For odd f, we obtain infinitely many geometrically distinct solutions.
People are asked questions like, "How many different uses can you find for a brick?" This test requires strategies for considering as many distinct solutions as possible.
In other words, there are distinct solutions with identical vortex distribution, energy, and electric and magnetic charges.
It is crucial to solve this issue as distinct solutions will be generated due to different weighting factors of each property.
The DMRTS method uses an insertion criterion based on similarity and a dynamic tournament size to preserve good, distinct solutions in the genetic algorithm population.
It is reasonable to guess that for dimΩ≥2 above problem possesses infinitely many distinct solutions since this is proved to be true for ODE.
If y1 x) and y2 x) are two distinct solutions of the equation, then any combination ay1 x) +��by2 x will also be a solution, called the general solution, for any constants a and b.
admits at least three distinct solutions.
Suppose that are distinct solutions to (3.3).
Then (1.1) has at least three distinct solutions.
Furthermore, problem (1.2) admits at least three distinct solutions.
