Wegintegrale/t nach (t,t^3)/(u,v) nach (u^3,u^2+v^2,u^-1+v^-1)/(x-y)dx-z^2dy+dz/Aufgabe/Lösung

a) Die zurückgezogene Differentialform ist

{}{\begin{aligned}\varphi ^{*}((x-y)dx-z^{2}dy+dz)&=(u^{3}-u^{2}-v^{2})d(u^{3})-u^{-2}v^{-2}d(u^{2}+v^{2})+d(u^{-1}v^{-1})\\&=3(u^{5}-u^{4}-u^{2}v^{2})du-2u^{-1}v^{-2}du-2u^{-2}v^{-1}dv-u^{-2}v^{-1}du-u^{-1}v^{-2}dv\\&=(3u^{5}-3u^{4}-3u^{2}v^{2}-2u^{-1}v^{-2}-u^{-2}v^{-1})du+(-2u^{-2}v^{-1}-u^{-1}v^{-2})dv.\,\end{aligned}}

b) Das Wegintegral ist

{}{\begin{aligned}\int _{1}^{c}(3t^{5}-3t^{4}-3t^{2}t^{6}-2t^{-1}t^{-6}-t^{-2}t^{-3})dt+(-2t^{-2}t^{-3}-t^{-1}t^{-6})dt^{3}&=\int _{1}^{c}(3t^{5}-3t^{4}-3t^{8}-2t^{-7}-t^{-5})dt+(-2t^{-5}-t^{-7})3t^{2}dt\\&=\int _{1}^{c}(3t^{5}-3t^{4}-3t^{8}-2t^{-7}-t^{-5}-6t^{-3}-3t^{-5})dt\\&=\int _{1}^{c}(-3t^{8}+3t^{5}-3t^{4}-6t^{-3}-4t^{-5}-2t^{-7})dt\\&=(-{\frac {1}{3}}t^{9}+{\frac {1}{2}}t^{6}-{\frac {3}{5}}t^{5}+3t^{-2}+t^{-4}+{\frac {1}{3}}t^{-6})|_{1}^{c}\\&=-{\frac {1}{3}}c^{9}+{\frac {1}{2}}c^{6}-{\frac {3}{5}}c^{5}+3c^{-2}+c^{-4}+{\frac {1}{3}}c^{-6}-(-{\frac {1}{3}}+{\frac {1}{2}}-{\frac {3}{5}}+3+1+{\frac {1}{3}})\\&=-{\frac {1}{3}}c^{9}+{\frac {1}{2}}c^{6}-{\frac {3}{5}}c^{5}+3c^{-2}+c^{-4}+{\frac {1}{3}}c^{-6}-{\frac {39}{10}}.\,\end{aligned}}