5.7 Darboux sums and Riemann integrals 353the interval a<= t =< x. Prove that T(x), P(x), N(x) are all nonnegative and
monotone increasing over a< x < b. Prove that
(4)
(5)
(6)
(7)
(8)T(x) = 2P(x) - [f(x) - f(a)]
T(x) = 2N(x) + [f(x) -f(a)]
T(x) = P(x) + N(x)
f(x) = f(a) + P(x) - N(x)
f(x) _ [x + f(a) + P(x)] - [x + N(x)]when a < x < b. Use our information to prove that if f (x) has bounded variation
over a < x < b [which means that T(b) is finite], then f(x) is the difference of two
increasing functions. Prove that if f(x) is the difference of two increasing func-
tions over a < x < b, then f(x) has bounded variation over a S x 5 b. Hint:
To obtain (4), note that (2) contains a telescopic sum and put (2) in the form(9)^1n
l.u.b. f (x) - f (a)
I 1If(tk) -f(tk-1)I + 2 }= P(x).Remark: Our results and Theorem 5.76 imply that the Riemann integral fab f (x) dx
exists if f has bounded variation over a < x 5 b. Moreover, we now have enough
information to appreciate the most important theorem in the theory of Riemann-
Stieltjes integrals; see Problem 11 of Problems 4.89. The theorem says that(10) fabf(x) dg(x)exists if f is continuous and g has bounded variation over a < x < b. Methods
of this section provide proof for the case in which f is continuous and g is increas-
ing, and the general result is then obtained by expressing g as the difference of
increasing functions. A much more difficult theorem says that if g is such that
(10) exists whenever f is continuous over a - x < b, then g must have bounded
variation over a 5 x < b.