Domingos Djinja, Sergei Silvestrov, Alex Behakanira Tumwesigye
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引用次数: 0
摘要
在这项工作中,我们提出了通过线性积分算子在巴拿赫空间 \(L_p\)中构建多项式协方差型换向关系 \(AB=BF(A)\)的方法。我们推导了积分算子满足一般多项式 F 的协方差型换向关系的核函数的必要条件和充分条件,以及当 F 是任意仿射或二次多项式或任意度数的单项式时的重要情况。利用得到的核的一般条件,我们通过 \(L_p\) 上的积分算子构造了协方差型换向关系的具体表示例证。同时,我们还从核函数的角度推导出了代表协方差型换向关系的积分算子的有用的一般重排序公式。
Linear integral operators on \(L_p\) spaces representing polynomial covariance type commutation relations
In this work, we present methods for constructing representations of polynomial covariance type commutation relations \(AB=BF(A)\) by linear integral operators in Banach spaces \(L_p\). We derive necessary and sufficient conditions on the kernel functions for the integral operators to satisfy the covariance type commutation relation for general polynomials F, as well as for important cases, when F is arbitrary affine or quadratic polynomial, or arbitrary monomial of any degree. Using the obtained general conditions on the kernels, we construct concrete examples of representations of the covariance type commutation relations by integral operators on \(L_p\). Also, we derive useful general reordering formulas for the integral operators representing the covariance type commutation relations, in terms of the kernel functions.