Namespaces
Variants
Actions

Lacunary space

From Encyclopedia of Mathematics
Jump to: navigation, search

A space with an affine connection or a Riemannian space of some definite "degree of mobility of a space with an affine connectiondegree of mobility" . A lacunary space is defined by the order of the complete group of motions, that is, by the largest number of parameters of that group for the given space. Thus, ordinary $n$-dimensional affine space admits a group of motions of maximal order $n^2+n$.

<tbody> </tbody>
$A_2$ $A_3$ $A_n$ Types of spaces and lacunae
$6$ $12$ $n^2+n$ Spaces of first lacunarity
First lacuna
$4$ $9$ $n^2$ Spaces of second lacunarity
$.$ $.$
$.$ $.$
$1$ $1$ $n^2-1$
Second lacuna
$n^2-n+1$ Spaces of third lacunarity
$.$
$n^2-n-2$
Third lacuna
$n^2-2n+5$ Spaces of fourth lacunarity
$.$
$.$ $.$
$3$ $.$
$2$ $.$
$1$ $.$

The orders of the complete groups of motions of other spaces with an affine connection belong to the interval of natural numbers $[1,n^2+n]$, but not every number of this interval can be the order of a complete group of motions. Intervals of greatest length composed of numbers that are not the order of a complete group of motions are called lacunae, and the complements of them with respect to the given interval are called intervals of condensation. A space is called a space of $k$-th lacunarity if the order of its complete group of motions belongs to the interval of condensation having number $k$. The calculation is carried out with an interval of condensation containing the maximal order. For the well-known distribution of the number of motions of "rigid" bodies in spaces with an affine connection see Table 1. It deals with the orders of complete groups of motions — synonyms for the degree of mobility or the degree of freedom of rigid bodies. The question of determining the possible degrees of mobility of rigid and similarly varying bodies in Riemannian spaces has been partly solved for spaces with a metric of fixed sign only. In the general case the degrees of mobility and the Riemannian spaces realizing them that are known are exhibited in Table 2.

<tbody> </tbody>
$V_2$ $V_3$ $V_4$ $V_5$ $V_n$ Types of spaces and lacunae
$3$ $6$ $10$ $15$ $\frac{n(n+1)}{2}$ Spaces of first lacunarity (constant curvature)
First lacuna
$4$ $8$ $11$ $\frac{n(n-1)}{2}+1$ Spaces of second lacunarity
$.$ $.$ $.$
$1$ $.$ $.$ $.$
$.$ $.$ $.$
$1$ $1$ $1$ $\frac{n(n-1)}{2}$
Second lacuna
$\frac{(n-1)(n-2)}{2}+5$ Spaces of third lacunarity
$.$
$.$
$.$ $.$
$3$ $.$
$2$ $.$
$1$ $.$

References

[1] I.P. Egorov, "Motions in generalized differential-geometric spaces" Progress in Math. , 6 (1970) pp. 171–228 Itogi Nauk. Algebra Topol. Geom. 1965 (1967) pp. 375–428
[2] I.P. Egorov, "Automorphisms in generalized spaces" J. Soviet Math. , 14 (1980) pp. 1260–1287 Itogi Nauk. i Tekhn. Probl. Geom. , 10 (1978) pp. 147–191
[3] I.P. Egorov, "Geometry" , Moscow (1979) (In Russian)

Comments

The Riemannian manifolds of dimension $n$ with group of isometries of (the maximal) dimension $n(n+2)/2$ are the $n$-dimensional Euclidean space, the $n$-dimensional sphere $S^n$, the $n$-dimensional real projective space $\mathbb{P}_n(\RR)$, and an $n$-dimensional simply-connected hyperbolic space. For a list of Riemannian manifolds of dimension $n > 4$ with a "degree of mobility" at least $1+n(n-1)/2$, and the corresponding groups cf. [a1], p. 54. At the other end of the scale there is, for example, the theorem of Bochner, [a4], that if $M$ is a compact Riemannian manifold with negative Ricci tensor, then its group of isometries is finite. Let $M$ be a manifold of dimension $n$. For each Riemannian metric $ds^2$ let $G(M, ds^2)$ be the group of isometries of $(M, ds^2)$. The degree of symmetry of $M$ is the maximum of the $\dim(G(M, ds^2))$. For a description of the possible isometry groups of dimensions $\ge 2+(n-1)(n-2)/2$ cf. [a2], [a3].

References

[a1] S. Kobayashi, "Transformation groups in differential geometry" , Springer (1972)
[a2] S. Kobayashi, T. Nagano, "Riemannian manifolds with abundant symmetries" , Differential geometry (in honor of K. Yano) , Kinokuniya (1972) pp. 195–220
[a3] H. Wakakuwa, "On $n$-dimensional Riemannian spaces admitting some groups of motions of order less than $n(n-1)/2$" Tôhoku Math. J. , 6 (1954) pp. 121–134
[a4] S. Bochner, "Vector fields and Ricci curvature" Bull. Amer. Math. Soc. , 52 (1946) pp. 776–797
How to Cite This Entry:
Lacunary space. Encyclopedia of Mathematics. URL: http://encyclopediaofmath.org/index.php?title=Lacunary_space&oldid=55502
This article was adapted from an original article by I.P. Egorov (originator), which appeared in Encyclopedia of Mathematics - ISBN 1402006098. See original article