A Coarea Formula for Multiple Geometric Integrals

## Abstract The coarea formula by Federer (1969) is a general transformation formula for simple geometric integrals. In the present paper, we derive a coarea formula for multiple geometric integrals. The construction of this new formula is based on the use of the simple coarea formula on a product

A convenient Gauss᎐Laguerre quadrature formula is presented for integrands which depend on the radial coordinates r and r of two bodies as well as on 1 2 their relative distance r . This formula generalizes the analytic method by Calais and 12 w Ž .x Lowdin J. Mol. Spectrosc. 8, 203 1962 to cases w

Recently P. Lax has produced a novel approach to the proof of the change of variable formula for multiple integrals. In Section 1 we give a variant of Lax's proof, using the language of differential forms. In Sections 2 and 3 we discuss extensions involving more singular maps and integrands.  2002

## Abstract Recently, a new geometric measure decomposition has been derived by Zähle (1990), involving the __r__‐fold product of the __d__‐dimensional Hausdorff measure with itself. The application to moment measure estimation has been discussed in Jensen et al. (1990a) and Zähle (1990). The decom