Weak convergence of linear forms in D[0, 1]

Convergence in probability of the linear forms [Sigma]k=1[infinity] ankXk is obtained in the space D[0, 1], where (Xk) are random elements in D[0, 1] and (ank) is an array of real numbers. These results are obtained under varying hypotheses of boundedness conditions on the moments and conditions on the mean oscillation of the random elements (Xn) on subintervals of a partition of [0, 1]. Since the hypotheses are in general much less restrictive than tightness (or convex tightness), these results represent significant improvements over existing weak laws of large numbers and convergence results for weighted sums of random elements in D[0, 1]. Finally, comparisons to classical hypotheses for Banach space and real-valued results are included.