| Leibniz rule for fractional derivatives generalized and an application to infinite series TJ Osler SIAM Journal on Applied Mathematics 18 (3), 658-674, 1970 | 320 | 1970 |
| Differences of fractional order JB Diaz, TJ Osler Mathematics of Computation 28 (125), 185-202, 1974 | 300 | 1974 |
| Fractional derivatives and special functions JL Lovoie, TJ Osler, R Tremblay SIAM review 18 (2), 240-268, 1976 | 292 | 1976 |
| The fractional derivative of a composite function TJ Osler SIAM Journal on Mathematical Analysis 1 (2), 288-293, 1970 | 176 | 1970 |
| Taylor’s series generalized for fractional derivatives and applications TJ Osler SIAM Journal on Mathematical Analysis 2 (1), 37-48, 1971 | 170 | 1971 |
| Fractional derivatives and Leibniz rule TJ Osler The American Mathematical Monthly 78 (6), 645-649, 1971 | 104 | 1971 |
| A further extension of the Leibniz rule to fractional derivatives and its relation to Parseval’s formula TJ Osler SIAM Journal on Mathematical Analysis 3 (1), 1-16, 1972 | 85 | 1972 |
| A child's garden of fractional derivatives M Kleinz, TJ Osler The College Mathematics Journal 31 (2), 82-88, 2000 | 75 | 2000 |
| The integral analogue of the Leibniz rule TJ Osler Mathematics of Computation 26 (120), 903-915, 1972 | 64 | 1972 |
| The perimeter of an ellipse. TR Chandrupatla, TJ Osler Mathematical Scientist 35 (2), 2010 | 61 | 2010 |
| Fundamental properties of fractional derivatives via Pochhammer integrals JL Lavoie, R Tremblay, TJ Osler Fractional Calculus and Its Applications: Proceedings of the International …, 2006 | 57 | 2006 |
| The union of Vieta's and Wallis's products for pi TJ Osler The American mathematical monthly 106 (8), 774-776, 1999 | 51 | 1999 |
| An integral analogue of Taylor’s series and its use in computing Fourier transforms TJ Osler Mathematics of Computation 26 (118), 449-460, 1972 | 47 | 1972 |
| Cardan polynomials and the reduction of radicals TJ Osler Mathematics Magazine 74 (1), 26-32, 2001 | 38 | 2001 |
| Leibniz Rule, the Chain Rule, and Taylor's Theorem for Fractional Derivatives TJ OSLER New York University, 1970 | 37 | 1970 |
| Finding ζ(2p) From a Product of Sines TJ Osler The American Mathematical Monthly 111 (1), 52-54, 2004 | 29 | 2004 |
| The tautochrone under arbitrary potentials using fractional derivatives E Flores, TJ Osler American Journal of Physics 67 (8), 718-722, 1999 | 27 | 1999 |
| A correction to Leibniz rule for fractional derivatives TJ Osler SIAM Journal on Mathematical Analysis 4 (3), 456-459, 1973 | 24 | 1973 |
| Extending Theon's ladder to any square root S Giberson, TJ Osler College Mathematics Journal, 222-226, 2004 | 16 | 2004 |
| An easy look at the cubic formula TJ Osler Mathematics and Computer Education 36, 287-290, 2002 | 16 | 2002 |
