Convergenza in variazione con peso e uniforme convergenza
We study, for functions , some conditions of uniform and uniform almost everywhere convergence, after pointing out the indipendence from weight of convergence in variation.
We study, for functions , some conditions of uniform and uniform almost everywhere convergence, after pointing out the indipendence from weight of convergence in variation.
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.
This paper completes and improves results of [10]. Let , be two metric spaces and be the space of all -valued continuous functions whose domain is a closed subset of . If is a locally compact metric space, then the Kuratowski convergence and the Kuratowski convergence on compacta coincide on . Thus if and are boundedly compact metric spaces we have the equivalence of the convergence in the Attouch-Wets topology (generated by the box metric of and ) and convergence on ,...
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