On the polarization matrix for a perforated strip

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On the polarization matrix for a perforated strip. / Nazarov, Sergey A. ; Orive-Illera, Rafael ; Perez-Martinez, María-Eugenia .

Integral Methods in Science and Engineering : Analytic Treatment and Numerical Approximations. 2019. p. 267-281.

Research output: Chapter in Book/Report/Conference proceeding › Conference contribution

Harvard

Nazarov, SA, Orive-Illera, R & Perez-Martinez, M-E 2019, On the polarization matrix for a perforated strip. in Integral Methods in Science and Engineering : Analytic Treatment and Numerical Approximations. pp. 267-281.

APA

Nazarov, S. A., Orive-Illera, R., & Perez-Martinez, M-E. (2019). On the polarization matrix for a perforated strip. In Integral Methods in Science and Engineering : Analytic Treatment and Numerical Approximations (pp. 267-281)

Vancouver

Nazarov SA, Orive-Illera R, Perez-Martinez M-E. On the polarization matrix for a perforated strip. In Integral Methods in Science and Engineering : Analytic Treatment and Numerical Approximations. 2019. p. 267-281

Author

Nazarov, Sergey A. ; Orive-Illera, Rafael ; Perez-Martinez, María-Eugenia . / On the polarization matrix for a perforated strip. Integral Methods in Science and Engineering : Analytic Treatment and Numerical Approximations. 2019. pp. 267-281

BibTeX

@inproceedings{30baee56b07847df9cee8deb26ffebc5,

title = "On the polarization matrix for a perforated strip",

abstract = "We consider a boundary value problem for the harmonic functions in an unbounded perforated strip Π∖ω¯¯¯ , ω being the “Dirichlet hole”, namely a bounded Lipschitz domain of R , where a Dirichlet condition is prescribed. The other boundary conditions are periodicity conditions on the lateral boundary of Π = (0, H) × (−∞, ∞). We study properties of the coefficients of the so-called polarization matrix, while we highlight the dependence of these coefficients on the dimensions of the hole by means of two examples.",

author = "Nazarov, {Sergey A.} and Rafael Orive-Illera and Mar{\'i}a-Eugenia Perez-Martinez",

note = "Nazarov S.A., Orive-Illera R., P{\'e}rez-Mart{\'i}nez ME. (2019) On the Polarization Matrix for a Perforated Strip. In: Constanda C., Harris P. (eds) Integral Methods in Science and Engineering. Birkh{\"a}user, Cham. https://doi.org/10.1007/978-3-030-16077-7_21",

year = "2019",

language = "English",

isbn = "9783030160760",

pages = "267--281",

booktitle = "Integral Methods in Science and Engineering",

}

RIS

TY - GEN

T1 - On the polarization matrix for a perforated strip

AU - Nazarov, Sergey A.

AU - Orive-Illera, Rafael

AU - Perez-Martinez, María-Eugenia

N1 - Nazarov S.A., Orive-Illera R., Pérez-Martínez ME. (2019) On the Polarization Matrix for a Perforated Strip. In: Constanda C., Harris P. (eds) Integral Methods in Science and Engineering. Birkhäuser, Cham. https://doi.org/10.1007/978-3-030-16077-7_21

PY - 2019

Y1 - 2019

N2 - We consider a boundary value problem for the harmonic functions in an unbounded perforated strip Π∖ω¯¯¯ , ω being the “Dirichlet hole”, namely a bounded Lipschitz domain of R , where a Dirichlet condition is prescribed. The other boundary conditions are periodicity conditions on the lateral boundary of Π = (0, H) × (−∞, ∞). We study properties of the coefficients of the so-called polarization matrix, while we highlight the dependence of these coefficients on the dimensions of the hole by means of two examples.

AB - We consider a boundary value problem for the harmonic functions in an unbounded perforated strip Π∖ω¯¯¯ , ω being the “Dirichlet hole”, namely a bounded Lipschitz domain of R , where a Dirichlet condition is prescribed. The other boundary conditions are periodicity conditions on the lateral boundary of Π = (0, H) × (−∞, ∞). We study properties of the coefficients of the so-called polarization matrix, while we highlight the dependence of these coefficients on the dimensions of the hole by means of two examples.

UR - https://link.springer.com/chapter/10.1007/978-3-030-16077-7_21

M3 - Conference contribution

SN - 9783030160760

SP - 267

EP - 281

BT - Integral Methods in Science and Engineering

ER -

ID: 45517548