Determination of envelope to family of planar parametric curves and envelope singularities

This paper introduces an original analytical procedure for the computation of the planar curve in meshing with a general two dimensional curve. Considering a planar gear mechanism with a constant transmission ratio, in this work a general expression of the explicit solution of the equation of meshin

The purpose of the paper is determination of singularities of an envelope to a family of parametric surfaces. The authors propose a simplified solution to this problem based on consideration of the surface of action that is formed by the lines of tangency of the envelope and the generating surface o

A family of tooth surfaces \_Y+ represented in parametric form is considered. The contents of the paper covers determination of envelope \_& to family ,Z+, singularities on 4 and sufficient conditions of existence of envelopes E, and E, to characteristics on generating and generated tooth surfaces H

In this Note we study the envelope of 1-parameter family of smooth curves tangent to a curve having a semicubic cusp, such that the radius of curvature at the tangency point vanishes when this point approaches the cusp. We show that, generically, the closure of the envelope has two semicubic cusps a

The contents of this paper covers: (1) Necessary and sufficient conditions of the envelope to a two-parameter family of surfaces. (2) Applications to the generation of the gear tooth surface by a tool surface. (3) Avoidance of singularities and undercutting of the generated tooth surface. (4) Devi