On a class of differential operators with constant coefficients

A linear differential operator P(D) = P(D ₁, …, D _n ) with constant coefficients is called almost hypoelliptic if all the derivatives D ^α P of the characteristic polynomial P(ξ ₁, …, ξ _n ) can be estimated by P. The paper proves that if P is an almost hypoelliptic operator and f is an infinitely differentiable function, square-summable with a definite exponential weight, then any square summable with the same weight solution u of the equation P(D)u = f is again an infinitely differentiable function and P(ξ) → ∞ as ξ → ∞.     

Algorithms for computing Minkowski operators and their application in differential games

The Minkowski operators are considered, which extend the concepts of the Minkowski sum and difference to the case where one of the summands depends on an element of the other term. The properties of these operators are examined. Convolution methods of computer geometry and algorithms for computing the values of the Minkowski operators are developed. These algorithms are used to construct epsilon-optimal control strategies in a nonlinear differential game with a nonconvex target set. The errors of the proposed algorithms are estimated in detail. Numerical results for the conflicting control of a nonlinear pendulum are presented.     

On a class of exponential-type operators and their limit semigroups

The paper is mainly focused upon the study of a class of second order degenerate elliptic operators on unbounded intervals.We show that these operators generate strongly continuous semigroups in suitable weighted spaces of continuous functions.Furthermore, we represent the semigroups as limits of iterates of the so-called exponential-type operators.In a particular case, starting from the stochastic differential equations associated with these operators, we also find an integral representation of the semigroup and determine its asymptotic behaviour.     

Completeness of eigenfunctions of one class of pencils of differential operators with constant coefficients

In spaces of functions square summable on finite intervals we study the simple completeness of the system of eigen- and associated functions for the pencil of ordinary differential operators generated by a differential expression with constant coefficients (we assume that the roots of the corresponding characteristic equation lie on one and the same ray) and specific semisplitting homogeneous boundary value conditions.     

On the spectrum of a class of differential operators and embedding theorems

The author considers the embedding problem of weighted Sobolev spacesH _p ⁿ in weightedL _s spacesL _s,r , and some sufficient conditions and necessary conditions are given, when weight functions satisfy certain conditions. The author uses the results obtained to the qualitative analysis of the spectrum of 2n-order weighted differential operator, and gives some sufficient conditions and necessary conditions to ensure that the spectrum is discrete. Supported by the National Natural Science Fundation of China and the Natural Science Foundation of Inner Mongolia.     

On the deficiency index of a certain class of differential operators

This paper studies problems on the behavior of solutions for a certain class of differential equations of the form l _n y = λy as x → +0, where l _n is a scalar, formally self-adjoint, quasidifferential expression of an arbitrary order with complex coefficients. The results obtained allow us to find the defficiency index of the operator generated by the expression l _n . __________ Translated from Sovremennaya Matematika i Ee Prilozheniya (Contemporary Mathematics and Its Applications), Vol. 36, Suzdal Conference-2004, Part 2, 2005.     

On a class of fractional non-selfadjoint operators associated with differential equations

We present a research method for non-selfadjoint integral operators associated with fractional differential equations. With the help of this method we, in particular, estimate eigen-functions and eigenvalues of the boundary-value problem for a fractional oscillatory equation.     

Rational differential operators and their kernels

A linear differential/integral operator is associated to a rational matrix in a natural way, and the behavior is defined to be the kernel of this operator. Conditions under which two rational matrices have the same behavior are derived.     

On integral representation of functions determined by one class of pseudodifferential operators

Translated fromSibirskii Matematicheskii Zhurnal, Vol. 36, No. 5, pp. 1179–1193, September–October, 1995.     

On a class of second order partial differential operators of non-principal type

Acta Mathematica Sinica, English Series -     

Shimura invariant differential operators and their eigenvalues

Let be the covariant Cauchy-Riemann operator and the covariant holomorphic differential operator on a line bundle over a Hermitian symmetric space . We study the Shimura invariant differential operators defined via and . We find the eigenvalues of a family of the Shimura operators and of the generators. Received October 2, 1999 / Published online October 30, 2000     

On discreteness of the spectrum of a class of mixed-type singular differential operators

In this paper, the conditions are found on the coefficients that ensure the existence of the resolvent and the discreteness of spectrum for a class of singular differential operators.     

Traces for a class of singular differential operators

In the space L₂[0, ) we consider the operator generated by the expression