2005
DOI: 10.1081/nfa-200052014
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APPROXIMATION BY POSITIVE OPERATORS OF THE C0–SEMIGROUPS ASSOCIATED WITH ONE-DIMENSIONAL DIFFUSION EQUATIONS: PART I

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Cited by 7 publications
(17 citation statements)
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“…By using Proposition 3.2 of [1] it is easy to obtain the following result. We omit the details for the sake of brevity.…”
Section: Modified Szász-mirakjan Operatorsmentioning
confidence: 94%
See 1 more Smart Citation
“…By using Proposition 3.2 of [1] it is easy to obtain the following result. We omit the details for the sake of brevity.…”
Section: Modified Szász-mirakjan Operatorsmentioning
confidence: 94%
“…To show the assertion we shall apply Theorem 4.1 in [1]. Note that e 1 , e 2 ∈ E m and β k e j ∈ E m−k+ j for j + k ≤ 4, because (25) implies |β k e j | ≤ |β e j+k−1 | and β e 3 ∈ E m .…”
Section: Proofmentioning
confidence: 96%
“…In the spirit of [2] we shall modify the operators G n , in order to obtain a further positive approximation process on C w 0 (R), which satisfies an asymptotic formula generating a complete second order differential operator on the real line (see Theorem 5.2).…”
Section: Modifying the Integral Operators G Nmentioning
confidence: 99%
“…In this section, by adapting an idea first developed in [3] (see also [9]), we introduce and study a modification of Bernstein-Schnabl operators. Such a modification will be shown to provide us with an efficient tool to approximate the Feller semigroup generated by (the closure of) a first-order additive perturbation of the differential operator (2.8), which in turn will enter into play when we shall investigate an asymptotic formula for our operators.…”
Section: Modified Bernstein-schnabl Operatorsmentioning
confidence: 99%
“…As regards the contents of the paper, we start by introducing and studying an approximation process (M n ) n ≥n 0 on C(K) obtained as a modification of the Bernstein-Schnabl operators, according to a general method introduced in [3] (see also [9]). …”
Section: Introductionmentioning
confidence: 99%