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초록

For a sigma-finite measure mu and a Banach space Y we study the Bishop-Phelps-Bollobas property (BPBP) for bilinear forms on L-1(mu) X Y, that is, a (continuous) bilinear form on L-1(mu) X Y almost attaining its norm at (f(0), y(0)) can be approximated by bilinear forms attaining their norms at unit vectors close to (f(0), y(0)). In case that Y is an Asplund space we characterize the Banach spaces Y satisfying this property. We also exhibit some class of bilinear forms for which the BPBP does not hold, though the set of norm attaining bilinear forms in that class is dense.

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