Author:
Fukunaga Tomonori,Takahashi Masatomo
Abstract
AbstractWe have already defined the evolutes and the involutes of fronts without inflection points. For regular curves or fronts, we can not define the evolutes at inflection points. On the other hand, the involutes can be defined at inflection points. In this case, the involute is not a front but a frontal at inflection points. We define evolutes of frontals under conditions. T he definition is a generalisation of both evolutes of regular curves and of fronts. By using relationship between evolutes and involutes of frontals, we give an existence condition of the evolute with inflection points. We also give properties of evolutes and involutes of frontals.
Reference4 articles.
1. Zariski s moduli problem for plane branches and the classification of Legendre curve singularities Real and Complex Singularities World;Ishikawa;Sci Publ,2007
2. Symplectic bifurcations of plane curves and isotropic liftings;Ishikawa;Math,2003
3. d Topological properties of Legendre projections in contact geometry of wave fronts St Petersburg;Arnol;Math,1995
4. d Critical points of functions on a manifolds with boundary the simple Lie groups Bk Ck and and singularities of evolvents Russian;Arnol;Math Surveys,1978
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