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Quadric Surfaces01:28

Quadric Surfaces

Quadric surfaces are three-dimensional surfaces characterized by second-degree equations in the variables x, y, and z. These surfaces are smooth and continuous, and specific combinations of squared and linear terms define their shapes. The main types of quadric surfaces include ellipsoids, cones, paraboloids, and hyperboloids. Each type exhibits distinct geometric features depending on how the variables are arranged and related within the equation.Ellipsoids are closed surfaces formed when all...
Areas Within Irregular Boundaries01:26

Areas Within Irregular Boundaries

Calculating areas within irregular boundaries, such as along rivers or curved roads, is crucial in various fields, including surveying, engineering, and environmental management. Surveyors often begin by creating a traverse, a connected series of straight lines approximating the area's boundary. The coordinates of each traverse point are essential for calculating the enclosed area. The double meridian distance formula is a widely used technique for this purpose. This method utilizes the...
Design Example: Traverse Angle Computations01:25

Design Example: Traverse Angle Computations

Traverse angle computations are a critical component of surveying, used to compute the internal angles within a closed traverse. A traverse consists of a series of connected lines forming a closed loop, often used for land boundary delineation or mapping. Calculating the internal angles ensures accuracy in the traverse geometry and is essential for checking survey data integrity.The process begins with known azimuths and bearings of the traverse sides. Internal angles at each vertex are...
Extended Versions of Green’s Theorem01:27

Extended Versions of Green’s Theorem

Green’s Theorem connects the circulation of a vector field around a closed curve with the behavior of the field across the region enclosed by that curve. It provides a way to replace a line integral around a boundary with a double integral over the interior region, making it especially useful in plane geometry, fluid flow, and vector calculus.Although Green’s Theorem is often introduced using simple regions without gaps, it can also be applied to regions made from several simple parts. This...
Latitudes and Departures01:27

Latitudes and Departures

Latitudes and departures are essential concepts in surveying, providing a systematic way to analyze the projections of traverse lines. These projections allow surveyors to interpret a line's north-south and east-west components, which are crucial for precisely calculating areas, bearings, and lengths. Latitude is the north-south projection of a line, calculated as the product of the line's length and the cosine of its bearing. Departure, conversely, is the east-west projection obtained by...
Tangent Planes to Surfaces01:19

Tangent Planes to Surfaces

In multivariable calculus, the concept of a tangent plane plays a central role in approximating curved surfaces. When dealing with a surface defined by a function of two variables, such as z = f(x, y), the tangent plane at a given point provides the best linear approximation to the surface near that point. This local linearization allows complex, nonlinear geometries to be treated using simpler, planar models.The construction of the tangent plane involves taking vertical slices of the surface...

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Related Experiment Video

Updated: Jul 7, 2026

Determination of Aggregate Surface Morphology at the Interfacial Transition Zone (ITZ)
08:59

Determination of Aggregate Surface Morphology at the Interfacial Transition Zone (ITZ)

Published on: December 16, 2019

Border and surface tracing--theoretical foundations.

Valentin E Brimkov1, Reinhard Klette

  • 1Mathematics Department, Buffalo State College, 1300 Elmwood Avenue, Buffalo, NY 14222, USA. brimkove@buffalostate.edu

IEEE Transactions on Pattern Analysis and Machine Intelligence
|February 16, 2008
PubMed
Summary

This study introduces digital manifolds, offering a graph-based dimension theory for digital curves and hypersurfaces. This provides a theoretical foundation for image analysis tasks like curve and surface tracing.

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Area of Science:

  • Digital Topology
  • Computer Vision
  • Graph Theory

Background:

  • Traditional topology defines curves and hypersurfaces in continuous spaces.
  • Digital image analysis often requires discrete analogs for geometric structures.
  • Existing methods for dimension in digital spaces lack a unified graph-theoretical foundation.

Purpose of the Study:

  • To define and investigate digital manifolds of arbitrary dimensions.
  • To establish a general theoretical basis for curve and surface tracing in digital images.
  • To introduce a graph-theoretical approach to digital dimension.

Main Methods:

  • Defining digital manifolds based on adjacency relations.
  • Analyzing properties like one-dimensionality of digital curves and (n-1)-dimensionality of digital hypersurfaces.
  • Utilizing graph-theoretical concepts to define dimension in digital spaces.

Main Results:

  • Established discrete analogs of topological notions for digital curves and hypersurfaces.
  • Presented the first graph-theoretical definition of dimension for digital manifolds.
  • Demonstrated that digital curves are one-dimensional and digital hypersurfaces are (n-1)-dimensional in n-dimensional digital space.
  • Proposed a uniform approach for studying good pairs and classified them in arbitrary dimensions.

Conclusions:

  • The proposed graph-theoretical framework provides a robust foundation for digital topology and image analysis.
  • The results offer a novel perspective on understanding dimensionality in discrete spaces.
  • The study lays the groundwork for advanced applications in picture analysis and related fields.