Construct a Massive Dirac Operator with a Number of Eigenvalues in a Continuous Spectrum

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dc.creatorG’ulomovich, Rashidov Sardor
dc.creatorAtaxanovna, Yuldashova Hilola
dc.date2021-08-28
dc.date.accessioned2023-08-21T07:22:22Z
dc.date.available2023-08-21T07:22:22Z
dc.descriptionA massive Dirac operator with a number of eigenvalues is constructed in the continuous spectrum, and sufficient conditions are found for this operator to belong to the space of coefficients. The dependence of the eigenvalues  of the mass Dirac operator on the continuous spectrum on the general boundary conditions is studied. for the following Dirac operator, which is self-contained in the space of vector functions      in the case of   ,   . the Weil – Titchmarch function, which satisfies the initial conditions, is defined as a single value.  The coefficients  of the operator are as follows   Found using the Gelfand-Levitan integral equation.en-US
dc.formatapplication/pdf
dc.identifierhttps://globalresearchnetwork.us/index.php/ajshr/article/view/525
dc.identifier.urihttp://dspace.umsida.ac.id/handle/123456789/9624
dc.languageeng
dc.publisher"GLOBAL RESEARCH NETWORK" LLCen-US
dc.relationhttps://globalresearchnetwork.us/index.php/ajshr/article/view/525/444
dc.rightsCopyright (c) 2021 American Journal of Social and Humanitarian Researchen-US
dc.sourceAmerican Journal of Social and Humanitarian Research; Vol. 2 No. 6 (2021): AJSHR; 82-92en-US
dc.source2690-9626
dc.subjectDirac operatoren-US
dc.subjectoperator spectrumen-US
dc.subjectdiscrete spectrumen-US
dc.subjectcontinuous spectrumen-US
dc.subjectWeil – Titchmarch functionen-US
dc.subjectGelfand-Levitan integral equationen-US
dc.subjectmatrix functionen-US
dc.subjectHeveside functionen-US
dc.titleConstruct a Massive Dirac Operator with a Number of Eigenvalues in a Continuous Spectrumen-US
dc.typeinfo:eu-repo/semantics/article
dc.typeinfo:eu-repo/semantics/publishedVersion
dc.typePeer-reviewed Articleen-US
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