皮爾西積分

皮爾西積分(Pearcey Integral)是一種在論述光的傳播、光的繞射、分岔理論、突變理論以及關於特殊函數的漸進展開式的研究中常見的多鞍點積分，其定義為^[1]

${\displaystyle P(x,y)=\int _{-\infty }^{\infty }\exp(I*(t^{4}+x*t^{2}+y*t))}$

=${\displaystyle {-(1/2)*{\sqrt {(}}Pi)*exp(-(1/4*I)*y^{2}/x)*(limit(exp(I*t^{4})*erf(I*x*t/{\sqrt {(}}-I*x)+(1/2*I)*y/{\sqrt {(}}-I*x)),t=infinity))/{\sqrt {(}}-I*x)+(1/2)*{\sqrt {(}}Pi)*exp(-(1/4*I)*y^{2}/x)*(limit(exp(I*t^{4})*erf(I*x*t/{\sqrt {(}}-I*x)+(1/2*I)*y/{\sqrt {(}}-I*x)),t=-infinity))/{\sqrt {(}}-I*x)+(2*I)*{\sqrt {(}}Pi)*exp(-(1/4*I)*y^{2}/x)*(int(exp(I*t^{4})*erf(I*x*t/{\sqrt {(}}-I*x)+(1/2*I)*y/{\sqrt {(}}-I*x))*t^{3},t=-infinity..infinity))/{\sqrt {(}}-I*x)}}$

對於大的${\displaystyle |x|}$,皮爾遜積分的被積分函數左右各有三個鞍點^[2]。

在右平面的鞍點是

${\displaystyle rs1:=-(1/3)*{\sqrt {(}}6)*sinh((1/3)*arcsinh((3/4)*y*{\sqrt {(}}2)*{\sqrt {(}}3)/x^{(}3/2)))}$

${\displaystyle rs2:=(1/3)*{\sqrt {(}}6)*sinh((1/3)*arcsinh((3/4)*y*{\sqrt {(}}2)*{\sqrt {(}}3)/x^{(}3/2))+(1/3*I)*Pi)}$

${\displaystyle s3:=-(1/3*I)*{\sqrt {(}}6)*cosh((1/3)*arcsinh((3/4)*y*{\sqrt {(}}2)*{\sqrt {(}}3)/x^{(}3/2))+(1/6*I)*Pi)}$

左平面的鞍點是：

${\displaystyle ls1:=-(1/3)*{\sqrt {(}}6)*sin((1/3)*arcsin((3/4)*y*{\sqrt {(}}2)*{\sqrt {(}}3)/x^{(}3/2))+(1/3)*Pi)}$

${\displaystyle ls3:=(1/3)*{\sqrt {(}}6)*cos((1/3)*arcsin((3/4)*y*{\sqrt {(}}2)*{\sqrt {(}}3)/x^{(}3/2))+(1/6)*Pi)}$

${\displaystyle ls2:=(1/3)*{\sqrt {(}}6)*sin((1/3)*arcsin((3/4)*y*{\sqrt {(}}2)*{\sqrt {(}}3)/x^{(}3/2)))}$

皮爾西積分的分岔曲線為^[3]

${\displaystyle 27*x^{2}=-8y^{3}}$

皮爾西積分的斯托克斯曲線為^[4]

${\displaystyle y^{3}={\frac {27}{4}}({\sqrt {(}}27)-5)x^{2}}$

在（x,y)平面中，分岔曲線和斯托克斯曲線將平面分化為尖點突變區。^[5]

1. ^ Paris,Hyperasymtotic Evaluation,p438
2. ^ Paris p438-439
3. ^ Frank Oliver, p781
4. ^ Frank, p783
5. ^ Frank p784

• Frank Oliver, NIST Handbook of Mathematical Functions,2010,Cambridge University Press.
• R.B. Paris,D. Kaminski,Hyperasymptotic evaluation of the Pearcey integral via

Hadamard expansions.Journal of Computational and Applied Mathematics 190 (2006) 437–452