Titlebook: Complex Analysis and Special Topics in Harmonic Analysis; Carlos A. Berenstein,Roger Gay Book 1995 Springer-Verlag New York, Inc. 1995 Com

Julienne

書(shū)目名稱(chēng)Complex Analysis and Special Topics in Harmonic Analysis影響因子(影響力)




書(shū)目名稱(chēng)Complex Analysis and Special Topics in Harmonic Analysis影響因子(影響力)學(xué)科排名




書(shū)目名稱(chēng)Complex Analysis and Special Topics in Harmonic Analysis網(wǎng)絡(luò)公開(kāi)度




書(shū)目名稱(chēng)Complex Analysis and Special Topics in Harmonic Analysis網(wǎng)絡(luò)公開(kāi)度學(xué)科排名




書(shū)目名稱(chēng)Complex Analysis and Special Topics in Harmonic Analysis被引頻次




書(shū)目名稱(chēng)Complex Analysis and Special Topics in Harmonic Analysis被引頻次學(xué)科排名




書(shū)目名稱(chēng)Complex Analysis and Special Topics in Harmonic Analysis年度引用




書(shū)目名稱(chēng)Complex Analysis and Special Topics in Harmonic Analysis年度引用學(xué)科排名




書(shū)目名稱(chēng)Complex Analysis and Special Topics in Harmonic Analysis讀者反饋




書(shū)目名稱(chēng)Complex Analysis and Special Topics in Harmonic Analysis讀者反饋學(xué)科排名

LIMN

Spracherwerb in der Interaktion,here the frequencies . are purely imaginary, i.e., . = .λ., λ .then . is the Fourier transform of a distribution .∈.(?). That is, we let.with . the Dirac mass at the point λ.∈? (acting on .∞ functions in ? and

不規(guī)則的跳動(dòng)

Exponential Polynomials,here the frequencies . are purely imaginary, i.e., . = .λ., λ .then . is the Fourier transform of a distribution .∈.(?). That is, we let.with . the Dirac mass at the point λ.∈? (acting on .∞ functions in ? and

GENUS

beta-cells

使厭惡

使厭惡

被告

Inelasticity

Harmonic Analysis,was the work of Fourier [Fo] on heat conduction that showed, once and for all, the importance and the interest of such expansions, and since then they have been called Fourier expansions. It is clear that another way of saying that a function . is periodic with period τ is to say that . satisfies the convolution equation

inspiration

Book 1995e G transform and the unifying role it plays in complex analysis and transcendental number theory; summation methods; and the theorem of L. Schwarz concerning the solutions of a homogeneous convolution equation on the real line and its applications in harmonic function theory.