Uncertainty Principle for the Hartley Transform: Direct and Fourier–Based Approaches

Authors

  • Andi Tenri Ajeng Nur Universitas Sriwijaya
  • Husnul Khotimah Universitas Sriwijaya
  • Putri Nilam Cayo Universitas Sriwijaya

DOI:

https://doi.org/10.62383/bilangan.v3i6.849

Keywords:

Fourier transform, Hartley transform, Heisenberg inequality, Signal Analysis, Uncertainty principle

Abstract

The Hartley transform provides a real-valued alternative to the classical Fourier transform, offering structural advantages for the analysis of real-valued signals. This paper presents a systematic study of the continuous Hartley transform, including its definition, inversion formula, Plancherel identity, and core operational properties such as shifting, modulation, and convolution. The analytical framework is developed in parallel with the classical Fourier theory to highlight structural similarities and distinctions between the two transforms. Furthermore, we establish a Hartley-type Heisenberg uncertainty principle using two complementary approaches: a direct method based on intrinsic properties of the Hartley kernel, and a Fourier-based method that exploits the algebraic relationship between the Hartley and Fourier transforms. These results provide a unified and rigorous foundation for understanding uncertainty relations within real-valued transform frameworks, and they demonstrate the continued relevance of the Hartley transform in harmonic analysis, integral transforms, and modern signal processing.

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References

Bose, N., & Boo, P. (2005). A survey of Hartley transform applications. Journal of Applied Signal Processing, 2005, Article 284561.

Bracewell, R. N. (1983). Discrete Hartley transform. Journal of the Optical Society of America, 73, 1832–1835. https://doi.org/10.1364/JOSA.73.001832

Bracewell, R. N. (1984). A note on the 2D Hartley transform. Proceedings of the IEEE, 72(5), 609–610.

Bracewell, R. N. (1986). The Hartley transform. Oxford University Press.

Cowling, M. G., & Price, J. F. (1984). Generalizations of Heisenberg's inequality. Journal of Fourier Analysis and Applications, 1, 707–713.

Feldman, J. A. (1999). The discrete Hartley transform and its applications. IEEE Transactions on Signal Processing, 47(1), 1–10.

Folland, G. B. (2009). Fourier analysis and its applications. American Mathematical Society.

Goh, S. S., & Pfander, G. E. (1993). Uncertainty principles for real-valued transforms. IEEE Transactions on Signal Processing, 41, 2907–2916.

Hargreaves, J. J. (1991). The continuous and discrete Hartley transform. International Journal of Mathematical Education in Science and Technology, 22, 811–816.

Hartley, R. V. L. (1942). A more symmetrical Fourier analysis applied to transmission problems. Proceedings of the IRE, 30(3), 144–150. https://doi.org/10.1109/JRPROC.1942.234333

Lohmann, A. W., Mendlovic, D., & Zalevsky, Z. (1989). Generalized Hartley transform. JOSA A, 6(10), 1598–1602.

Martucci, S. A. (2015). Recent advances in real-valued transform algorithms. IEEE Transactions on Signal Processing, 63(20), 5433–5445.

McLaren, D., & Smith, J. M. (1998). Fast algorithms for the discrete Hartley transform. IEEE Transactions on Circuits and Systems II, 45(7), 923–927.

Oppenheim, A. V., & Willsky, A. S. (1997). Signals and systems (2nd ed.). Prentice-Hall.

Stein, E. M., & Shakarchi, R. (2003). Fourier analysis: An introduction. Princeton University Press.

Vlček, M., & Novák, J. (1999). Real-valued convolution and filtering using the DHT. IEEE Signal Processing Letters, 6(7), 176–179.

Zadeh, S., & Reibman, A. R. (2002). The Hartley transform in image compression and reconstruction. IEEE Transactions on Image Processing, 11, 38–43.

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Published

2025-12-03

How to Cite

Nur, A. T. A., Khotimah, H., & Cayo, P. N. (2025). Uncertainty Principle for the Hartley Transform: Direct and Fourier–Based Approaches. Bilangan : Jurnal Ilmiah Matematika, Kebumian Dan Angkasa, 3(6), 01–10. https://doi.org/10.62383/bilangan.v3i6.849

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