my thesis over 340 pages on Henstockkurzweil integral in abstract approach conducts treatment of fubini theorem also henstock kurzweil integral right from the beginni is treat3ed on R = [-infinity infinity] and Rn and now i also have Rs where s can be countable or uncountable infinite. it carries riemmann sum convergence theorem generalized Lebesgue dominated convergence. In fact now i have a generalized Fatous lemma for arbitrary functions and generalized monotone convergence theorem mean value theorem which gives as a corollary Lagrange's mean value theorem  . thesis can be downloaded from UGC india website. you can get it by email from me mail [email protected] thesis is refereed by Mudlowney a student of Henstock

My Ph.D. thesis (over 340 pages), Henstock–Kurzweil Integral in Abstract Set Up,, conducts treatment of Fubini theorem. Also Henstock–Kurzweil integral right from the beginning is treated on $\mathbb{R} = [-\infty, \infty]$ and $\mathbb{R}^n$, and now I also have $\mathbb{R}^s$ where $s$ can be countable or uncountable infinite. It carries the Riemmann sum convergence theorem and generalized Lebesgue dominated convergence. In fact now I have a generalized Fatou's lemma for arbitrary functions and a generalized monotone convergence theorem mean value theorem which gives as a corollary Lagrange's mean value theorem. My thesis can be downloaded from UGC india website. You can get it by email from me; mail [email protected] The thesis is refereed by Muldowney, a student of Henstock.