; NO 10; PP. 2203-2206; BIBL. 15 REF.Article

A CLASS OF TWISTING TYPE II AND TYPE III SOLUTIONS ADMITTING TWO KILLING VECTORSLUN AWC.1978; PHYS. LETTERS, A; NLD; DA. 1978; VOL. 69; NO 2; PP. 79-81; BIBL. 14 REF.Article

ON KILLING VECTORS AND INVARIANCE TRANSFORMATIONS OF THE EINSTEIN-MAXWELL EQUATIONS.WOOLLEY ML.1976; MATH. PROC. CAMBRIDGE PHILOS. SCI.; G.B.; DA. 1976; VOL. 80; NO 2; PP. 357-364; BIBL. 15 REF.Article

Analogues de la forme de Killing et du théorème d'Harish-Chandra pour les groupes quantiques = Killing form and Harish-Chandra analogous for quantum groupsROSSO, M.Annales scientifiques de l'Ecole normale supérieure. 1990, Vol 23, Num 3, pp 445-467, issn 0012-9593, 23 p.Article

FINSLER SPACES PRESERVING KILLING VECTOR FIELDSSINGH UP; JOHN VN; PRASAD BN et al.1979; J. MATH. PHYS. SCI.; IND; DA. 1979; VOL. 13; NO 3; PP. 265-271; BIBL. 6 REF.Article

ON THE NULL EINSTEIN-MAXWELL FIELDS IN GENERAL RELATIVITYAHSAN Z.1981; INDIAN J. PURE APPL. MATH.; ISSN 0019-5588; IND; DA. 1981; VOL. 12; NO 2; PP. 265-269; BIBL. 7 REF.Article

COMPLEX PLANE REPRESENTATION OF THE GEROCH GROUP AND A PROOF OF A GEROCH CONJECTUREHAUSER I.1980; LECT. NOTES PHYS.; ISSN 0075-8450; DEU; DA. 1980; VOL. 135; PP. 424-431; BIBL. 9 REF.Conference Paper

CLASS OF "NONCANONICAL" VACUUM METRICS WITH TWO COMMUTING KILLING VECTORSKUNDU P.1979; PHYS. REV. LETTERS; USA; DA. 1979; VOL. 42; NO 7; PP. 416-417; BIBL. 6 REF.Article

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