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From Lemma 2.2, we also get that is convex.

We also get that (2.32).

By Lemma 2.7, we also get that.

Applying Lemma 2.7 to (3.16), we also get that z ∈ F ( T ).

From Lemma 2.2, we also get that C n is convex.

Similar to the argument in [10], we also get that (u λ, v λ ) is a positive least energy solution.

Similarly, if or we can also get that are bounded.

for any We can also get that there exists such that (17).

We can also get that the increase of the number of subcarriers brings a higher capacity value through the improvement of the frequency diversity gains.

Similarly, we can also get that once x i ( T ) ∈ [ 1, 3 ] for some T ≥ 0, then x i ( t ) would stay in [ 1, 3 ] for all t ≥ T. Case B x i ( 0 ) ∈ ( − ∞, 1 ).

We also get vorticist tunnels that remind me of the dream sequences in Hitchcock's Spellbound.