منابع مشابه
Thomas Barlow, 1845-1945.
We are met here to-day in thankful remembrance of the life and work of Thomas Barlow. A memorial service has already been held for him elsewhere which was largely attended by his many friends both lay and medical, but it is fitting that we should have our own simple service here in the Hospital to which he was so much devoted and where much of his best work was done. We may look upon it, I thin...
متن کاملHorace Barlow
Horace Barlow is retired Royal Society Research Professor of Physiology at the University of Cambridge, and Fellow of the Royal Society. He graduated in Medicine at Cambridge in 1947 and stayed there doing research in vision until 1964. He then moved to the University of California at Berkeley, staying there until 1973 when he returned to Cambridge. His main interest has always been in vision, ...
متن کاملJoel Barlow and Seasickness
In honoring her alumni who have achieved success in the belles lettres, in diplomacy, in the writing of political philosophy, Yale University has always been most active, extraordinarily eager to recognize their attainment; but, strangely enough, she has forgotten a member of the class of 1778 who was considered a great poet, statesman and philosopher by many of his contemporaries. Of this emin...
متن کاملA Bishop surface with a vanishing Bishop invariant
We derive a complete set of invariants for a formal Bishop surface near a point of complex tangent with a vanishing Bishop invariant under the action of formal transformations. We prove that the modular space of Bishop surfaces with a vanishing Bishop invariant and with a fixed Moser invariant s < ∞ is of infinite dimension. We also prove that the equivalence class of the germ of a generic real...
متن کاملThe Mergelyan-Bishop Theorem
We define the differential operator ∂ ∂z on infinitely differentiable functions (also called smooth or C∞ functions) on some open set in C by ∂ ∂z = 1 2 ( ∂ ∂x + i ∂ ∂y ). A quick calculation shows that ∂ ∂z obeys the product rule. Recall that a function f is holomorphic if and only if ∂ ∂z (f) = 0. A function is biholomorphic, or an analytic isomorphism, if it is holomorphic and has holomorphi...
متن کاملذخیره در منابع من
با ذخیره ی این منبع در منابع من، دسترسی به آن را برای استفاده های بعدی آسان تر کنید
ژورنال
عنوان ژورنال: Camden Old Series
سال: 1843
ISSN: 2042-1699
DOI: 10.1017/s2042169900009548