%AXiaojiang, Tan
%D1991
%I; International Centre for Theoretical Physics (ICTP), Trieste (Italy)
%J
%K71 CLASSICAL AND QUANTUM MECHANICS, GENERAL PHYSICS, VECTORS, IRREDUCIBLE REPRESENTATIONS, MATHEMATICAL SPACE, 661300, OTHER ASPECTS OF PHYSICAL SCIENCE
%PMedium: X; Size: 22 p.
%TOn the existence of n-dimensional indecomposable vector bundles
%XLet X be an arbitrary smooth irreducible complex projective curve of genus g with g {>=} 4. In this paper we extend the existence theorem of special divisors to high dimensional indecomposable vector bundles. We give a necessary and sufficient condition on the existence of n-dimensional indecomposable vector bundles E with deg(E) = d, dimH{sup 0}(X,E) {>=} h. We also determine under what condition the set of all such vector bundles will be finite and how many elements it contains. (author). 9 refs.
%0Technical Report
IAEA Other: ON: DE92615230; TRN: XA9130247015350 INIS English