Examples of 'b-spline' in a sentence
Meaning of "b-spline"
b-spline (noun): In mathematics and computer graphics, a B-spline is a type of mathematical curve that is used for creating smooth and flexible shapes. It is commonly used in modeling and design applications to represent complex curves and surfaces with a minimal set of control points
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- Abbreviation of basis spline.
How to use "b-spline" in a sentence
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b-spline
In an embodiment, B-Spline interpolation may be used in order to reduce execution time.
Defining points that a B-spline passes through.
B-spline is the Unconstrained city in system weight.
A series of point locations used as a mechanism to control the shape of a B-spline.
For example the iterative b-spline approximation as defined previously is used during the positioning.
Next then, we model the obstacle boundary using B-Spline.
A B-spline is a continuous function at the knots.
These special wavelets are also called B-spline wavelets and cardinal B-spline wavelets.
A B-spline function is generated by summing polynomials of a certain degree.
Extending the B-Spline curve.
A B-spline based approach is first proposed to model the melodic contours.
A curve is designed using control points based on, for example, b-spline cubic polynomials.
Locations that a B-spline must pass through exactly or within a fit tolerance.
The curve is an open B-spline curve.
The B-spline control points are estimated with a non-linear least squares algorithm.
See also
Our approach involves half-transforms, parametrized by a b-spline pyramid, between each image and a common space.
The spacing of B-spline control points defines the local exibility of the non-rigid registration.
In the case of the B-spline curve.
It includes Bézier, B-Spline and Coons tensor product types of surfaces and corresponding curves.
Below, we shall consider that the parametered curve is a B-spline.
A solid B-Spline element has been developed in Altair Radioss.
The general form of a multi-segment B-spline can be written as follows,.
Is a B-spline curve uniquely defined by one set of coefficients?
This tool traces a periodic ( closed ) B-spline curve from its control points.
The command creates a particular type of spline known as a nonuniform rational B-spline (NURBS) curve.
Point locations that a B-spline must pass near, within a fit tolerance.
The second algorithm consists in the generation of feasible, minimum time, non-uniform B-spline trajectories.
Creates a degree 3 (cubic) B-spline by specifying fit points that the spline must pass through.
For nonuniform rational B-spline curve.
Fits a 3D B-spline curve to its control points.
The command creates a type of curve known as a nonuniform rational B-spline (NURBS).
B-Spline curves or spline curve.
Compare Bezier curve and B-spline curve.
The LR B-Spline basis is implemented.
Setting SPLINETYPE to 6 approximates a cubic B-spline.
See also B-spline curve.
Setting SPLINETYPE to 5 approximates a quadratic B-spline.
Quadratic B-spline surface.
B-Spline with multiplicity.
Rational B-spline curve.
Crop Bézier curve adjustment Rectangle, ellipse, Bézier curve and B-spline creation tools.
Rational B-spline surface.
All three definitions converge at large N. The triangular window is the 2nd order B-spline window.
There is yet another more powerful form of B-Spline called Non-Uniform Rational BSpline4 ( NURBS ).
The B-spline basis is non-global.
Closes the b-spline.
Rational B-spline surface, trimmed surface.
Interpolation variants are now Linear, B-Spline and Fake-Sin.
Cubic B-spline surface.
