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關鍵詞:綫性與非綫性Volterra方程,綫性與非綫性Fredholm方程,綫性與非綫性奇異方程,積分方程組。Nonlinear Physical Science focuses on the recent a dvances of fundamental theories and principles, analytical and symbolic approaches, as well as computational techniques in nonlinear physical science and nonlinear mathematics with engineering applications.
內容簡介
《綫性與非綫性積分方程:方法及應用》是一本同時介紹綫性和非綫性積分方程的教材,分成兩部分,各部分自成體係。第一部分主要對第一類、第二類綫性積分方程進行瞭係統、深入的分析並提供各種解法;第二部分主要講述非綫性積分方程求解及其應用,針對不適定fredholm問題、分歧點和奇異點等問題進行瞭係統的分析,並提供易於理解的處理方法。
《綫性與非綫性積分方程:方法及應用》通過大量的例子講述綫性與非綫性積分方程新發展起來的高效解法,無須要求讀者對抽象理論本身有很深的理解,同時也討論瞭某些經典方法一些有價值的改進。書中對這些方法都給齣瞭很好的解釋,並通過對這些方法進行對比,使得讀者能夠快速地掌握並選擇可行且高效的方法。《綫性與非綫性積分方程:方法及應用》提供瞭大量的習題,並在書後附有答案。
《綫性與非綫性積分方程:方法及應用》可作為應用數學、工程學及其相關專業的高年級本科生和研究生教材,也可供相關領域的工程師參考。
內頁插圖
目錄
part i linear integral equations
1 preliminaries
1.1 taylor series
1.2 ordinary differential equations
1.3 leibnitz rule for differentiation of integrals
1.4 reducing multiple integrals to single integrals
1.5 laplace transform
1.6 infinite geometric series
references
2 introductory concepts of integral equations
2.1 classification of integral equations
2.2 classification of integro-differential equations
2.3 linearity and homogeneity
2.4 origins of integral equations
2.5 converting ivp to volterra integral equation
2.6 converting bvp to fredholm integral equation
2.7 solution of an integral equation
references
3 volterra integral equations
3.1 introduction
3.2 volterra integral equations of the second kind
3.3 volterra integral equations of the first kind references
4 fredholm integral equations
4.1 introduction
4.2 fredholm integral equations of the second kind
4.3 homogeneous fredholm integral equation
4.4 fredholm integral equations of the first kind
references
5 volterra integro-differential equations
5.1 introduction
5.2 volterra integro-differential equations of the second kind
5.3 volterra integro-differential equations of the first kind
references
6 fredholm integro-differential equations
6.1 introduction
6.2 fredholm integro-differential equations of the second kind
references
7 abel's integral equation and singular integral equations
7.1 introduction
7.2 abel's integral equation
7.3 the generalized abel's integral equation
7.4 the weakly singular volterra equations
References
8 volterra-fredholm integral equations
8.1 introduction
8.2 the volterra-fredholm integral equations
8.3 the mixed volterra-fredholm integral equations
8.4 the mixed volterra-fredholm integral equations in two variables
references
9 volterra-fredholm integro-differential equations
9.1 introduction
9.2 the volterra-fredholm integro-differential equation
9.3 the mixed volterra-fredholm integro-differential equations
9.4 the mixed volterra-fredholm integro-differential equations in two variables
references
10 systems of volterra integral equations
10.1 introduction
10.2 systems of volterra integral equations of the second kind
10.3 systems of volterra integral equations of the first kind
10.4 systems of volterra integro-differential equations
references
11 systems of fredholm integral equations
11.1 introduction
11.2 systems of fredholm integral equations
11.3 systems of fredholm integro-differential equations
references
12 systems of singular integral equations
12.1 introduction
12.2 systems of generalized abel integral equations
12.3 systems of the weakly singular volterra integral equations
references
part ii nonlinear integral equations
13 nonlinear volterra integral equations
13.1 introduction
13.2 existence of the solution for nonlinear volterra integral equations
13.3 nonlinear volterra integral equations of the second kind
13.4 nonlinear volterra integral equations of the first kind
13.5 systems of nonlinear volterra integral equations
references
14 nonlinear volterra integro-differential equations
14.1 introduction
14.2 nonlinear volterra integro-differential equations of the second kind
14.3 nonlinear volterra integro-differential equations of the first kind
14.4 systems of nonlinear volterra integro-differential equations
references
15 nonlinear fredholm integral equations
15.1 introduction
15.2 existence of the solution for nonlinear fredholm integral equations
15.3 nonlinear fredholm integral equations of the second kind
15.4 homogeneous nonlinear fredholm integral equations
15.5 nonlinear fredholm integral equations of the first kind
15.6 systems of nonlinear fredholm integral equations
references
16 nonlinear fredholm integro-differential equations
16.1 introduction
16.2 nonlinear fredholm integro-differential equations.
16.3 homogeneous nonlinear fredholm integro-differential equations
16.4 systems of nonlinear fredholm integro-differential equations
references
17 nonlinear singular integral equations
17.1 introduction
17.2 nonlinear abel's integral equation
17.3 the generalized nonlinear abel equation
17.4 the nonlinear weakly-singular volterra equations
17.5 systems of nonlinear weakly-singular volterra integral equations
references
18 applications of integral equations
18.1 introduction
18.2 volterra's population model
18.3 integral equations with logarithmic kernels
18.4 the fresnel integrals
18.5 the thomas-fermi equation
18.6 heat transfer and heat radiation
references
appendix a table of indefinite integrals
a.1 basic forms
a.2 trigonometric forms
a.3 inverse trigonometric forms
a.4 exponential and logarithmic forms
a.5 hyperbolic forms
a.6 other forms
appendix b integrals involving irrational algebraic functions
b.1 integrals involving n is an integer, n ≥ 0
b.2 integrals involving n is an odd integer, n ≥ i
appendix c series representations
c.1 exponential functions series
c.2 trigonometric functions
c.3 inverse trigonometric functions
c.4 hyperbolic functions
c.5 inverse hyperbolic functions
c.6 logarithmic functions
appendix d the error and the complementary error
functions
d.1 the error function
d.2 the complementary error function
appendix e gamma function
appendix f infinite series
f.1 numerical series
f.2 trigonometric series
appendix g the fresnel integrals
g.1 the fresnel cosine integral
g.2 the fresnel sine integral
answers
index
精彩書摘
Integral equations and in tegro-differential equations will be classified in to distinct types according to the limits of integration and the kernel K(x, t).Alltypes of integral equations and in tegro differential equations will be classifiedand investigated in the forthcoming chapters.
In this chapter, we will review the most important concepts needed to study integral equations. The traditional methods, such as Taylor seriesmethod and the Laplace transform method, will be used in this text. More-over, the recently developed methods, that will be used thoroughly in this text, will determine the solution in a power series that will converge to an exact solution if such a solution exists. However, if exact solution does not exist, we use as many terms of the obtained series for numerical purposes to approximate the solution.
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