One Friday night, a pair of diners found themselves staring longingly at an open two-top for thirty minutes after the appointed hour of their reservation when a chic host with tiny dreadlocks approached the couple, not to offer consolation or a round of drinks but to remark, "You really should check that," pointing to their insufficiently glamorous gym bag.
It remains to check that each point in corresponds to a concave game, and this follows from the easily verifiable facts that a convex combination of concave games is concave, and that a limit of concave games is concave.
An employee uses a handheld sensor to check that various points on the car meet specifications.
Read over each section, and make up a title for it to help you check that all points and details are directly relevant.
Lastly, we check that critical points of I are classical solutions of (HS) satisfying q ( t ) → 0 and q ˙ ( t ) → 0 as | t | → + ∞.
Clearly T 2 is strongly competitive and it is easy to check that the points A 0 and B 0 are locally asymptotically stable for T 2 as well.
However, we can check that the branch point almost always occurs for a smaller coupling value (than the Hopf point), that is, (g^{ast,b} le g^{H,b}) with equality if and only if (b_{E} = 1).
This proves that u is a common fixed point of the mappings T, S and R. Now our purpose is to check that such a point is unique.
So it is sufficient to check that a maximum point cannot be obtained on the boundary of (mathbb{R}_timesmathbb{R}_).
So it is sufficient to check that a maximum point cannot be achieved on the boundary of ([0,infty times [0,infty)). Without loss of generality, we may assume that ((0,bar{t})) is a maximum point of ϕ.
It is easy to check that the critical points of J are T-periodic solutions of (1).
