In mathematics, Hadamard regularization (also called Hadamard finite part or Hadamard's partie finie) is a method of regularizing divergent integrals by dropping some divergent terms and keeping the finite part, introduced by Hadamard (1923, book III, chapter I, 1932). Riesz (1938, 1949) showed that this can be interpreted as taking the meromorphic continuation of a convergent integral.
exists, then it may be differentiated with respect to x to obtain the Hadamard finite part integral as follows:
Note that the symbols and are used here to denote Cauchy principal value and Hadamard finite-part integrals respectively.
The Hadamard finite part integral above (for a < x < b) may also be given by the following equivalent definitions:
The definitions above may be derived by assuming that the function f (t) is differentiable infinitely many times at t = x for a < x < b, that is, by assuming that f (t) can be represented by its Taylor series about t = x. For details, see Ang (2013). (Note that the term − f (x)/2(1/b − x − 1/a − x) in the second equivalent definition above is missing in Ang (2013) but this is corrected in the errata sheet of the book.)
Integral equations containing Hadamard finite part integrals (with f (t) unknown) are termed hypersingular integral equations. Hypersingular integral equations arise in the formulation of many problems in mechanics, such as in fracture analysis.
Hadamard, Jacques (1923), Lectures on Cauchy's problem in linear partial differential equations, Dover Phoenix editions, Dover Publications, New York, p. 316, ISBN978-0-486-49549-1, JFM 49.0725.04, MR 0051411, Zbl 0049.34805.
Hadamard, J. (1932), Le problème de Cauchy et les équations aux dérivées partielles linéaires hyperboliques (in French), Paris: Hermann & Cie., p. 542, Zbl 0006.20501.
Riesz, Marcel (1949), "L'intégrale de Riemann-Liouville et le problème de Cauchy", Acta Mathematica, 81: 1–223, doi:10.1007/BF02395016, ISSN 0001-5962, MR 0030102, Zbl 0033.27601
January 01, 1970
hadamard, regularization, mathematics, also, called, hadamard, finite, part, hadamard, partie, finie, method, regularizing, divergent, integrals, dropping, some, divergent, terms, keeping, finite, part, introduced, hadamard, 1923, book, chapter, 1932, riesz, 1. In mathematics Hadamard regularization also called Hadamard finite part or Hadamard s partie finie is a method of regularizing divergent integrals by dropping some divergent terms and keeping the finite part introduced by Hadamard 1923 book III chapter I 1932 Riesz 1938 1949 showed that this can be interpreted as taking the meromorphic continuation of a convergent integral If the Cauchy principal value integralC a b f t t x d t for a lt x lt b displaystyle mathcal C int a b frac f t t x dt quad text for a lt x lt b exists then it may be differentiated with respect to x to obtain the Hadamard finite part integral as follows d d x C a b f t t x d t H a b f t t x 2 d t for a lt x lt b displaystyle frac d dx left mathcal C int a b frac f t t x dt right mathcal H int a b frac f t t x 2 dt quad text for a lt x lt b Note that the symbols C displaystyle mathcal C and H displaystyle mathcal H are used here to denote Cauchy principal value and Hadamard finite part integrals respectively The Hadamard finite part integral above for a lt x lt b may also be given by the following equivalent definitions H a b f t t x 2 d t lim e 0 a x e f t t x 2 d t x e b f t t x 2 d t f x e f x e e displaystyle mathcal H int a b frac f t t x 2 dt lim varepsilon to 0 left int a x varepsilon frac f t t x 2 dt int x varepsilon b frac f t t x 2 dt frac f x varepsilon f x varepsilon varepsilon right H a b f t t x 2 d t lim e 0 a b t x 2 f t t x 2 e 2 2 d t p f x 2 e f x 2 1 b x 1 a x displaystyle mathcal H int a b frac f t t x 2 dt lim varepsilon to 0 left int a b frac t x 2 f t t x 2 varepsilon 2 2 dt frac pi f x 2 varepsilon frac f x 2 left frac 1 b x frac 1 a x right right The definitions above may be derived by assuming that the function f t is differentiable infinitely many times at t x for a lt x lt b that is by assuming that f t can be represented by its Taylor series about t x For details see Ang 2013 Note that the term f x 2 1 b x 1 a x in the second equivalent definition above is missing in Ang 2013 but this is corrected in the errata sheet of the book Integral equations containing Hadamard finite part integrals with f t unknown are termed hypersingular integral equations Hypersingular integral equations arise in the formulation of many problems in mechanics such as in fracture analysis Example editConsider the divergent integral 1 1 1 t 2 d t lim a 0 1 a 1 t 2 d t lim b 0 b 1 1 t 2 d t lim a 0 1 a 1 lim b 0 1 1 b displaystyle int 1 1 frac 1 t 2 dt left lim a to 0 int 1 a frac 1 t 2 dt right left lim b to 0 int b 1 frac 1 t 2 dt right lim a to 0 left frac 1 a 1 right lim b to 0 left 1 frac 1 b right infty nbsp Its Cauchy principal value also diverges since C 1 1 1 t 2 d t lim e 0 1 e 1 t 2 d t e 1 1 t 2 d t lim e 0 1 e 1 1 1 e displaystyle mathcal C int 1 1 frac 1 t 2 dt lim varepsilon to 0 left int 1 varepsilon frac 1 t 2 dt int varepsilon 1 frac 1 t 2 dt right lim varepsilon to 0 left frac 1 varepsilon 1 1 frac 1 varepsilon right infty nbsp To assign a finite value to this divergent integral we may consider H 1 1 1 t 2 d t H 1 1 1 t x 2 d t x 0 d d x C 1 1 1 t x d t x 0 displaystyle mathcal H int 1 1 frac 1 t 2 dt mathcal H int 1 1 frac 1 t x 2 dt Bigg x 0 frac d dx left mathcal C int 1 1 frac 1 t x dt right Bigg x 0 nbsp The inner Cauchy principal value is given by C 1 1 1 t x d t lim e 0 1 e 1 t x d t e 1 1 t x d t lim e 0 ln e x 1 x ln 1 x e x ln 1 x 1 x displaystyle mathcal C int 1 1 frac 1 t x dt lim varepsilon to 0 left int 1 varepsilon frac 1 t x dt int varepsilon 1 frac 1 t x dt right lim varepsilon to 0 left ln left frac varepsilon x 1 x right ln left frac 1 x varepsilon x right right ln left frac 1 x 1 x right nbsp Therefore H 1 1 1 t 2 d t d d x ln 1 x 1 x x 0 2 x 2 1 x 0 2 displaystyle mathcal H int 1 1 frac 1 t 2 dt frac d dx left ln left frac 1 x 1 x right right Bigg x 0 frac 2 x 2 1 Bigg x 0 2 nbsp Note that this value does not represent the area under the curve y t 1 t2 which is clearly always positive References editAng Whye Teong 2013 Hypersingular Integral Equations in Fracture Analysis Oxford Woodhead Publishing pp 19 24 ISBN 978 0 85709 479 7 Ang Whye Teong Errata Sheet for Hypersingular Integral Equations in Fracture Analysis PDF Blanchet Luc Faye Guillaume 2000 Hadamard regularization Journal of Mathematical Physics 41 11 7675 7714 arXiv gr qc 0004008 Bibcode 2000JMP 41 7675B doi 10 1063 1 1308506 ISSN 0022 2488 MR 1788597 Zbl 0986 46024 Hadamard Jacques 1923 Lectures on Cauchy s problem in linear partial differential equations Dover Phoenix editions Dover Publications New York p 316 ISBN 978 0 486 49549 1 JFM 49 0725 04 MR 0051411 Zbl 0049 34805 Hadamard J 1932 Le probleme de Cauchy et les equations aux derivees partielles lineaires hyperboliques in French Paris Hermann amp Cie p 542 Zbl 0006 20501 Riesz Marcel 1938 Integrales de Riemann Liouville et potentiels Acta Litt Ac Sient Univ Hung Francisco Josephinae Sec Sci Math Szeged in French 9 1 1 1 42 JFM 64 0476 03 Zbl 0018 40704 archived from the original on 2016 03 05 retrieved 2012 06 22 Riesz Marcel 1938 Rectification au travail Integrales de Riemann Liouville et potentiels Acta Litt Ac Sient Univ Hung Francisco Josephinae Sec Sci Math Szeged in French 9 2 2 116 118 JFM 65 1272 03 Zbl 0020 36402 archived from the original on 2016 03 04 retrieved 2012 06 22 Riesz Marcel 1949 L integrale de Riemann Liouville et le probleme de Cauchy Acta Mathematica 81 1 223 doi 10 1007 BF02395016 ISSN 0001 5962 MR 0030102 Zbl 0033 27601 Retrieved from https en wikipedia org w index php title Hadamard regularization amp oldid 1201491584, wikipedia, wiki, book, books, library,
