Sentence examples for maximal existence time from inspiring English sources

(2.4) Thus, the maximal existence time (T_{n,M}=+infty).

Suppose that is the maximal existence time, then (1.4).

Let (T^) be the maximal existence time of the solution u.

For the solution of (1.1), let be the maximal existence time, that is, (1.2).

We need to show that the maximal existence time T of u is finite.

Let u 0 ∈ H s with s > 3 2, T > 0 be the maximal existence time.

Assume that is the classical solution of (1.1) with the maximal existence time.

Let be the solution of system (1.5) with initial values, and let be the maximal existence time.

If, then (1.4) has a unique nonnegative solution, where is the maximal existence time of the solution.

where T is the maximal existence time of solution, then q ( t, ⋅ ) is a diffeomorphism of the line.

We now get a lower bound depending only on ∥ u 0 ∥ Lip for the maximal existence time.