Twitter Google Share on Facebook convolution (redirected fromconvolution integral) Thesaurus Medical Encyclopedia con·vo·lu·tion (kŏn′və-lo͞o′shən) n. 1.A form or part that is folded or coiled. 2.One of the convex folds of the surface of the brain. ...
convolution integral卷积积分;褶合积分 convolution同义词 n. [数]卷积;[解剖]回旋;盘旋;卷绕 wind,coiling convolution词源中文解释 1540年代,“卷曲在一起的状态; 旋转、弯曲、折叠或回旋”,是拉丁语 convolutus 的名词形式,该词是 convolvere 的过去分词,意为“卷曲在一起”,由 com(见 con-)的同化形式和 ...
Google Share on Facebook convolution (redirected fromconvolution integrals) Dictionary Thesaurus Encyclopedia Related to convolution integrals:Faltung,convolving [kon″vo-lu´shun] a tortuous irregularity or elevation caused by the infolding of a structure upon itself. ...
Convolution Theorem Formula Convolution Integral Examples and Applications Lesson Summary Frequently Asked Questions How do you solve a convolution integral? To solve a convolution integral, compute the inverse Laplace transforms for the corresponding Fourier transforms, F(t) and G(t). Then compute the...
The integral formula for convolving two functions promotes the geometric interpretation of the convolution, which is a bit less conspicuous when one looks at the discrete version alone. First, note that by using −t−t under the function gg, we reflect it across the vertical axis. Then, ...
11.Newton-Cotes formula牛顿-柯特斯求积公式 12.principal formula of integral geometry积分几何学的主公式 13.On Compound Multiplicative Formula and Romberg Algorithm;复合求积公式与Romberg算法 14.Quadrature Formulas of H_m~T(θ) Type(Ⅰ);H_m~T(θ)型求积公式(Ⅰ) 15.A Further Investigation Between...
This last equation just says the image of our continuous field of stars is the blurred image of each star individually, all added back together. However, this also happens to be a realization of the formula for convolution presented at the top of this post! The resulting image of our star...
On a unified integral formula involving multivariable I-functions and classes of polynomials The integrals evaluated are the products of multivariable Aleph-functions with algebraic functions, Jacobi polynomials, Legendre functions, Bessel-Maitland... F Ayant 被引量: 0发表: 2018年 加载更多来源...