"Penrose Transform on Induced DG/H-Modules and Their Moduli Stacks in the Field Theory"
written by Francisco Bulnes,
published by Advances in Pure Mathematics, Vol.3 No.2, 2013
has been cited by the following article(s):
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[3] Integral Geometry Methods in the Geometrical Langlands Program
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[4] Derived Categories and their Deformed Versions through Integral Geometry Methods II
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[5] INTEGRAL GEOMETRY METHODS ON DERIVED CATEGORIES AND THEIR MODULI STACKS IN THE SPACE-TIME
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[6] Moduli spaces, non-commutative geometry and deformed differential categories
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[7] The Recillas's Conjecture on Szegö Kernels Associated to Harish-Chandra Modules
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[8] Integral geometry methods on deformed categories in field theory II
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[9] Derived Categories in Langlands Geometrical Ramifications: Approaching by Penrose Transforms
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[10] Integral geometry and complex space-time cohomology in field theory
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[11] Framework of Penrose Transforms on DP-Modules to the Electromagnetic Carpet of the Space-Time from the Moduli Stacks Perspective
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[12] INTEGRAL GEOMETRY METHODS ON DEFORMED CATEGORIES TO GEOMETRICAL LANGLANDS RAMIFICATIONS IN FIELD THEORY
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[13] Geometrical Langlands Ramifications and Differential Operators Classification by Coherent D-Modules in Field Theory
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[14] Hermeneutics of the Mathematical Thought: Ordered Adherence of Bosons
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