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Geodesics in the space of $m$-subharmonic functions with bounded energy
Abstract: We raise our cups to Urban Cegrell, gone but not forgotten, gone but ever here.Until we meet again in Valhalla!Abstract. With inspiration from the Kähler geometry, we introduce a metric structure on the energy class, E 1,m , of m-subharmonic functions with bounded energy and show that it is complete. After studying how the metric convergence relates to the accepted convergences in this Caffarelli-Nirenberg-Spruck model, we end by constructing geodesics in a subspace of our complete metric space.
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2023
2023
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“…Cegrell's energy classes can be considered for m-subharmonic functions on domains of C n , 1 ≤ m < n [60,61]. Geodesics for such functions, including the linearity of the corresponding energy functional, were studied in [62].…”
Section: Corollarymentioning
confidence: 99%
“…Cegrell's energy classes can be considered for m-subharmonic functions on domains of C n , 1 ≤ m < n [60,61]. Geodesics for such functions, including the linearity of the corresponding energy functional, were studied in [62].…”
Section: Corollarymentioning
confidence: 99%
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