Invariant subspaces with zero density spectrum

IF 0.5 Q3 MATHEMATICS Ufa Mathematical Journal Pub Date : 2017-01-01 DOI:10.13108/2017-9-3-100
O. Krivosheeva
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引用次数: 1

Abstract

. In the paper we show that each analytic solution of a homogeneous convolution equation with the characteristic function of minimal exponential type is represented by a series of exponential polynomials in its domain. This series converges absolutely and uniformly on compact subsets in this domain. It is known that if the characteristic function is of minimal exponential type, the density of its zero set is equal to zero. This is why in the work we consider the sequences of exponents having zero density. We provide a simple description of the space of the coefficients for the aforementioned series. Moreover, we provide a complete description of all possible system of functions constructed by rather small groups, for which the representation by the series of exponential polynomials holds.
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具有零密度谱的不变子空间
. 本文证明了具有最小指数型特征函数的齐次卷积方程的每一个解析解在其定义域内用一系列指数多项式表示。这个级数在这个域中的紧子集上绝对一致收敛。已知,如果特征函数是最小指数型,则其零集的密度等于零。这就是为什么在工作中我们考虑具有零密度的指数序列。我们对上述级数的系数空间提供了一个简单的描述。此外,我们提供了由相当小的群构成的所有可能的函数系统的完整描述,对于这些系统,指数多项式级数的表示是成立的。
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