Wavelet convolution product involving fractional fourier transform
-
S. K. Upadhyay
and
Jitendra Kumar Dubey
Abstract
Exploiting the theory of fractional Fourier transform, the wavelet convolution product and existence theorems associated with the n-dimensional wavelet transform are investigated and their properties studied.
Acknowledgements
The first author is thankful to IIT(BHU) and DST-Centre for Interdisciplinary Mathematical Sciences, Banaras Hindu University, Varanasi, India, for providing research facilities. The second author is thankful to DST-Centre for Interdisciplinary Mathematical Sciences, Banaras Hindu University, Varanasi, India, for providing research facilities.
References
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- Editorial
- FCAA related news, events and books (FCAA–volume 20–1–2017)
- Survey paper
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- Research paper
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- On existence and uniqueness of solutions for semilinear fractional wave equations
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- Computational solutions of the tempered fractional wave-diffusion equation
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- Wavelet convolution product involving fractional fourier transform
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- Solutions of the main boundary value problems for the time-fractional telegraph equation by the green function method
- Research paper
- A foundational approach to the Lie theory for fractional order partial differential equations
- Research paper
- Null-controllability of a fractional order diffusion equation
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- New results in stability analysis for LTI SISO systems modeled by GL-discretized fractional-order transfer functions
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- The stretched exponential behavior and its underlying dynamics. The phenomenological approach
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