2023
DOI: 10.1007/s00025-023-01861-2
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Equigeodesics on Generalized Flag Manifolds with Four Isotropy Summands

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Cited by 2 publications
(2 citation statements)
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“…It is important to note that this characterization depends on determining whether a vector is equigeodesic on the corresponding generalized flag manifold. For a comprehensive understanding of equigeodesic vectors on generalized flag manifolds, we refer to [6,17,20,21].…”
Section: Equigeodesics On Riemannian M-spacesmentioning
confidence: 99%
See 1 more Smart Citation
“…It is important to note that this characterization depends on determining whether a vector is equigeodesic on the corresponding generalized flag manifold. For a comprehensive understanding of equigeodesic vectors on generalized flag manifolds, we refer to [6,17,20,21].…”
Section: Equigeodesics On Riemannian M-spacesmentioning
confidence: 99%
“…Several authors have contributed to the realm of equigeodesics within flag manifolds. For instance, in [13], and [21], the authors focus on the study of equigeodesics on generalized flag manifolds with two, and four isotropy summands, respectively, in [17] are investigated equigeodesics on flag manifolds with G 2 -type t-roots, and, in [20], the authors examine the existence and properties of equigeodesics in flag manifolds where the second Betti number b 2 (G/K) = 1. For other homogeneous spaces, it is noteworthy to mention the works of Statha [18], which includes a characterization of algebraic equigeodesics on some homogeneous spaces, such as Stiefel manifolds, generalized Wallach spaces, and some spheres, and Xu and Tan [22], who have extended the concept of homogeneous equigeodesics to the context of homogeneous Finsler spaces, expanding the scope of this field of study.…”
Section: Introductionmentioning
confidence: 99%