Kosmann lift

In differential geometry, the Kosmann lift,^[1][2] named after Yvette Kosmann-Schwarzbach, of a vector field ${\displaystyle X\,}$ on a Riemannian manifold ${\displaystyle (M,g)\,}$ is the canonical projection ${\displaystyle X_{K}\,}$ on the orthonormal frame bundle of its natural lift ${\displaystyle {\hat {X}}\,}$ defined on the bundle of linear frames.^[3]

Generalisations exist for any given reductive G-structure.

Introduction

In general, given a subbundle ${\displaystyle Q\subset E\,}$  of a fiber bundle ${\displaystyle \pi _{E}\colon E\to M\,}$  over ${\displaystyle M}$  and a vector field ${\displaystyle Z\,}$  on ${\displaystyle E}$ , its restriction ${\displaystyle Z\vert _{Q}\,}$  to ${\displaystyle Q}$  is a vector field "along" ${\displaystyle Q}$  not on (i.e., tangent to) ${\displaystyle Q}$ . If one denotes by ${\displaystyle i_{Q}\colon Q\hookrightarrow E}$  the canonical embedding, then ${\displaystyle Z\vert _{Q}\,}$  is a section of the pullback bundle ${\displaystyle i_{Q}^{\ast }(TE)\to Q\,}$ , where

${\displaystyle i_{Q}^{\ast }(TE)=\{(q,v)\in Q\times TE\mid i(q)=\tau _{E}(v)\}\subset Q\times TE,\,}$ 

and ${\displaystyle \tau _{E}\colon TE\to E\,}$  is the tangent bundle of the fiber bundle ${\displaystyle E}$ . Let us assume that we are given a Kosmann decomposition of the pullback bundle ${\displaystyle i_{Q}^{\ast }(TE)\to Q\,}$ , such that

${\displaystyle i_{Q}^{\ast }(TE)=TQ\oplus {\mathcal {M}}(Q),\,}$ 

i.e., at each ${\displaystyle q\in Q}$  one has ${\displaystyle T_{q}E=T_{q}Q\oplus {\mathcal {M}}_{u}\,,}$  where ${\displaystyle {\mathcal {M}}_{u}}$  is a vector subspace of ${\displaystyle T_{q}E\,}$  and we assume ${\displaystyle {\mathcal {M}}(Q)\to Q\,}$  to be a vector bundle over ${\displaystyle Q}$ , called the transversal bundle of the Kosmann decomposition. It follows that the restriction ${\displaystyle Z\vert _{Q}\,}$  to ${\displaystyle Q}$  splits into a tangent vector field ${\displaystyle Z_{K}\,}$  on ${\displaystyle Q}$  and a transverse vector field ${\displaystyle Z_{G},\,}$  being a section of the vector bundle ${\displaystyle {\mathcal {M}}(Q)\to Q.\,}$ 

Definition

Let ${\displaystyle \mathrm {F} _{SO}(M)\to M}$  be the oriented orthonormal frame bundle of an oriented ${\displaystyle n}$ -dimensional Riemannian manifold ${\displaystyle M}$  with given metric ${\displaystyle g\,}$ . This is a principal ${\displaystyle {\mathrm {S} \mathrm {O} }(n)\,}$ -subbundle of ${\displaystyle \mathrm {F} M\,}$ , the tangent frame bundle of linear frames over ${\displaystyle M}$  with structure group ${\displaystyle {\mathrm {G} \mathrm {L} }(n,\mathbb {R} )\,}$ . By definition, one may say that we are given with a classical reductive ${\displaystyle {\mathrm {S} \mathrm {O} }(n)\,}$ -structure. The special orthogonal group ${\displaystyle {\mathrm {S} \mathrm {O} }(n)\,}$  is a reductive Lie subgroup of ${\displaystyle {\mathrm {G} \mathrm {L} }(n,\mathbb {R} )\,}$ . In fact, there exists a direct sum decomposition ${\displaystyle {\mathfrak {gl}}(n)={\mathfrak {so}}(n)\oplus {\mathfrak {m}}\,}$ , where ${\displaystyle {\mathfrak {gl}}(n)\,}$  is the Lie algebra of ${\displaystyle {\mathrm {G} \mathrm {L} }(n,\mathbb {R} )\,}$ , ${\displaystyle {\mathfrak {so}}(n)\,}$  is the Lie algebra of ${\displaystyle {\mathrm {S} \mathrm {O} }(n)\,}$ , and ${\displaystyle {\mathfrak {m}}\,}$  is the ${\displaystyle \mathrm {Ad} _{\mathrm {S} \mathrm {O} }\,}$ -invariant vector subspace of symmetric matrices, i.e. ${\displaystyle \mathrm {Ad} _{a}{\mathfrak {m}}\subset {\mathfrak {m}}\,}$  for all ${\displaystyle a\in {\mathrm {S} \mathrm {O} }(n)\,.}$ 

Let ${\displaystyle i_{\mathrm {F} _{SO}(M)}\colon \mathrm {F} _{SO}(M)\hookrightarrow \mathrm {F} M}$  be the canonical embedding.

One then can prove that there exists a canonical Kosmann decomposition of the pullback bundle ${\displaystyle i_{\mathrm {F} _{SO}(M)}^{\ast }(T\mathrm {F} M)\to \mathrm {F} _{SO}(M)}$  such that

${\displaystyle i_{\mathrm {F} _{SO}(M)}^{\ast }(T\mathrm {F} M)=T\mathrm {F} _{SO}(M)\oplus {\mathcal {M}}(\mathrm {F} _{SO}(M))\,,}$ 

i.e., at each ${\displaystyle u\in \mathrm {F} _{SO}(M)}$  one has ${\displaystyle T_{u}\mathrm {F} M=T_{u}\mathrm {F} _{SO}(M)\oplus {\mathcal {M}}_{u}\,,}$  ${\displaystyle {\mathcal {M}}_{u}}$  being the fiber over ${\displaystyle u}$  of the subbundle ${\displaystyle {\mathcal {M}}(\mathrm {F} _{SO}(M))\to \mathrm {F} _{SO}(M)}$  of ${\displaystyle i_{\mathrm {F} _{SO}(M)}^{\ast }(V\mathrm {F} M)\to \mathrm {F} _{SO}(M)}$ . Here, ${\displaystyle V\mathrm {F} M\,}$  is the vertical subbundle of ${\displaystyle T\mathrm {F} M\,}$  and at each ${\displaystyle u\in \mathrm {F} _{SO}(M)}$  the fiber ${\displaystyle {\mathcal {M}}_{u}}$  is isomorphic to the vector space of symmetric matrices ${\displaystyle {\mathfrak {m}}}$ .

From the above canonical and equivariant decomposition, it follows that the restriction ${\displaystyle Z\vert _{\mathrm {F} _{SO}(M)}}$  of an ${\displaystyle {\mathrm {G} \mathrm {L} }(n,\mathbb {R} )}$ -invariant vector field ${\displaystyle Z\,}$  on ${\displaystyle \mathrm {F} M}$  to ${\displaystyle \mathrm {F} _{SO}(M)}$  splits into a ${\displaystyle {\mathrm {S} \mathrm {O} }(n)}$ -invariant vector field ${\displaystyle Z_{K}\,}$  on ${\displaystyle \mathrm {F} _{SO}(M)}$ , called the Kosmann vector field associated with ${\displaystyle Z\,}$ , and a transverse vector field ${\displaystyle Z_{G}\,}$ .

In particular, for a generic vector field ${\displaystyle X\,}$  on the base manifold ${\displaystyle (M,g)\,}$ , it follows that the restriction ${\displaystyle {\hat {X}}\vert _{\mathrm {F} _{SO}(M)}\,}$  to ${\displaystyle \mathrm {F} _{SO}(M)\to M}$  of its natural lift ${\displaystyle {\hat {X}}\,}$  onto ${\displaystyle \mathrm {F} M\to M}$  splits into a ${\displaystyle {\mathrm {S} \mathrm {O} }(n)}$ -invariant vector field ${\displaystyle X_{K}\,}$  on ${\displaystyle \mathrm {F} _{SO}(M)}$ , called the Kosmann lift of ${\displaystyle X\,}$ , and a transverse vector field ${\displaystyle X_{G}\,}$ .

See also

• Frame bundle
• Orthonormal frame bundle
• Principal bundle
• Spin bundle
• Connection (mathematics)
• G-structure
• Spin manifold
• Spin structure

Notes

1. Fatibene, L.; Ferraris, M.; Francaviglia, M.; Godina, M. (1996). "A geometric definition of Lie derivative for Spinor Fields". In Janyska, J.; Kolář, I.; Slovák, J. (eds.). Proceedings of the 6th International Conference on Differential Geometry and Applications, August 28th–September 1st 1995 (Brno, Czech Republic). Brno: Masaryk University. pp. 549–558. arXiv:gr-qc/9608003v1. Bibcode:1996gr.qc.....8003F. ISBN 80-210-1369-9.
2. Godina, M.; Matteucci, P. (2003). "Reductive G-structures and Lie derivatives". Journal of Geometry and Physics. 47: 66–86. arXiv:math/0201235. Bibcode:2003JGP....47...66G. doi:10.1016/S0393-0440(02)00174-2.
3. Kobayashi, Shoshichi; Nomizu, Katsumi (1996), Foundations of Differential Geometry, vol. 1, Wiley-Interscience, ISBN 0-470-49647-9 (Example 5.2) pp. 55-56

References

• Kobayashi, Shoshichi; Nomizu, Katsumi (1996), Foundations of Differential Geometry, vol. 1 (New ed.), Wiley-Interscience, ISBN 0-471-15733-3
• Kolář, Ivan; Michor, Peter; Slovák, Jan (1993), Natural operators in differential geometry (PDF), Springer-Verlag, archived from the original (PDF) on 30 March 2017, retrieved 4 June 2011
• Sternberg, S. (1983), Lectures on Differential Geometry (2nd ed.), New York: Chelsea Publishing Co., ISBN 0-8218-1385-4
• Fatibene, Lorenzo; Francaviglia, Mauro (2003), Natural and Gauge Natural Formalism for Classical Field Theories, Kluwer Academic Publishers, ISBN 978-1-4020-1703-2