Add to ORKGIn this paper the eigenvalues of the periodic and the semi-periodic boundary value problems associated with Hill's equation are investigated in the case of piecewise constant coefficient. As a corollary the asymptotic formula for the lengths of the instability intervals of Hill's equation is derived and it is shown that they increase beyond all bounds. Also, the conditions for coexistence of periodic and semi-periodic solutions are indicated. © TÜBİTAK
AbstractWe prove new results on the oscillation and nonoscillation of the Hill's equation with perio...
This paper deals with large scale aspects of Hill's equation (sic) + (a + bp(t)) x = 0, where p is p...
The Hill's equations-even in the linear original version are a describer of phenomenon having chaoti...
In this paper, we obtain asymptotic formulas for eigenvalues of the periodic and the semiperiodic bo...
WOS: 000189226600014In this paper, we obtain asymptotic formulas for eigenvalues of the periodic and...
AbstractIn this paper, we obtain asymptotic formulas for eigenvalues of the periodic and the semiper...
In this paper, some estimates are derived explicitly for periodic and semiperiodic eigenvalues of Hi...
We research the asymptotic formula for the lengths of the instability intervals of the Hill's equati...
We research the asymptotic formula for the lengths of the instability intervals of the Hill’s equati...
This work concerns the existence of almost periodic solutions for certain differential equations w...
Abstract. There are 17 theorems on characteristics of periodical solutions of the Hill's equati...
AbstractWe revisit the old problem of finding the stability and instability intervals of a second-or...
AbstractHill's equation is studied for a particular class of periodic functions, which covers a broa...
A second-order linear differential equation with continuous periodic coefficients is solved exactly ...
We estimate the small periodic and semiperiodic eigenvalues of Hill's operator with sufficiently dif...
AbstractWe prove new results on the oscillation and nonoscillation of the Hill's equation with perio...
This paper deals with large scale aspects of Hill's equation (sic) + (a + bp(t)) x = 0, where p is p...
The Hill's equations-even in the linear original version are a describer of phenomenon having chaoti...
In this paper, we obtain asymptotic formulas for eigenvalues of the periodic and the semiperiodic bo...
WOS: 000189226600014In this paper, we obtain asymptotic formulas for eigenvalues of the periodic and...
AbstractIn this paper, we obtain asymptotic formulas for eigenvalues of the periodic and the semiper...
In this paper, some estimates are derived explicitly for periodic and semiperiodic eigenvalues of Hi...
We research the asymptotic formula for the lengths of the instability intervals of the Hill's equati...
We research the asymptotic formula for the lengths of the instability intervals of the Hill’s equati...
This work concerns the existence of almost periodic solutions for certain differential equations w...
Abstract. There are 17 theorems on characteristics of periodical solutions of the Hill's equati...
AbstractWe revisit the old problem of finding the stability and instability intervals of a second-or...
AbstractHill's equation is studied for a particular class of periodic functions, which covers a broa...
A second-order linear differential equation with continuous periodic coefficients is solved exactly ...
We estimate the small periodic and semiperiodic eigenvalues of Hill's operator with sufficiently dif...
AbstractWe prove new results on the oscillation and nonoscillation of the Hill's equation with perio...
This paper deals with large scale aspects of Hill's equation (sic) + (a + bp(t)) x = 0, where p is p...
The Hill's equations-even in the linear original version are a describer of phenomenon having chaoti...