Submanifold Differential Operators in D-Module Theory I : Schr\"odinger Operators

Abstract

For this quarter of century, differential operators in a lower dimensional submanifold embedded or immersed in real n-dimensional euclidean space n have been studied as quantum mechanical models, which are realized as restriction of the operators in n to the submanifold. For this decade, the Dirac operators in the submanifold have been investigated in such a scheme , which are identified with operators of the Frenet-Serret relation for a space curve case and of the generalized Weierstrass relation for a conformal surface case. These Dirac operators are concerned well in the differential geometry, since they completely represent the submanifolds. In this and a future series of articles, we will give mathematical construction of the differential operators on a submanifold in n in terms of -module theory and rewrite recent results of the Dirac operators mathematically. In this article, we will formulate Schr\"odinger operators in a low-dimensional submanifold in n.

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