The following publications are possibly variants of this publication:
- A note on the improved LMI-based criterion for global asymptotic stability of 2-D state-space digital filters described by Roesser model using two's complement overflow arithmeticHaranath Kar. dsp, 23(5):1767-1772, 2013. [doi]
- Criterion for the Global Asymptotic Stability of Fixed-Point Lipschitz Nonlinear Digital Filter with 2's Complement Overflow ArithmeticShimpi Singh, Neha Agarwal, Haranath Kar. jcsc, 31(6), 2022. [doi]
- Comments on Modified criterion for global asymptotic stability of fixed-point state-space digital filters using two s complement arithmetic [Automatica 46 (2010) 475-478]Haranath Kar. automatica, 46(11):1925-1927, 2010. [doi]
- A new sufficient condition for the global asymptotic stability of 2-D state-space digital filters with saturation arithmeticHaranath Kar. sigpro, 88(1):86-98, 2008. [doi]
- An improved criterion for the global asymptotic stability of fixed-point state-space digital filters with combinations of quantization and overflowNeha Agarwal, Haranath Kar. dsp, 28:136-143, 2014. [doi]
- An improved criterion for the global asymptotic stability of 2-D state-space digital filters with finite wordlength nonlinearitiesNeha Agarwal, Haranath Kar. sigpro, 105:198-206, 2014. [doi]
- An improved criterion for the global asymptotic stability of fixed-point state-space digital filters with saturation arithmeticPriyanka Kokil, Haranath Kar. dsp, 22(6):1063-1067, 2012. [doi]