Existence of a Sign-Changing Solution to a Superlinear Dirichlet Problem

Neuberger, John M. (John Michael)

08 1900

We study the existence, multiplicity, and nodal structure of solutions to a superlinear elliptic boundary value problem. Under specific hypotheses on the superlinearity, we show that there exist at least three nontrivial solutions. A pair of solutions are of one sign (positive and negative respectively), and the third solution changes sign exactly once. Our technique is variational, i.e., we study the critical points of the associated action functional to find solutions. First, we define a codimension 1 submanifold of a Sobolev space . This submanifold contains all weak solutions to our problem, and in our case, weak solutions are also classical solutions. We find nontrivial solutions which are local minimizers of our action functional restricted to various subsets of this submanifold. Additionally, if nondegenerate, the one-sign solutions are of Morse index 1 and the sign-changing solution has Morse index 2. We also establish that the action level of the sign-changing solution is bounded below by the sum of the two lesser levels of the one-sign solutions. Our results extend and complement the findings of Z. Q. Wang ([W]). We include a small sample of earlier works in the general area of superlinear elliptic boundary value problems.

superlinearity

mathematics

Dirichlet problem.

Study of Scalability in a Robot Swarm Performance and Demonstration of Superlinear Performance in Conveyor Bucket Brigades and Collaborative Pulling

Adhikari, Shirshak

January 2021

No description available.

Robotics

Industrial Engineering

Mechanical Engineering