Publication data of Strobl, Thomas: Link to Inspire

Created with Highcharts 9.0.1CitationsCitationsw/o self-citaionself-citaion1995200020052010201520202025050010001500200025003000
Created with Highcharts 9.0.1Publicationspublications per yearPublicationsPublications per yearCumulative publications19952000200520102015202020250153045607501.22.43.64.86
Created with Highcharts 9.0.1h-indexh-indexh-indexh-index w/o self-citaion1995200020052010201520202025051015202530
Created with Highcharts 9.0.1CitationsBreakdown of Most Cited PapersrestDiffeomorphisms versus nonAbelian gauge transformations: An Example of (1+1)-dimensional gravityDiffeomorphisms versus nonAbelian gauge transformations: An Example of (…Generalizing Geometry - Algebroids and Sigma ModelsA Brief introduction to Poisson sigma modelsAlgebroid Yang-Mills theoriesDirac sigma modelsThe Topological G/G WZW model in the generalized momentum representationGeneral Yang–Mills type gauge theories for $p$-form gauge fields: From physics-based ideas to a mathematical framework or From Bianchi identities to twisted Courant algebroidsGeneral Yang–Mills type gauge theories for $p$-form gauge fields: From physi…Canonical quantization of nonEinsteinian gravity and the problem of timeCharacteristic classes associated to Q-bundlesLie algebroid morphisms, Poisson sigma models, and off-shell closed gauge symmetriesLie algebroid morphisms, Poisson sigma models, and off-shell closed gauge s…Poisson sigma models: A Generalization of 2-d gravity Yang-Mills systemsGravity in two space-time dimensionsDirac quantization of gravity Yang-Mills systems in (1+1)-dimensionsClassical and quantum gravity in (1+1)-dimensions. 3: Solutions of arbitrary topologyClassical and quantum gravity in (1+1)-dimensions. 3: Solutions of arbitrary …WZW - Poisson manifoldsCurrent algebras and differential geometryClassical and quantum gravity in (1+1)-dimensions. Part 2: The Universal coveringsClassical and quantum gravity in (1+1)-dimensions. Part 2: The Universal cov…Classical and quantum gravity in (1+1)-Dimensions. Part 1: A Unifying approachClassical and quantum gravity in (1+1)-Dimensions. Part 1: A Unifying appro…Poisson structure induced (topological) field theories199520002005201020152020202505001000150020002500
Created with Highcharts 9.0.1Fraction [%]Breakdown of Most Cited Papers (Fraction)Diffeomorphisms versus nonAbelian gauge transformations: An Example of (1+1)-dimensional gravityDiffeomorphisms versus nonAbelian gauge transformations: An Example of (…Generalizing Geometry - Algebroids and Sigma ModelsA Brief introduction to Poisson sigma modelsAlgebroid Yang-Mills theoriesDirac sigma modelsThe Topological G/G WZW model in the generalized momentum representationGeneral Yang–Mills type gauge theories for $p$-form gauge fields: From physics-based ideas to a mathematical framework or From Bianchi identities to twisted Courant algebroidsGeneral Yang–Mills type gauge theories for $p$-form gauge fields: From physi…Canonical quantization of nonEinsteinian gravity and the problem of timeCharacteristic classes associated to Q-bundlesLie algebroid morphisms, Poisson sigma models, and off-shell closed gauge symmetriesLie algebroid morphisms, Poisson sigma models, and off-shell closed gauge s…Poisson sigma models: A Generalization of 2-d gravity Yang-Mills systemsGravity in two space-time dimensionsDirac quantization of gravity Yang-Mills systems in (1+1)-dimensionsClassical and quantum gravity in (1+1)-dimensions. 3: Solutions of arbitrary topologyClassical and quantum gravity in (1+1)-dimensions. 3: Solutions of arbitrary …WZW - Poisson manifoldsCurrent algebras and differential geometryClassical and quantum gravity in (1+1)-dimensions. Part 2: The Universal coveringsClassical and quantum gravity in (1+1)-dimensions. Part 2: The Universal cov…Classical and quantum gravity in (1+1)-Dimensions. Part 1: A Unifying approachClassical and quantum gravity in (1+1)-Dimensions. Part 1: A Unifying appro…Poisson structure induced (topological) field theories19952000200520102015202020250255075100
Created with Highcharts 9.0.1Citations/1 YearCitations/PeriodCitations / 1 YearMoving average19952000200520102015202020250255075100125150175