CONVOLUTION THEOREMS FOR FRACTIONAL FOURIER COSINE AND SINE TRANSFORMS AND THEIR EXTENSIONS TO BOEHMIANS | Zendy

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CONVOLUTION THEOREMS FOR FRACTIONAL FOURIER COSINE AND SINE TRANSFORMS AND THEIR EXTENSIONS TO BOEHMIANS

Author(s) -

C. Ganesan,

R. Roopkumar

Publication year - 2016

Publication title -

communications of the korean mathematical society

Language(s) - English

Resource type - Journals

SCImago Journal Rank - 0.286

H-Index - 15

eISSN - 2234-3024

pISSN - 1225-1763

DOI - 10.4134/ckms.c150244

Subject(s) - sine and cosine transforms , mathematics , sine , convolution (computer science) , fourier sine and cosine series , convolution theorem , trigonometric functions , fourier transform , discrete cosine transform , mathematical analysis , pure mathematics , fractional fourier transform , fourier analysis , computer science , geometry , machine learning , artificial neural network , artificial intelligence , image (mathematics)

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