SCIENTIFIC ABSTRACT LEVIN, A.YU. - LEVIN, B.I.

2 1 "! 9 8/020/61/14i/oo6/ool/021 The stability of solutions of second ... CIII/C333 q(t) is of constant sign also necessary that t 00 t dt. q(s) lexp p (-C ) dT) ) do - co (12) is satisfied. Assume that the coefficients of (7) satisfy the conditions 0 - 0 . (10) Let x(t) be an oscillating solution of (7). Let t n and t n+1 be neighboring maximum points of the absolute value. Then Cos I < 2 ch ys e7 (' + Cos 71 t# v& th -Y, I > 2 Card 4/7  32419 3/020/61/14!/006/001/021 The stability of solutions of second ... C111/C333 Here it holdst 1/2 FM-- cos Y, - Y (0 -e- -15 1/2 4m - coo Y2 (01' 12'- 2 for 1 4 2 Vm ; 1/2 rm a oh ~2 for 1>24-m Let %P (1, m, M) - 0 for 1 >,- Am ; tp (1, m, M) - (P (1, m, M) for 1 < 2 JI . Theorem 4: Assume that the coefficients of (7) satisfy the conditions (10), where Y (1, M, M) (14) Then all solutions of (7) together with their derivatives are bounded on (to, OD),. Theorem 5: Assume that the coefficients of (7) satisfy the conditions (10) and OD t t dt exp p dr ds - co Card 5/1~  1124i'31 S102 61/141/006/001/021 The stability of solutions of second - C!11YC333 where kf (1, M, M) _:c 1 (15) Then all solutions of (7) together with their derivatives tend to zero for t ---)oo. Let h be the root of the equation 1n h 4-0-1 - 2 arc sin 71- - 0 2 r Theorem 6s Let the coefficients of (7) satisfy the conditions 0 1--- q ( t ) .6, MpQ 0, where 2 M 0 for t> 0, F xij(t)> 0 for t> 0. A sequence of functions xi(t) satisfies the inequalities x i(t)< m&xtx,(t,)Ix,(t2)1 for 11ird 1/2  S/208/62/002/005/007/009 Stabilization of solutions to ... B112/BI02 t1< t