Asymmetric Tensor Field Visualization for Surfaces

Abstract: Asymmetric tensor field visualization can provide important insight into fluid flows and solid deformations. Existing techniques for asymmetric tensor fields focus on the analysis, and simply use evenly-spaced hyperstreamlines on surfaces following eigenvectors and dual-eigenvectors in the tensor field. In this paper, we describe a hybrid visualization technique in which hyperstreamlines and elliptical glyphs are used in real and complex domains, respectively. This enables a more faithful representation of flo… Show more

“…For a more systematic study of 2D asymmetric tensor fields, Zhang et al [35] introduce the notions of eigenvalue manifold and eigenvector manifold. These notions are applied to visualize asymmetric tensor fields using a combination of glyphs and hyperstreamlines [26]. Recent research on asymmetric tensor fields has focused on the design of proper glyphs [1,12,28].…”

“…The former corresponds to cases where the pure shear component in the tensor is stronger than that of the rotation, while the latter is the reverse. Such a distinction is important for fluid dynamics [26,35,37]. In addition, Zhang et al [35] point out that regardless of whether having real-or complex-valued eigenvalues, it is important to differentiate tensors corresponding to counterclockwise (CCW) rotations from those corresponding to clockwise (CW) rotations.…”

“…Asymmetric tensor fields have found a wide range of applications such as fluid mechanics [26,35,36]. In these applications, a vector field plays a critical role, such as the velocity vector field of a fluid flow and the displacement vector field of an object undergoing deformation.…”

“…In these applications, a vector field plays a critical role, such as the velocity vector field of a fluid flow and the displacement vector field of an object undergoing deformation. While direct vector field visualization techniques such as glyphs [17], streamlines [19], and vector field topology [16] can provide much insight into the vector field, the gradient tensor of the vector field (an asymmetric tensor field) can provide important and complementary information [26,35].…”

“…Existing research on asymmetric tensor fields focuses on the visualization aspect [26,35], such as finding proper glyph representations [2,27] to show local eigenvalue and eigenvector variations in the tensor field. There has been relatively little attention given to the topological structures in the asymmetric tensor field.…”

Multi-Scale Topological Analysis of Asymmetric Tensor Fields on Surfaces

“…For a more systematic study of 2D asymmetric tensor fields, Zhang et al [35] introduce the notions of eigenvalue manifold and eigenvector manifold. These notions are applied to visualize asymmetric tensor fields using a combination of glyphs and hyperstreamlines [26]. Recent research on asymmetric tensor fields has focused on the design of proper glyphs [1,12,28].…”

“…The former corresponds to cases where the pure shear component in the tensor is stronger than that of the rotation, while the latter is the reverse. Such a distinction is important for fluid dynamics [26,35,37]. In addition, Zhang et al [35] point out that regardless of whether having real-or complex-valued eigenvalues, it is important to differentiate tensors corresponding to counterclockwise (CCW) rotations from those corresponding to clockwise (CW) rotations.…”

“…Asymmetric tensor fields have found a wide range of applications such as fluid mechanics [26,35,36]. In these applications, a vector field plays a critical role, such as the velocity vector field of a fluid flow and the displacement vector field of an object undergoing deformation.…”

“…In these applications, a vector field plays a critical role, such as the velocity vector field of a fluid flow and the displacement vector field of an object undergoing deformation. While direct vector field visualization techniques such as glyphs [17], streamlines [19], and vector field topology [16] can provide much insight into the vector field, the gradient tensor of the vector field (an asymmetric tensor field) can provide important and complementary information [26,35].…”

“…Existing research on asymmetric tensor fields focuses on the visualization aspect [26,35], such as finding proper glyph representations [2,27] to show local eigenvalue and eigenvector variations in the tensor field. There has been relatively little attention given to the topological structures in the asymmetric tensor field.…”

Multi-Scale Topological Analysis of Asymmetric Tensor Fields on Surfaces

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