nr |
titel |
auteur |
tijdschrift |
jaar |
jaarg. |
afl. |
pagina('s) |
type |
1 |
Continuity with respect to initial data and absolute-continuity approach to the first-order regularity of nonlinear diffusions on noncompact manifolds
|
Antonyuk, A. Val. |
|
2008 |
60 |
10 |
p. 1509-1527 |
artikel |
2 |
Continuum cardinality of the set of solutions of one class of equations that contain the function of frequency of ternary digits of a number
|
Kotova, O. V. |
|
2008 |
60 |
10 |
p. 1650-1659 |
artikel |
3 |
Differential equations with set-valued solutions
|
Komleva, T. A. |
|
2008 |
60 |
10 |
p. 1540-1556 |
artikel |
4 |
Finite absolute continuity of Gaussian measures on infinite-dimensional spaces
|
Ryabov, G. V. |
|
2008 |
60 |
10 |
p. 1592-1604 |
artikel |
5 |
Global exponential stability of a class of neural networks with unbounded delays
|
Loan, Tran Thi |
|
2008 |
60 |
10 |
p. 1633-1649 |
artikel |
6 |
Inequalities for derivatives of functions in the spaces Lp
|
Kofanov, V. A. |
|
2008 |
60 |
10 |
p. 1557-1573 |
artikel |
7 |
Lattice of normal subgroups of a group of local isometries of the boundary of a spherically homogeneous tree
|
Lavrenyuk, Ya. V. |
|
2008 |
60 |
10 |
p. 1574-1580 |
artikel |
8 |
Local behavior of Q-homeomorphisms in Loewner spaces
|
Salimov, R. R. |
|
2008 |
60 |
10 |
p. 1605-1617 |
artikel |
9 |
On conjugacy in groups of finite-state automorphisms of rooted trees
|
Russev, A. V. |
|
2008 |
60 |
10 |
p. 1581-1591 |
artikel |
10 |
On equiasymptotic stability of solutions of doubly-periodic impulsive systems
|
Ignat’ev, A. O. |
|
2008 |
60 |
10 |
p. 1528-1539 |
artikel |
11 |
On the hill stability of motion in the three-body problem
|
Sosnyts’kyi, S. P. |
|
2008 |
60 |
10 |
p. 1675-1682 |
artikel |
12 |
On the normality of families of space mappings with branching
|
Sevost’yanov, E. A. |
|
2008 |
60 |
10 |
p. 1618-1632 |
artikel |
13 |
Problem with pulse action for a linear stochastic parabolic equation of higher order
|
Perun, H. M. |
|
2008 |
60 |
10 |
p. 1660-1665 |
artikel |
14 |
Solutions of the Kirkwood–Salsburg equation for a lattice classical system of one-dimensional oscillators with positive finite-range many-body interaction potentials
|
Skrypnyk, V. I. |
|
2008 |
60 |
10 |
p. 1666-1674 |
artikel |