The phrase "a minimum point of" is correct and usable in written English.
It can be used in contexts related to mathematics, optimization, or analysis where you are discussing the lowest value in a set or function.
Example: "In calculus, we often look for a minimum point of a function to determine its lowest value."
Alternatives: "a lowest point of" or "a minimum value of".
Extending earlier results for bounded domains, we show that (almost) maximizers of SεF concentrate at a harmonic center, i.e. a minimum point of the Robin function τΩ (the regular part of the Green function restricted to the diagonal).
We get (g'(0) = -infty), and so x cannot be a minimum point of f.
As a minimum point of f in the open set D, x is a critical point, hence a solution of (1).
It is immediate that (v_{varepsilon}) is a minimum point of K, and so frac{K v_{varepsilon}+ tvarphi) - K v_{varepsilon})}{t} geq0 (17) for (t>0) small enough and (varphiin B_{rho}).
As C(w∗) is a minimum point of C, then differentiating (4) with respect to w∗ and letting the result equal 0 gives: w ∗ = w - C ′ ( w ) C ′′ ( w ) (5).
The radius of such a sphere is given by a minimum point of a function (mathcal{M}), which takes into account the value of the radial potential (V vert xvert )).
It follows that x is a global minimum point of (f Ktomathbb{R}).
Then y is a critical point of f, and f is convex; it follows that y is a global minimum point of f on D. (See, e.g., [15], p. 14, Theorem 1.17).
In this work, the fundamental period of a signal is estimated as the first positive minimum point of a similarity measure (FE, FA, and FperiodicA).
In particular, if p is a strict local maximum or minimum point of φ n,m, p is a C0-stable critical point of φ n,m.
where is the normalized duality mapping on and is the generalized projection operator which assigns to an arbitrary point the minimum point of the functional with respect to.
