Google
×
The affine chain geometry over a group with a partial fibration into subgroups and a certain involution is introduced. This concept generalizes the affine.
The affine chain geometries ~ = ~C(V, 9 v, ~) over the partially fibered vector spaces of 3.2(a)-(c) are weak chain spaces. In case 3.2(5) with W # {0}, the ...
The affine chain geometry over a group with a partial fibration into subgroups and a certain involution is introduced. This concept generalizes the affine trace ...
In this work, geometry of tangential and affine configuration chain complex is proposed in generalized form. Initially tangential and affine configuration chain ...
Comparisons of figures in affine geometry are made with affine transformations, which are mappings that preserve alignment of points and parallelism of lines.
Missing: chain | Show results with:chain
In this work, geometry of tangential and affine configuration chain complex is proposed in generalized form. Initially tangential and affine configuration chain ...
In this work, geometry of tangential and affine configuration chain complex is proposed in generalized form. Initially tangential and affine configuration chain ...
A generalization of an affine transformation is an affine map (or affine homomorphism or affine mapping) between two (potentially different) affine spaces over ...
Missing: chain | Show results with:chain
INTRODUCTION. The theory of affine configuration chain complexes is important for algebraic K-theory and algebraic geometry, first introduced by Suslin [23] ...
People also ask
Geometrically, curves and surfaces are usually considered to be sets of points with some special properties, living in a space consisting of “points.”.
Missing: Generalized chain