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11: Preface
  • Bonita V. Saunders, Visualization Editor, NIST

  • Saunders was responsible for mesh generation for curves and surfaces, data computation and validation, graphics production, and interactive Web visualization. …
    12: About Color Map
    Surface visualizations in the DLMF represent functions of the form z = f ( x , y ) by the height z or the magnitude, | z | , for complex functions, over the x × y plane. …
    13: 4.29 Graphics
    They can be visualized with the aid of equations (4.28.8)–(4.28.13).
    14: About the Project
     Saunders as Visualization Editor, Barry I. …
    15: Staff
  • Bonita V. Saunders, Visualization Editor, NIST

  • 16: 28.7 Analytic Continuation of Eigenvalues
    For a visualization of the first branch point of a 0 ( i q ^ ) and a 2 ( i q ^ ) see Figure 28.7.1. …
    17: 4.15 Graphics
    The corresponding surfaces for arccos ( x + i y ) , arccot ( x + i y ) , arcsec ( x + i y ) can be visualized from Figures 4.15.9, 4.15.11, 4.15.13 with the aid of equations (4.23.16)–(4.23.18).
    18: 28.33 Physical Applications
    For a visualization see Gutiérrez-Vega et al. (2003), and for references to other boundary-value problems see: …
    19: DLMF Project News
    error generating summary
    20: Bibliography G
  • J. C. Gutiérrez-Vega, R. M. Rodríguez-Dagnino, M. A. Meneses-Nava, and S. Chávez-Cerda (2003) Mathieu functions, a visual approach. Amer. J. Phys. 71 (3), pp. 233–242.