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We prove the equiabsolute integrability of a class of gradients, for functions in . The present result appears as the localized version of well-known classical theorems.
We present here our most recent results ([1def]) about the definition of non-linear Weiertrass-type integrals over BV varieties, possibly discontinuous and not necessarily Sobolev's.
We show how a problem connected with the Burkill-Cesari integral can be solved by making use of a convergence theorem for a suitable martingale.
We present here our most recent results ([1def]) about the definition of non-linear Weiertrass-type integrals over BV varieties, possibly discontinuous and not necessarily Sobolev's.
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