"It is considered the asymptotic behaviour of the solutions to the equation $$\\dot x(t)= -c(t)x(t-\\tau),\\quad c(t)> 0,$$ in the nonoscillatory case. There are obtained two-sided (from below and from above) sharp estimates for the pair of subdominant and dominant solutions to the equation." . . . "2000" . "RIV/00216305:26220/00:PU18519" . "CZ - \u010Cesk\u00E1 republika" . . "1"^^ . . "722191" . "Journal of Mathematical Analysis and Application" . "Positive solutions of the equation x'=-c(t)x(t-r) in the critical case."@en . "Positive solutions of the equation x'=-c(t)x(t-r) in the critical case." . "Positive solutions of the equation x'=-c(t)x(t-r) in the critical case."@en . . . . . "1"^^ . . "[A478F590DF20]" . "26220" . . "Positive solutions of the equation x'=-c(t)x(t-r) in the critical case." . "Dibl\u00EDk, Josef" . "Positive solution, critical case."@en . . "P(GA201/96/0410)" . . . "RIV/00216305:26220/00:PU18519!RIV14-GA0-26220___" . "25"^^ . . "250" . "It is considered the asymptotic behaviour of the solutions to the equation $$\\dot x(t)= -c(t)x(t-\\tau),\\quad c(t)> 0,$$ in the nonoscillatory case. There are obtained two-sided (from below and from above) sharp estimates for the pair of subdominant and dominant solutions to the equation."@en . "0022-247X" .