Authors: Tuo-Yeong, Lee

Superior Title: Analysis. 28(2):263-268

Availability: https://www.degruyter.com/document/doi/10.1524/anly.2008.0912/html

Authors: TUO-YEONG, LEE

Superior Title: The Rocky Mountain Journal of Mathematics, 2005 Jan 01. 35(6), 1981-1997.

Access URL: https://www.jstor.org/stable/44238790

Authors: TUO-YEONG, LEE

Superior Title: The Rocky Mountain Journal of Mathematics, 2004 Dec 01. 34(4), 1353-1365.

Access URL: https://www.jstor.org/stable/44239035

Authors: Tuo-Yeong, Lee

Superior Title: Real Analysis Exchange, 2000 Jan 01. 26(2), 943-946.

Access URL: https://www.jstor.org/stable/44154094

Authors: Tuo-Yeong, Lee

Superior Title: Real Analysis Exchange, 1998 Jan 01. 24(1), 149-160.

Access URL: https://www.jstor.org/stable/44152945

Authors: Tuo-Yeong, Lee, Tuan-Seng, Chew, Peng-Yee, Lee

Superior Title: Real Analysis Exchange, 1996 Jan 01. 22(1), 382-389.

Access URL: https://www.jstor.org/stable/44152760

Authors: Tuo-Yeong, Lee

Superior Title: Analysis Mathematica. September 2010 36(3):219-223

Authors: Weng Kin Ho, Foo Him Ho, Tuo Yeong Lee

Contributors: The Pennsylvania State University CiteSeerX Archives

Superior Title: http://math.nie.edu.sg/wkho/Research/My%20publications/Math%20Education/exponential.pdf.

File Description: application/pdf

Relation: http://citeseerx.ist.psu.edu/viewdoc/summary?doi=10.1.1.1051.7319; http://math.nie.edu.sg/wkho/Research/My%20publications/Math%20Education/exponential.pdf

Availability: http://math.nie.edu.sg/wkho/Research/My%20publications/Math%20Education/exponential.pdf

Authors: Tuo-Yeong, Lee

Superior Title: Czechoslovak Mathematical Journal. September 2005 55(3):625-637

Authors: Tuo-Yeong, Lee

Superior Title: Czechoslovak Mathematical Journal. September 2004 54(3):657-674

Authors: Tuo-Yeong, Lee

Subject Terms: Articles

File Description: text/html

Relation: http://plms.oxfordjournals.org/cgi/content/short/87/3/677; http://dx.doi.org/10.1112/S0024611503014163

Availability: https://doi.org/10.1112/S0024611503014163
http://plms.oxfordjournals.org/cgi/content/short/87/3/677

Authors: DONG JUN JEE¹ h1130010@nushigh.edu.sg, TUO YEONG LEE¹ nhsleety@nus.edu.sg, NATHANIEL ZHI-WEI LEON¹ h0910083@nhshigh.edu.sg

Superior Title: Proceedings of the Indian Academy of Sciences: Mathematical Sciences. May2016, Vol. 126 Issue 2, p207-212. 6p.

Subject Terms: *ADDITION (Mathematics), *STOCHASTIC convergence, *STOCHASTIC processes, *ASYMPTOTIC expansions, *BERNSTEIN polynomials

Authors: Tuo-Yeong, Lee, Tuan-Seng, Chew, Peng-Yee, Lee

Superior Title: Bulletin of the Australian Mathematical Society ; volume 54, issue 3, page 441-449 ; ISSN 0004-9727 1755-1633

Subject Terms: General Mathematics

Availability: https://doi.org/10.1017/s0004972700021857
https://www.cambridge.org/core/services/aop-cambridge-core/content/view/S0004972700021857

Authors: Fengming, Dong, Weng Kin, Ho, Tuo Yeong, Lee

Superior Title: The College Mathematics Journal ; volume 44, issue 1, page 43-47 ; ISSN 0746-8342 1931-1346

Subject Terms: Education, General Mathematics

Availability: https://doi.org/10.4169/college.math.j.44.1.043

Authors: Tuo Yeong Lee

Resource Type: eBook.

Subjects: Calculus, Integral, Henstock-Kurzweil integral, Lebesgue integral

Categories: MATHEMATICS / Mathematical Analysis, MATHEMATICS / Calculus, MATHEMATICS / Geometry / General

Authors: TUO–YEONG, LEE

Superior Title: Mathematical Proceedings of the Cambridge Philosophical Society ; volume 138, issue 3, page 487-492 ; ISSN 0305-0041 1469-8064

Subject Terms: General Mathematics

Availability: https://doi.org/10.1017/s030500410500839x
https://www.cambridge.org/core/services/aop-cambridge-core/content/view/S030500410500839X

Authors: Tuo-Yeong, Lee

Subject Terms: Finite signed Borel measure, BV-integral, 46E99, 26E99

File Description: application/pdf

Availability: http://projecteuclid.org/euclid.rae/1122482138

Authors: Tuo-Yeong, Lee

Subject Terms: keyword:strong $\rho $-integral, keyword:multipliers, keyword:dual space, msc:26A39, msc:46E99, msc:46G10

File Description: application/pdf

Relation: mr:MR2086723; zbl:Zbl 1080.26007; reference:[1] A. Alexiewicz: Linear functionals on Denjoy-integrable functions.Colloq. Math. 1 (1948), 289–293. Zbl 0037.32302, MR 0030120, 10.4064/cm-1-4-289-293; reference:[2] R. A. Gordon: The Integrals of Lebesgue.Denjoy, Perron, and Henstock, Graduate Studies in Mathematics Volume 4, AMS, 1994. Zbl 0807.26004, MR 1288751; reference:[3] J. Jarník and Kurzweil: Perron-type integration on $n$-dimensional intervals and its properties.Czechoslovak Math. J. 45 (120) (1995), 79–106. MR 1314532; reference:[4] J. Kurzweil: On multiplication of Perron integrable functions.Czechoslovak Math. J. 23 (98) (1973), 542–566. Zbl 0269.26007, MR 0335705; reference:[5] J. Kurzweil and J. Jarník: Perron-type integration on $n$-dimensional intervals as an extension of integration of stepfunctions by strong equiconvergence.Czechoslovak Math. J. 46 (121) (1996), 1–20. MR 1371683; reference:[6] Lee Peng Yee: Lanzhou Lectures on Henstock integration.World Scientific, 1989. Zbl 0699.26004, MR 1050957; reference:[7] Lee Peng Yee and Rudolf Výborný: The integral: An Easy Approach after Kurzweil and Henstock.Australian Mathematical Society Lecture Series 14, Cambridge University Press, 2000. MR 1756319; reference:[8] Lee Tuo Yeong, Chew Tuan Seng and Lee Peng Yee: Characterisation of multipliers for the double Henstock integrals.Bull. Austral. Math. Soc. 54 (1996), 441–449. MR 1419607, 10.1017/S0004972700021857; reference:[9] Lee Tuo Yeong: Multipliers for some non-absolute integrals in the Euclidean spaces.Real Anal. Exchange 24 (1998/99), 149–160. MR 1691742; reference:[10] G. Q. Liu: The dual of the Henstock-Kurzweil space.Real Anal. Exchange 22 (1996/97), 105–121. MR 1433600; reference:[11] E. J. McShane: Integration.Princeton Univ. Press, 1944. Zbl 0060.13010, MR 0082536; reference:[12] Piotr Mikusiński and K. Ostaszewski: The space of Henstock integrable functions II.In: New integrals. Proc. Henstock Conf., Coleraine / Ireland, P. S. Bullen, P. Y. Lee, J. L. Mawhin, P. Muldowney and W. F. Pfeffer (eds.), 1988.; reference:[13] K. M. Ostaszewski: The space of Henstock integrable functions of two variables.Internat. J. Math. Math. Sci. 11 (1988), 15–22. Zbl 0662.26003, MR 0918213, 10.1155/S0161171288000043; reference:[14] S. Saks: Theory of the Integral, second edition.New York, 1964 63.0183.05. MR 0167578; reference:[15] W. L. C. Sargent: On the integrability of a product.J. London Math. Soc. 23 (1948), 28–34. Zbl 0031.29201, MR 0026113, 10.1112/jlms/s1-23.1.28; reference:[16] W. H. Young: On multiple integration by parts and the second theorem of the mean.Proc. London Math. Soc. 16 (1918), 273–293.

Availability: http://hdl.handle.net/10338.dmlcz/127918

Authors: Jitan, Lu, Peng-Yee, Lee, Tuo-Yeong, Lee

Subject Terms: Henstock integral, Denjoy integral, Cantor set, 26A39

File Description: application/pdf

Availability: http://projecteuclid.org/euclid.rae/1212412863

Authors: TUO YEONG LEE, ZHI-WEI LEON, NATHANIEL, DONG JUN JEE

Superior Title: Mathematical Gazette; Jul2015, Vol. 99 Issue 545, p328-331, 4p

Subject Terms: MATHEMATICAL sequences, REAL numbers, MATHEMATICS theorems