Rotation-invariant of Quantum Gross Laplacian

Samah Horrigue; Habib Ouerdiane

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Rotation-invariant of Quantum Gross Laplacian

Journal article

Peer reviewed

Rotation-invariant of Quantum Gross Laplacian

Samah Horrigue and Habib Ouerdiane

Reconsideration of Foundations-5, Vol.1232, pp.288-293

18/06/2009

Abstract

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In this paper, we prove that the quantum Gross Laplacian denoted Delta (QG) is a rotation-invariant operator. For this purpose, we use the Schwartz-Grothendieck kernel theorem and the characterization theorem of rotation-invariant distributions and operators.

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Title: Rotation-invariant of Quantum Gross Laplacian
Creators - without role: Samah Horrigue
Habib Ouerdiane
Contributors - without role: Andrei Khrennikov
Publication Details: Reconsideration of Foundations-5, Vol.1232, pp.288-293
Identifiers: 9933220308331
Academic Unit: University of Jeddah
Language: English
Resource Type: Journal article