Geometric model for motion of curves specified by acceleration Research Proposal

Geometric model for motion of curves specified by acceleration - Research Proposal ExampleThe intention of this study a geometrical model generally that deals with the kinematics of a one dimensional manifold in a higher dimensional shoes. The model is specified by acceleration field which are local or global functions of the intrinsic quantities of the manifold. This research intends to examine the evolution of one dimensional manifold embedded in the Euclidean post as it evolves under a stochastic flow of diffeomorphisms. Within the manifold, motion depends on the intrinsic invariants immersed in the space. During the course of this research, we will obtain the constitution of derivative equations that governs the motion of the curve, keeping in mind that the processes driving the stochastic flows are chosen to be the most common class of Gaussian processes with stationary increments in time, which is the family of fractional Brownian motions with Hurst parameter. A family of r andom mappings is called a stochastic (Brownian) flow and is formulated as follows st, 0 st, for each s ut su = st, for all s tt is the identity map on Rn for all t. s1t1, s2t2, , sntn are independent if s1 Using some applications to give geometric meanings to each solution to the governing system of (Partial Differential Equations) PDE,s corresponding to the model length and local time investigated, this profile will also demonstrate how the geometric problem can be alter to a fully nonlinear parabolic system of equations for the curvature, the position, and orientation. This research will also examine the primary curvature properties developed during the evolution of curves. Another face of the study will explore the evolution of derive time equations using the Frenet frame. Further derive time equations will be determined regarding the intrinsic quantities slaked by curves. The investigation will also propose a model using the solution of the evolution equation for the curvatu re and torsion and the Fundamental theorem for space curves to