1400 



Young — Young. 



Journ. de Chiin. phys.: Guye: L. points 

 d'ebullit. de composes homologues, 26 S. (3, 

 1905). — La tens. de vapeur d'un liquide pur 

 ä temp.constante, 51 S. (4, 06). 



Journ. de Phys.: Densites d. vapeurs sa- 

 turantes & valeurs du coeffic. de variat. par 

 millimetre de Hg sous la press. normale, 12 S. 

 (8, 1909). 



London, Roy. Soc. Proc: Opalescence in 

 fluids near the critical temp., 2 S. (78, 1906). 



Phil. Mag.: The boiling-points of homolo- 

 gous Compounds, 19 S. (9, 1905). 

 % Rov. Irish. Acad. Proc: Note on azeotropic 

 mixtiires, 9 S. (3«, 1922). 



Zeitschr. f. physik. Chemie: Ostwald: Spe- 

 cific volumes of the saturated vapours of pure 

 subst., 7 S. (70, 1910). 



IV Young, William H., Sc. D. 1903 

 Cambridge, D. Sc. e. h. Genf; Prof., Phil. 

 & Geschichte d. Math., Univ., Liverpool, 

 Hardinge-Prof., Math., Univ., Calcutta; 

 * 1863, Okt. 20, London. 

 On general theory of integrat., 32 S., London 

 1905. — Theory of sets of points^), 328 S., Lon- 

 don & Edinburgh 06. — The fundamental theo- 

 rems of the differential calculus, London & 

 Edinburgh 10. 



Amer. Journ. of Math.: The analytical basis 

 of non-Euclidian geom., 38 S. (33, 1911). 



Amer. Math. Soc. Bull.: A test for non- 

 uniform convergence, 8 S. (10, 1904). 



Cambridi^e, Phil. Soc. Proc: Fundamental 

 theorem of integrat., 4 S. (16, 1912). — Uni- 

 form oscillat., 16 S. — Change of order of inte- 

 grat. in an improper repeated integral, 16 S. — 

 Differentiat. of functs. defined by Integrals, 

 30 S. (21, 12). 



Edinburgh, Roy. Soc. Proc: A test for con- 

 tinuity, 10 S. (38, 1907—08). — Condits. for 

 the reversibility of the order of partial diffe- 

 rentiat., 29 S. (29, 08—09). — Fourier's repea- 

 ted integral, 28 S. — Sommerfeld's form of 

 Fourier's repeated Integrals, 17 S. (31, 10 — 11). 



Journ. de math.: Liouville: L'integrat. double 

 par rapport a une courbe, 14 S. (4, 1921). 



Leipzig, Ges. d. Wiss. S.Ber.: Summats.- 

 meth. für d. Fouriersche Reihe, 19 S. (63, 1911), 



London, Math. Soc Proc: Ordinary inner 

 limiting sets in the plane or higher space, 10 S. 

 (2, 1905). — Linear content of a plane set of 

 points, 17 S. (3, 05). — Uniform & non-uniform 

 convergence & divergence of a series of conti- 

 nuous functs. & the distinct. of right & left, 

 23 S. — The uniform approach of a continuous 

 funct. to its limit, 14 S. — The inequalities 

 connecting the double & repeated upper & 

 lower Integrals of a funct. of 2 variables, 15 S. 

 — Oscillating success. of continuous functs., 

 23 S. (6, 08). — Differentials, 24 S. — Implicit 

 functs. & their differentials, 25 S. (7, 09). — 

 Lideterminate forms, 35 S. — Term-by-term 

 integrat. of oscillating series, 18 S. — The 

 discontinuities of a funct. of one or more real 

 variables, 8 S. — Determinat. of a semi- 

 continuous funct. fr. a countable set of values ^), 

 10 S. — • Homogeneous oscillat. of suc- 

 cess. of functs., 12 S. (8, 10). — A 

 new meth. in the theory of integrat., 34 S. — 

 Semi-integrals & oscillating success. of functs., 

 39 S. — The existence of a differential coeffi- 

 cient^), 9 S. — The property of being a diffe- 

 rential coefficient, 9 S. — The condits. that a 

 trigenometrical series should have the Fourier 

 form, 13 S. — The integrat. of Fourier's series. 



14 S. — The theory of the applicat. of expans. 

 to definite Integrals, 23 S. (9, 11). — The funda- 

 mental theorem in the theory of functs. of a 

 complex variable, 6 S. — The convergence of a 

 Fourier series & of its allied series, 19 S. — 

 The nature of the success. formed by the coef- 

 ficients of a Fourier series, 9 S. (10, 11/12). — 

 Success. of Integrals & Fourier series, 53 S. — 

 Multiple Foiu-ier series, 52 S. — A certain series 

 of Fourier, 10 S. (11, 12/13). — The Fourier 

 series of bounded functs., 30 S. — Determinat. 

 of the summability of a funct. by means of its 

 Fourier constants, 18 S. — Deriv. & their primi- 

 tive fimcts., HS. — Functs. & their associated 

 sets of points, 28 S. — Uniform oscillat. of the 

 1. & 2. kind, 25 S. — The mode of oscillat. of 

 a Fourier series & its allied series, 20 S. (12, 13). 



— The usual convergence of a class of trigono- 

 metrical series, 16 S. — Integrat. w. respect 

 to a funct. of bounded variat., 40 S. (13, 14). — 

 The reduct. of sets of intervals^), 20 S. (14, 15). 



— Integrals & deriv. w. respect to a funct., 

 29 S. — Functs. of upper & lower type, 6 S. 

 (15, 16). — Non-absolutely convergent, not 

 necessarily continuous, Integrals, 44 S. — Mul- 

 tiple integrat. by parts & the 2. theorem of the 

 mean, 21 S. — The internal structure of a set 

 of points in space of any number of dimens.^), 



15 S. (16, 18). — The inherently crystalline 

 structure of a funct. of any number of variables^) 



16 S. — The convergence of the derived series 

 of Fourier series, 42 S. — Restricted Fourier 

 series & the convergence of power series, 14 S. 

 (17, 18). — The connex. betw. Legendre series 

 & Fourier series, 22 S. — Series of Bessel functs., 

 38 S. — Non-harmonic Fourier series, 29 S. 



— A formula for an area, 36 S. (18, 19). — The 

 triangulat. meth. of defining the area of a sur- 

 face, 36 S. (19, 20). — A new set of condits. for 

 a formula for an area, 20 S. — Integrat. over 

 the area of a curve & transformat. of the va- 

 riables in a multiple integral, 30 S. — The theory 

 of functs. of 2 complex variables, 15 S. (21, 22). 



London, Roy. Soc. PhiL Trans.: General 

 theory of integrat., 32 S. (204, 1905). 



London, Roy. Soc. Proc: The general theory 

 of integrat., 5 S. (73, 1904). — The Fourier 

 constants of a funct. , 11 S. — A class of para- 

 metric Integrals & their applicat. in the theory 

 of Fourier series, 14 S. — A mode of generating 

 Fourier series, 15 S. (85, 11). — The conver- 

 gence of cert. series involving the Foiu-ier const. 

 of a funct., 8 S. — Classes of summable functs. 

 &. their Fourier series, 5 S. — The m^tiplicat. 

 of success. of Fourier const., 9 S. (87, 12). — 

 The new theory of integrat., 8 S. — The for- 

 mat. of usually convergent Fourier series, 10 S. 



— Fourier series & functs. of bounded variat., 

 8 S. — A condit. that a trigonometrical series 

 should have a certain form, 6 S. (88, 13). -_ — 

 Trigonometrical series whose Cesäro partial 

 summats. oscillate finitely, 8 S. (89, 13/14). — 

 The existence of converging sequences in cert. 

 oscillating success. of functs., 4 S. (92, 16). — 

 Multiple Integrals, 14 S. — The order of magni- 

 tude of the coef ficients of a Fourier series, 1 4 S. 



— The ordinary convergence of restricted Fou- 

 rier series, 17 S. — The meth. of approach at 

 zero of the coef ficients of a Fourier series, 13 S. 

 (93, 17). — The series of Legendre, 4 S. (94, 

 18). — The Cesäro convergence of restricted 

 Fourier series, 8 S. — Non-harmonic trigono- 

 metrical series, 13 S. (95, 19). — The area of 

 surfaces, HS.— Change of the independent 

 variables in a multiple integral, 10 S. (96, 20). 

 The transformat. of Integrals, 5 S. (99, 21). 



