Approximations by the Cauchy-type integrals with piecewise linear densities

Jaroslav Drobek

Applications of Mathematics (2012)

  • Volume: 57, Issue: 6, page 627-640
  • ISSN: 0862-7940

Abstract

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The paper is a contribution to the complex variable boundary element method, shortly CVBEM. It is focused on Jordan regions having piecewise regular boundaries without cusps. Dini continuous densities whose modulus of continuity ω ( · ) satisfies lim sup s 0 ω ( s ) ln 1 s = 0 are considered on these boundaries. Functions satisfying the Hölder condition of order α , 0 < α 1 , belong to them. The statement that any Cauchy-type integral with such a density can be uniformly approximated by a Cauchy-type integral whose density is a piecewise linear interpolant of the original one is proved under the assumption that the mesh of the interpolation nodes is sufficiently fine and uniform. This result ensures the existence of approximate CVBEM solutions of some planar boundary value problems, especially of the Dirichlet ones.

How to cite

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Drobek, Jaroslav. "Approximations by the Cauchy-type integrals with piecewise linear densities." Applications of Mathematics 57.6 (2012): 627-640. <http://eudml.org/doc/246324>.

@article{Drobek2012,
abstract = {The paper is a contribution to the complex variable boundary element method, shortly CVBEM. It is focused on Jordan regions having piecewise regular boundaries without cusps. Dini continuous densities whose modulus of continuity $\omega (\cdot )$ satisfies \[ \limsup \_\{s\downarrow 0\}\omega (s)\ln \frac\{1\}\{s\}=0 \] are considered on these boundaries. Functions satisfying the Hölder condition of order $\alpha $, $0<\alpha \le 1$, belong to them. The statement that any Cauchy-type integral with such a density can be uniformly approximated by a Cauchy-type integral whose density is a piecewise linear interpolant of the original one is proved under the assumption that the mesh of the interpolation nodes is sufficiently fine and uniform. This result ensures the existence of approximate CVBEM solutions of some planar boundary value problems, especially of the Dirichlet ones.},
author = {Drobek, Jaroslav},
journal = {Applications of Mathematics},
keywords = {Cauchy-type integral; Dini continuous density; piecewise linear interpolation; uniform convergence; complex variable boundary element method; Cauchy-type integral; Dini continuous density; piecewise linear interpolation; uniform convergence; complex variable boundary element method},
language = {eng},
number = {6},
pages = {627-640},
publisher = {Institute of Mathematics, Academy of Sciences of the Czech Republic},
title = {Approximations by the Cauchy-type integrals with piecewise linear densities},
url = {http://eudml.org/doc/246324},
volume = {57},
year = {2012},
}

TY - JOUR
AU - Drobek, Jaroslav
TI - Approximations by the Cauchy-type integrals with piecewise linear densities
JO - Applications of Mathematics
PY - 2012
PB - Institute of Mathematics, Academy of Sciences of the Czech Republic
VL - 57
IS - 6
SP - 627
EP - 640
AB - The paper is a contribution to the complex variable boundary element method, shortly CVBEM. It is focused on Jordan regions having piecewise regular boundaries without cusps. Dini continuous densities whose modulus of continuity $\omega (\cdot )$ satisfies \[ \limsup _{s\downarrow 0}\omega (s)\ln \frac{1}{s}=0 \] are considered on these boundaries. Functions satisfying the Hölder condition of order $\alpha $, $0<\alpha \le 1$, belong to them. The statement that any Cauchy-type integral with such a density can be uniformly approximated by a Cauchy-type integral whose density is a piecewise linear interpolant of the original one is proved under the assumption that the mesh of the interpolation nodes is sufficiently fine and uniform. This result ensures the existence of approximate CVBEM solutions of some planar boundary value problems, especially of the Dirichlet ones.
LA - eng
KW - Cauchy-type integral; Dini continuous density; piecewise linear interpolation; uniform convergence; complex variable boundary element method; Cauchy-type integral; Dini continuous density; piecewise linear interpolation; uniform convergence; complex variable boundary element method
UR - http://eudml.org/doc/246324
ER -

References

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  2. II, T. V. Hromadka, Lai, C., The Complex Variable Boundary Element Method in Engineering Analysis, Springler New York (1987). (1987) 
  3. Whitley, R. J., II, T. V. Hromadka, 10.1016/j.enganabound.2006.08.002, Eng. Anal. Bound. Elem. 30 (2006), 1020-1024. (2006) MR1483319DOI10.1016/j.enganabound.2006.08.002
  4. Whitley, R. J., II, T. V. Hromadka, 10.1002/(SICI)1098-2426(199611)12:6<719::AID-NUM5>3.0.CO;2-V, Numer. Methods Partial Differ. Equations 12 (1996), 719-727. (1996) MR1419772DOI10.1002/(SICI)1098-2426(199611)12:6<719::AID-NUM5>3.0.CO;2-V
  5. Lu, J. K., Boundary Value Problems for Analytic Functions, World Scientific Publishing Company Singapore (1993). (1993) Zbl0818.30027MR1279172
  6. Privalov, I. I., The boundary properties of analytical functions, CITTL Moscow (1950), Russian. (1950) MR0047765
  7. Muskhelishvili, N. I., Singular integral equations, Fizmatgiz Moscow (1962), Russian. (1962) Zbl0103.07502MR0355494

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