874 



Moore 



Mordeil. 



Amer. Journ. of Math.: A general theory of 

 limits (m. H. L. Smith), 20 S. (44, 1922). 



Amer. Math. Soc. Bull.: The foundats. of 

 maths., 23 S. (9, 1903). — On doubly infinite 

 Systems of directly similar convex arches w. 

 common base line, 5 S. (10, 04). — Note on 

 Fourier's constants, 3 S. — Decomposit. of 

 modular Systems connected w. the doubly 

 generalized Fermat theorem, 9 S. (13, 07). — 

 Foundats. of the theorie of linear integral 

 equats., 28 S. (18, 12). 



Amer. Math. Soe. Trans.: On a definit. of 

 abstract gr., 2 S. (6, 1905). 



Ann. o! Math. Harvard Coli.: A generalizat. 

 of the game called nim, 2 S. (11, 1909/10). 



Mathemat. Ann. : On power series in general 

 analysis, 10 S. (86, 1922). 



Washington, Acad. Proc. : Definit. of limit 

 in general integral analysis, 5 S. (1, 1915). 



Moore, F. Jewett, Dr. phil. nat. 

 1893 Heidelberg; stud. 1885—89 Am- 

 herst, 90—93 Heidelberg; 93—94 Instr., 

 Univ., Itbaca, 94 — 95 Assist., Inst, of 

 Techn., Boston, 95—1902 Instr., 02—10 

 Assist. Prof., 10 — 12 Assoc. Prof., seit 

 12 Prof., organ. Chemie, Inst, of Technol., 

 Boston, Mass; * 1867, Juni 9, Pittsfield 

 Mass. (Eig. Mitt.) 



Üb. eine Meth. d. Isolierg. aromat. Sulfosäuren, 

 29 S., Heidelberg 1893 (Diss.). — Outlines of 

 organ. ehem., 325 S., New York 1910. — Ex- 

 periments in organ. ehem., 27 S., New York 

 11. — A history of ehem., 292 S., New York 18. 



Amer. Chem. Soc. Journ.: Some deriv. of 

 p-sulphocinnamic acid, 7 S. (25, 1903). — 

 Piperonal & H-chloride: A two-component 

 three-phase System, 3 S. — Benzoyl p-brom- 

 phenyl urea, a by-prod. in the preparat. of 

 taenzbromamide (m. A. M. Cederholm), 8 S. 

 (28, 06). — The colored salts of Schiffs bases 

 (m. R. D. Gale), 11 S. — Dass., 2: The hydro- 

 chlorides of bases formed by condensing p- 

 amino diphenylamine w. aromatic aldehydes 

 (m. R. G. Woodbridge jr.), 3 S. (30, 08). — 

 Dass., 3: The salts of bases formed bycondensg. 

 m-aminodimethylaniline & amino-diethylani- 

 line w. arom. ald., 5 S. (32, 10). — Constitut. 

 of xanthogalloP), 37 S. — Cyanuric acides an 

 oxidat. prod. of uric acid: its probable identity 

 w. tetracarbonimide (m. C. S. Venable), 5 S. 

 (39, 17). — Allan toxanic acid as an oxidat. 

 prod. of uric acid.^), 12 S. (40, 18). —The con- 

 stitut. of the secondary prod. in the sulfonat. 

 of cinnamic acid^), 3 S. (44, 22). 



Berichte d. Deut. Chem. Ges.: Abspaltg. 

 einer Sulfogruppe durch reduz. Agent., 2 S. 

 (33, 1900). — Notiz zur Darstellg. v. Ben- 

 zophenon-imid-Deriv., 3 S. (43, 10). 



Journ. of Industr. & englneer. ehem.: Recent 

 synth. studies in the taimingroup, 2 S. (6, 

 1910). 



Mit ») E. M. Thomas. 



Moore, Richard Bishop, D. Sc. 1916 

 Boulder; stud. 1896—97 Chicago; 1905— 

 11; Prof., Chemie, Butler-Coll., Indiana- 

 polis, 12 Vorst., US. Bur. of Mines, 

 Washington, f. Chem. & Metallurgie d. 

 seit. Metalle & d. mineral. Technol.; 

 * 1871, Mai 6, Cincinnati. 

 A preliminary report on U, Ra & V (m. K. L. 

 Kithil), 101 S., London 1914. 



Amer. Chem. Soc. Journ.: The react. betw. 

 CO2 & soluble nitrites, 2 S. (26, 1904). 



London, Chem. Soc. Journ.: The densities 

 of Kr & X, 6 S. (93, 1908). 



London, Roy. Soc. Proc: The decay of Ra 

 emanat. when dissolved in H2O, 2 S. (80, 1908). 



— An investigat. of the heavy constituents of 

 the atmosph., 15 S. (81, 08). 



Phil. Mag.: Some new meth. for separating 

 U X fr. U (m. H. Schlundt), 4 S. (12, 1906). 



Siehe H. Schlundt. 



Moore, Robert L., Dr.; a. o. Prof., 

 Math., Univ., Philadelphia, Pa. 



Amer. Journ. of Math.: On the Lie-Riemann- 

 Helmholtz-Hilbert problem of the foundats. of 

 geometry, 21 S. (41, 1919). 



Amer. Math. Soc. Bull.: On the linear con- 

 tinuum, 5 S. — Conceming a non-metrical 

 pseudo-Archimedean axiom, 12 S. (22, 1915/16). 



— A theorem conceming continuous curves^ 



4 S. (23, 1916/17). — Continuous sets that 

 have no continuous sets of condensat., 3 S. 

 (25, 18/19). 



Amer. Math. Soc. Trans.: Geometry in 

 which the sum of the angles of every triangle 

 is two right angles, 10 S. (8, 1907). — Sets 

 of metrical hypotheses for geom., 26 S. (9, 08). 



— A note conceming Veblen's axioms for 

 geom., 3 S. (13, 12). — On a set of postulates 

 which suffice to define a number-plane, 6 S. 

 (16, 15). — On the foundats. of plane analysis 

 Situs, 34 S. (17, 16). — Conceming a set of 

 postulates for plane analysis situs, 10 S. (20, 

 19). — Conceming simple continuous curves, 

 15 S. (21, 20). — Conceming cert. equicon- 

 tinuous Systems of curves, 15 S. (22, 21). 



Ann. of Math. Harvard Coli.: On Duhamel's 

 theorem. 6 S. (13, 1911/12). — The linear con- 

 tinuum in terms of point & limit, 11 S. (16, 

 14/15). — On the most general plane closed 

 point-set through which it is possible to pass 

 a simple continuous arc (m. R. J. Kline), 6 S. 

 (20, 18/19). 



Matheni. Zeitschr. : Conceming continuous 

 curves in the plane, 7 S. (15, 1922). 



Washington, Proc. Acad.: On the relat. of 

 a continuous curve to its complementary do- 

 mains in space of 3 dimens., 5 S. (8, 1922). 



Morden, L. J.; Prof., Math., Birk- 

 beck-Coll., London. 



Three lectures on Fermat's last theorem, 31 S.,. 

 London 1921. 



Cambridge, Phll. Soc. Proc: On Mr. Rama- 

 nujan's empirical expans. of modular functs., 

 8 S. (19, 1916/19). — The representat. of 

 algebraic numbers as a sum of 4 Squares, 7 S. 

 (20, 20/21). — The rational soluts. of the in- 

 determinate equats. of the 3. & 4.degree8, 14 S. 

 (21. 22). — The representats. , of a number as 

 a sum of an odd number of Squares, 12 S. 

 (22, 22). 



London, Math. Soc. Proc: The Diophantine 

 equat. y^ — k = x^ 21 S. (13, 1914). — On 

 the integer soluts. of the equat. ey ^ = ax ^ + 

 bx^ -f ex + li, 5 S. — On trigonometric series 

 involving algebraic numbers, 4 S. (21, 22). 



Messenger of Math.: Note on irregulär de- 

 terminants, 1 S. (42, 1913/13). — The invers. 



Jydx — xdy 



(44, 14/15). — On class relat. formulae, 



5 & 23 S. (45 & 46, 15—17). — An arithmetical 

 proof of a class relat. formula, 4 S. (45, 15/16).. 



