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converge quasi uniformly
a quasi-uniformly convergent net of quasi-continuous functions is quasi- continuous. ... f ∈ F, then each subnet of π converge quasi-uniformly to f;. [c3] If π : A ...
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is said to be quasi-uniformly convergent to f(x) on S if it converges to f(x) and if, for given positive and integer N, there is a finite number of indices n, n,..., n>_N ...
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Let si be a von Neumann algebra and let (An) a si be a bounded sequence. The sequence (An) is said to converge to A e si quasi-uniformly if for every non-zero ...
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Example 1.1 in [1] shows that (1) is not true for pointwise or quasiuniform. convergence. We recall that a sequence (f n), f n : X !Y quasiuniformly converges ...
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Example 1.1 in 1] shows that (1) is not true for pointwise or quasiuniform convergence. We recall that a sequence (fn), fn: X !Y quasiuniformly converges to f : X !Y ...
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converge quasi-uniformly to a function /: [a,b] —» R if fn. —> / (pointwise) and for each e > 0 and a non-negative integer m there exists a p G N such that for ...
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(a n ) C A is said to converge to some. a c A quasi-uniformly in A if, for each non- zero projection. f e A, there exists a non-zero projection e _< f in A such that ...
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A bounded sequence of functions fn is said to be converging quasi-uniformly towards f iff ... A bounded sequence fn converges quasi-uniformly iff there exists a ...
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to show that the sequence in Example 5 converges quasi-uniformly at 0. The foregoing discussion shows that quasi-uniform convergence is sufficient to ...
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and feF belongs to L if and only if there exists a constant a(=f) such that. Ijf-~ll*=0. Suppose that f, fl, f2, ... e F. Then fl, fa, ... converges quasi-uniformly to f if ...
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Did you mean:
converge quasi uniformly
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