|
|
Publications in Math-Net.Ru |
Citations |
|
1996 |
1. |
B. G. Zaslavski, “The attainability set of a positive cone for autonomous
nonnegative linear systems”, Dokl. Akad. Nauk, 346:6 (1996), 746–748 |
|
1990 |
2. |
B. G. Zaslavski, “Positive stabilizability of control processes”, Avtomat. i Telemekh., 1990, no. 3, 16–19 ; Autom. Remote Control, 51:3 (1990), 291–294 |
|
1989 |
3. |
B. G. Zaslavski, “Positive realizability of linear control problems”, Avtomat. i Telemekh., 1989, no. 6, 13–22 ; Autom. Remote Control, 50:6 (1989), 725–732 |
|
1987 |
4. |
B. G. Zaslavski, “Observability of quasimonotone systems”, Avtomat. i Telemekh., 1987, no. 11, 39–46 |
5. |
B. G. Zaslavski, “Controlability of quasimonotone systems in a positive cone”, Avtomat. i Telemekh., 1987, no. 3, 18–26 |
|
1984 |
6. |
B. G. Zaslavski, “Stabilizability and controllability of the reproduction process”, Avtomat. i Telemekh., 1984, no. 5, 71–78 ; Autom. Remote Control, 45:5 (1984), 605–611 |
|
1983 |
7. |
B. G. Zaslavski, “The size dynamics of controlled populations”, Avtomat. i Telemekh., 1983, no. 2, 71–80 ; Autom. Remote Control, 44:2 (1983), 195–203 |
2
|
8. |
B. G. Zaslavski, “Non-negative controls for populations and society-size dynamics”, Dokl. Akad. Nauk SSSR, 269:1 (1983), 43–46 |
|
1982 |
9. |
B. G. Zaslavski, “Investigation of the quasihomoclinic structure generated by a semigroup of operators in a Banach space”, Sibirsk. Mat. Zh., 23:6 (1982), 80–90 ; Siberian Math. J., 23:6 (1982), 825–833 |
2
|
|
1981 |
10. |
B. G. Zaslavski, “Chaos in a population”, Dokl. Akad. Nauk SSSR, 258:3 (1981), 533–536 |
|
1976 |
11. |
B. G. Zaslavski, “Sliding modes of systems for control of cell populations”, Avtomat. i Telemekh., 1976, no. 2, 146–153 ; Autom. Remote Control, 37:2 (1976), 253–260 |
|
1975 |
12. |
B. G. Zaslavskii, “Stability in-the-large of a variable-structure system for control of cell populations”, Avtomat. i Telemekh., 1975, no. 4, 94–101 ; Autom. Remote Control, 36:4 (1975), 607–614 |
|
|
|