The following publications are possibly variants of this publication:
- Hardware Implementation of Discrete Hirschman Transform Convolution Using Distributed ArithmeticDingli Xue, Victor E. DeBrunner, Linda S. DeBrunner. acssc 2019: 1587-1590 [doi]
- Hardware implementation of the Hirschman Optimal TransformSoumak Mookherjee, Linda DeBrunner, Victor E. DeBrunner. acssc 2012: 1448-1451 [doi]
- An effective hardware implementation of 1024-point linear convolution based on Hirschman Optimal TransformDingli Xue, Linda S. DeBrunner. acssc 2017: 1347-1350 [doi]
- Hardware implementation of a series of transform matrices based on discrete hirschman transformPeng Xi, Victor E. DeBrunner. acssc 2016: 229-232 [doi]
- Reduced Complexity Optimal Convolution Based on the Discrete Hirschman TransformDingli Xue, Linda S. DeBrunner, Victor E. DeBrunner. tcasI, 68(5):2051-2059, 2021. [doi]
- Fixed-Point Implementation of Discrete Hirschman TransformRajesh Thomas, Victor E. DeBrunner, Linda DeBrunner. acssc 2018: 1507-1511 [doi]
- Hirschman Optimal Transform Block LMS Adaptive FilterOsama Alkhouli, Victor E. DeBrunner. icassp 2007: 1305-1308 [doi]
- Hirschman optimal transform DFT block LMS algorithmVictor E. DeBrunner, Osama Alkhouli. icassp 2008: 3805-3808 [doi]
- The optimal transform for the discrete Hirschman uncertainty principleTomasz Przebinda, Victor E. DeBrunner, Murad Özaydin. TIT, 47(5):2086-2090, 2001.