I shal cal it the egle.
"Frank's Campaign" by Horatio Alger, Jr.
There were four lady ushers, Mesdames Soustras, Ducrest-Villeneuve, Felicite Longroy, and Egle Marchery.
"The Private Life of Napoleon Bonaparte, Complete" by Constant
Admeration was at its hight, as she swayed too and frow as it were a winged egle from some etherial climb.
"The Wit and Humor of America, Volume VI. (of X.)" by Various
Coquerel, Precis de l'histoire de l'egl.
"The Rise of the Hugenots, Vol. 1 (of 2)" by Henry Martyn Baird
Upon his hond he bare for his deduit An egle tame, as any lily whit.
"Blackwood's Edinburgh Magazine, Volume 57, No. 356, June, 1845" by Various
Do not, I pray thee, practise thy power against a woman: for the Egle hath no fame for conquering of the Doue.
"The Palace of Pleasure" by William Painter
Leland says, 'Ther bredith in the Rok Side that the Castelle stondith on every yere an Egle.
"Climbing in The British Isles, Vol. II" by W. P. Haskett Smith
But one griffoun hath the body more great and stronger than one hundred egles, such as we have amonges us.
"Fictitious & Symbolic Creatures in Art" by John Vinycomb
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BARTON — Vitalis E Darr, 89, formerly of Bartlett Run Road, Barton , died Wednesday, Dec 5, 2012, at the Egle Nursing and Rehab Center, Lonaconing.
EGL USA 580 Fifth Ave Ste 2700 New York, NY 10036-4701 212 730-7380.
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From Lemma 4.1 and Lemma 4.5 it follows that for any k > 0, the functional Ec is bounded on the set {u ∈ X | EGL (u) = k}.
Traveling waves for nonlinear Schr\"odinger equations with nonzero conditions at infinity
For k > 0 we deﬁne Ec, min (k) = inf {Ec (u) | u ∈ X , EGL (u) = k}.
Traveling waves for nonlinear Schr\"odinger equations with nonzero conditions at infinity
It is obvious that H 1 (RN ) ⊂ X and the functionals EGL , Ec and Q are continuous on H 1 (RN ).
Traveling waves for nonlinear Schr\"odinger equations with nonzero conditions at infinity
From Lemma 4.5 we infer that EGL (vR,1 ) −→ ∞ as R −→ ∞ and then it is not hard to see that (ii) holds. (iii) Fix k > 0.
Traveling waves for nonlinear Schr\"odinger equations with nonzero conditions at infinity
Hence for any k > 0, there is a unique σ(k , u) > 0 such that EGL (u1,σ(k ,u) ) = k .
Traveling waves for nonlinear Schr\"odinger equations with nonzero conditions at infinity
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