영어에서 Integral equations 을 사용하는 예와 한국어로 번역
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Integral equations and numerical methods.
He wrote an important text on integral equations.
His first book Singular integral equations with real and symmetric kernel published in 1923 became fundamental.
His most famous work was done on integral equations.
Hille's main work was on integral equations, differential equations, special functions, Dirichlet series and Fourier series.
He also studied elliptic functions and integral equations.
Schmidt published a two part paper on integral equations in 1907 in which he reproved Hilbert 's results in a simpler fashion, and also with less restrictions.
Other topics he worked on include algebraic geometry,number theory and integral equations.
His work dealt with potential theory, functional analysis, integral equations and the problem of minimal surfaces, the Plateau Problem.
The first to introduce Hilbert 's new methods into analysis in his textbook on integral equations.
At this stage Urysohn was interested in analysis, in particular integral equations, and this was the topic of his habilitation.
Bolza returned to Chicago for part of 1913 giving lecturers during the summer on function theory and integral equations.
Smithies graduated in 1933 and began research on integral equations with Hardy at Cambridge.
One of the topics which will always be associated with Sokolov's name is a method for finding approximate solutions to differential and integral equations.
During this time he worked on topics such as Banach spaces,the moment problem, integral equations and matrices, and on spectral theory for linear operators.
In 1944 four of his papers appeared: On the growth of solutions of linear differential equations; Definitely self-conjugate adjoint integral equations;
Then in session 1921/22 he studied in Berlin where von Mises lectured on differential and integral equations, Bieberbach on differential geometry and Schur on algebra.
His doctoral dissertation On definite integrals and functions with application in expansion of series was an early investigation of the theory of singular integral equations.
He was particularly interested in the courses in complex variable, integral equations and differential equations. .
Making use of his results on integral equations, Hilbert contributed to the development of mathematical physics by his important memoirs on kinetic gas theory and the theory of radiations.
One of them is his fundamental contribution on singular integral equations and applications.
Smithies early work wason integral equations and in 1958 his text Integral equations was published by Cambridge University Press in their Cambridge Tracts in Mathematics and Mathematical Physics Series.
Immediately after his return to GermanyBolza continued teaching and research, in particular on function theory, integral equations and the calculus of variations.
He defended his doctorate in 1921 at Stockholm Högskola and was opposed by Erik Ivar Fredholm the mathematical physicist best known for his work on integral equations and spectral theory.
Mathematical Analysis andNumerical Methods for Science and Technology: Volume 4 Integral Equations and Numerical Methods.
All ageing mathematicians should be particularly pleased to learn that a second piece of work by Elliott,which was again of major importance, was his contribution to the theory of integral equations which he made after he retired.
Mathematical Analysis andNumerical Methods for Science and Technology: Volume 4 Integral Equations and Numerical Methods.
Hilbert immediately saw the he importance of Fredholm's theory, and during the first quarter of the 20th century the theory of integral equations became a major research topic.
Hilbert contributed to many branches of mathematics, including invariants, algebraic number fields,functional analysis, integral equations, mathematical physics, and the calculus of variations.
Mathematical Analysis and Numerical Methods for Science andTechnology: Volume 4 Integral Equations and Numerical Methods.