Difference between revisions of "Herglotz formula"
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− | An integral relation between two closed isometric oriented regular surfaces. Let local coordinates | + | {{TEX|done}} |
+ | An integral relation between two closed isometric oriented regular surfaces. Let local coordinates $u$ and $v$ be introduced on the surfaces $S_1$ and $S_2$ so that equality of the coordinates realizes an isometric mapping. Let | ||
− | + | $$ds^2=Edu^2+2Fdudv+Gdv^2$$ | |
− | be the first fundamental form, having the same coefficients for both surfaces in the given coordinates, let | + | be the first fundamental form, having the same coefficients for both surfaces in the given coordinates, let $K$ be the Gaussian curvature, let $H_\alpha$ be the mean curvatures, and let |
− | + | $$\sqrt{EG-F^2}(\lambda_\alpha du^2+2\mu_\alpha dudv+\nu_\alpha dv^2)$$ | |
− | be the second fundamental forms of the surfaces | + | be the second fundamental forms of the surfaces $S_\alpha$. Herglotz' formula then takes the following form: |
− | + | $$\int\limits_{S_1}\begin{vmatrix}\lambda_2-\lambda_1&\mu_2-\mu_1\\\mu_2-\mu_1&\nu_2-\nu_1\end{vmatrix}(\mathbf n,\mathbf x)d\tau=\int\limits_{S_2}H_2d\tau-\int\limits_{S_1}H_1d\tau,$$ | |
− | where | + | where $\mathbf x=\mathbf x(u,v)$ is the position vector of $S_1$, $\mathbf n$ is the unit vector of the normal to $S_1$ and $d\tau$ is the surface element. It was obtained by G. Herglotz [[#References|[1]]]. |
====References==== | ====References==== |
Latest revision as of 14:03, 12 August 2014
An integral relation between two closed isometric oriented regular surfaces. Let local coordinates $u$ and $v$ be introduced on the surfaces $S_1$ and $S_2$ so that equality of the coordinates realizes an isometric mapping. Let
$$ds^2=Edu^2+2Fdudv+Gdv^2$$
be the first fundamental form, having the same coefficients for both surfaces in the given coordinates, let $K$ be the Gaussian curvature, let $H_\alpha$ be the mean curvatures, and let
$$\sqrt{EG-F^2}(\lambda_\alpha du^2+2\mu_\alpha dudv+\nu_\alpha dv^2)$$
be the second fundamental forms of the surfaces $S_\alpha$. Herglotz' formula then takes the following form:
$$\int\limits_{S_1}\begin{vmatrix}\lambda_2-\lambda_1&\mu_2-\mu_1\\\mu_2-\mu_1&\nu_2-\nu_1\end{vmatrix}(\mathbf n,\mathbf x)d\tau=\int\limits_{S_2}H_2d\tau-\int\limits_{S_1}H_1d\tau,$$
where $\mathbf x=\mathbf x(u,v)$ is the position vector of $S_1$, $\mathbf n$ is the unit vector of the normal to $S_1$ and $d\tau$ is the surface element. It was obtained by G. Herglotz [1].
References
[1] | G. Herglotz, "Ueber die Starrheit von Eiflächen" Abh. Math. Sem. Univ. Hamburg , 15 (1943) pp. 127–129 |
[2] | N.V. Efimov, "Qualitative questions of the theory of deformations of surfaces" Uspekhi Mat. Nauk , 3 : 2 (1948) pp. 47–158 (In Russian) |
Comments
This formula can be used to prove rigidity or congruence theorems for surfaces. For related formulas and results see [a1].
References
[a1] | H. Huck, R. Roitzsch, U. Simon, W. Vortisch, R. Walden, B. Wegner, W. Wendland, "Beweismethoden der Differentialgeometrie im Grossen" , Lect. notes in math. , 335 , Springer (1973) |
[a2] | W. Klingenberg, "A course in differential geometry" , Springer (1978) (Translated from German) |
Herglotz formula. Encyclopedia of Mathematics. URL: http://encyclopediaofmath.org/index.php?title=Herglotz_formula&oldid=17185