PlanetPhysics/OCR2 Proofreading Test

necessary to consider the second bundle. The curvature form of our connection is a tensorial quadratic differential form in ${\displaystyle M}$, of [[../Bijective/|type]] ${\displaystyle ad(G^{\prime })}$ and with values in the [[../TopologicalOrder2/|Lie Algebra]] ${\displaystyle L(G^{\prime })}$ of ${\displaystyle G^{\prime }}$. Since the Lie algebra ${\displaystyle L(G)}$ of ${\displaystyle G}$ is a subalgebra of ${\displaystyle L(G^{\prime })}$, there is a natural projection of ${\displaystyle L(G^{\prime })}$ into the quotient space ${\displaystyle L(G^{\prime })/L(G)}$. The image of the curvature form under this projection will be called the torsion form or the torsion [[../Tensor/|tensor]]. If the forms ${\displaystyle {\pi }^{\rho }}$ in (13) define a ${\displaystyle G}$-connection, the vanishing of the torsion form is expressed analytically by the conditions ${\displaystyle (22)==c_{j^{\prime \prime }{k}^{\prime \prime }}^{i^{\prime \prime }}=0.}$ \quad We proceed to derive the analytical [[../Formula/|formulas]] for the theory of a ${\displaystyle G}$-connection without torsion in the tangent bundle. In general we will consider such formulas in ${\displaystyle B_G}$. The fact that the G-connection has no torsion simplifies (13) into the form ${\displaystyle (23)==d{\omega }^i={\mathrm{\Sigma }}_{\rho ,k}{a}_{\rho k}^i{\pi }^{\rho }\wedge {\omega }^k.}$ By taking the exterior derivative of (23) and using (18), we get ${\displaystyle (24)=={\mathrm{\Sigma }}_{\rho ,k}{a}_{\rho k}^i{\mathrm{\Pi }}^{\rho }\wedge {\omega }^k=0,}$ where we put ${\displaystyle (25)=={\mathrm{\Pi }}^{\rho }=d{\pi }^{\rho }+\frac{1}{2}{\mathrm{\Sigma }}_{\sigma .\tau }{\gamma }_{\sigma \tau }^{\rho }{\pi }^{\sigma }\wedge {\pi }^{\tau }.}$ For a fixed value of ${\displaystyle k}$ we multiply the above equation by ${\displaystyle {\omega }^1==\wedge .=..=\wedge =={\omega }^{k-1}==\wedge =={\omega }^{k+1}\dots ==\wedge =={\omega }^n,}$ getting ${\displaystyle \sum _{\rho }{a}_{\rho k}^i{\mathrm{\Pi }}^{\rho }==\wedge =={\omega }^1==\wedge .=..=\wedge =={\omega }^n=0,}$ or ${\displaystyle {\mathrm{\Sigma }}_{\rho }{a}_{\rho k}^i{\mathrm{\Pi }}^{\rho }\equiv 0,\mathrm{m}\mathrm{o}\mathrm{d}{\omega }^j.}$

\noindent Since the infinitesimal transformations ${\displaystyle X_{\rho }}$ are linearly independent, this implies that ${\displaystyle {\mathrm{\Pi }}^{\rho }\equiv 0,==\mathrm{m}\mathrm{o}\mathrm{d}{\omega }^j.}$ It follows that ${\displaystyle {\mathrm{\Pi }}^{\rho }}$ is of the form ${\displaystyle {\mathrm{\Pi }}^{\rho }={\mathrm{\Sigma }}_j{\varphi }_j^{\rho }\wedge {\omega }^j}$ where ${\displaystyle {\varphi }_j^{\rho }}$ are Pfaffian forms. Substituting these expressions into (24), we get ${\displaystyle {\mathrm{\Sigma }}_{\rho ,j,k}(a_{\rho k}^i{\varphi }_j^{\rho }-a_{\rho j}^i{\varphi }_k^{\rho })\wedge {\omega }^j\wedge {\omega }^k=0.}$ It follows that ${\displaystyle {\mathrm{\Sigma }}_{\rho }(a_{\rho k}^i{\varphi }_j^{\rho }-a_{\rho j}^i{\varphi }_k^{\rho })\equiv 0,==\mathrm{m}\mathrm{o}\mathrm{d}{\omega }^k.}$ Since ${\displaystyle G}$ has the property ${\displaystyle (C)}$, the above equations imply that ${\displaystyle {\varphi }_j^{\rho }\equiv 0,==\mathrm{m}\mathrm{o}\mathrm{d}{\omega }^k.}$

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