Haranath Kar

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2012

20 Haranath Kar: A new criterion for the global asymptotic stability of 2-D state-space digital filters with two's complement overflow arithmetic. Signal Processing 92(9): 2322-2326 (2012)

2011

19 Anurita Dey, Haranath Kar: Robust stability of 2-D discrete systems employing generalized overflow nonlinearities: An LMI approach. Digital Signal Processing 21(2): 262-269 (2011)

18 Haranath Kar: Asymptotic stability of fixed-point state-space digital filters with combinations of quantization and overflow nonlinearities. Signal Processing 91(11): 2667-2670 (2011)

17 Amit Dhawan, Haranath Kar: An improved LMI-based criterion for the design of optimal guaranteed cost controller for 2-D discrete uncertain systems. Signal Processing 91(4): 1032-1035 (2011)

2010

16 Haranath Kar: 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]. Automatica 46(11): 1925-1927 (2010)

15 Haranath Kar: Comment on "Elimination of overflow oscillations in fixed-point state-space digital filters using saturation arithmetic: An LMI approach" by V. Singh [Digital Signal Process. Digital Signal Processing 20(1): 16 (2010)

14 Haranath Kar: An improved version of modified Liu-Michel's criterion for global asymptotic stability of fixed-point state-space digital filters using saturation arithmetic. Digital Signal Processing 20(4): 977-981 (2010)

13 Haranath Kar: A novel criterion for the global asymptotic stability of 2-D discrete systems described by Roesser model using saturation arithmetic. Digital Signal Processing 20(6): 1505-1510 (2010)

12 Amit Dhawan, Haranath Kar: An LMI approach to robust optimal guaranteed cost control of 2-D discrete systems described by the Roesser model. Signal Processing 90(9): 2648-2654 (2010)

2009

11 V. Krishna Rao Kandanvli, Haranath Kar: An LMI condition for robust stability of discrete-time state-delayed systems using quantization/overflow nonlinearities. Signal Processing 89(11): 2092-2102 (2009)

10 V. Krishna Rao Kandanvli, Haranath Kar: Robust stability of discrete-time state-delayed systems with saturation nonlinearities: Linear matrix inequality approach. Signal Processing 89(2): 161-173 (2009)

2008

9 Haranath Kar: Comments on 'New LMI condition for the nonexistence of overflow oscillations in 2-D state-space digital filters using saturation arithmetic'. Digital Signal Processing 18(2): 148-150 (2008)

8 Haranath Kar: A new sufficient condition for the global asymptotic stability of 2-D state-space digital filters with saturation arithmetic. Signal Processing 88(1): 86-98 (2008)

2007

7 Haranath Kar: An LMI based criterion for the nonexistence of overflow oscillations in fixed-point state-space digital filters using saturation arithmetic. Digital Signal Processing 17(3): 685-689 (2007)

6 Amit Dhawan, Haranath Kar: Optimal guaranteed cost control of 2-D discrete uncertain systems: An LMI approach. Signal Processing 87(12): 3075-3085 (2007)

5 Amit Dhawan, Haranath Kar: LMI-based criterion for the robust guaranteed cost control of 2-D systems described by the Fornasini-Marchesini second model. Signal Processing 87(3): 479-488 (2007)

2005

4 Haranath Kar, Vimal Singh: Elimination of overflow oscillations in digital filters employing saturation arithmetic. Digital Signal Processing 15(6): 536-544 (2005)

3 Haranath Kar, Vimal Singh: Stability analysis of 2-D digital filters with saturation arithmetic: an LMI approach. IEEE Transactions on Signal Processing 53(6): 2267-2271 (2005)

2003

2 Haranath Kar, Vimal Singh: Stability of 2-D systems described by the Fornasini-Marchesini first model. IEEE Transactions on Signal Processing 51(6): 1675-1676 (2003)

1997

1 Haranath Kar, Vimal Singh: Stability analysis of 2-D state-space digital filters using Lyapunov function: a caution. IEEE Transactions on Signal Processing 45(10): 2620-2621 (1997)

	2012
20		Haranath Kar: A new criterion for the global asymptotic stability of 2-D state-space digital filters with two's complement overflow arithmetic. Signal Processing 92(9): 2322-2326 (2012)
	2011
19		Anurita Dey, Haranath Kar: Robust stability of 2-D discrete systems employing generalized overflow nonlinearities: An LMI approach. Digital Signal Processing 21(2): 262-269 (2011)
18		Haranath Kar: Asymptotic stability of fixed-point state-space digital filters with combinations of quantization and overflow nonlinearities. Signal Processing 91(11): 2667-2670 (2011)
17		Amit Dhawan, Haranath Kar: An improved LMI-based criterion for the design of optimal guaranteed cost controller for 2-D discrete uncertain systems. Signal Processing 91(4): 1032-1035 (2011)
	2010
16		Haranath Kar: 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]. Automatica 46(11): 1925-1927 (2010)
15		Haranath Kar: Comment on "Elimination of overflow oscillations in fixed-point state-space digital filters using saturation arithmetic: An LMI approach" by V. Singh [Digital Signal Process. Digital Signal Processing 20(1): 16 (2010)
14		Haranath Kar: An improved version of modified Liu-Michel's criterion for global asymptotic stability of fixed-point state-space digital filters using saturation arithmetic. Digital Signal Processing 20(4): 977-981 (2010)
13		Haranath Kar: A novel criterion for the global asymptotic stability of 2-D discrete systems described by Roesser model using saturation arithmetic. Digital Signal Processing 20(6): 1505-1510 (2010)
12		Amit Dhawan, Haranath Kar: An LMI approach to robust optimal guaranteed cost control of 2-D discrete systems described by the Roesser model. Signal Processing 90(9): 2648-2654 (2010)
	2009
11		V. Krishna Rao Kandanvli, Haranath Kar: An LMI condition for robust stability of discrete-time state-delayed systems using quantization/overflow nonlinearities. Signal Processing 89(11): 2092-2102 (2009)
10		V. Krishna Rao Kandanvli, Haranath Kar: Robust stability of discrete-time state-delayed systems with saturation nonlinearities: Linear matrix inequality approach. Signal Processing 89(2): 161-173 (2009)
	2008
9		Haranath Kar: Comments on 'New LMI condition for the nonexistence of overflow oscillations in 2-D state-space digital filters using saturation arithmetic'. Digital Signal Processing 18(2): 148-150 (2008)
8		Haranath Kar: A new sufficient condition for the global asymptotic stability of 2-D state-space digital filters with saturation arithmetic. Signal Processing 88(1): 86-98 (2008)
	2007
7		Haranath Kar: An LMI based criterion for the nonexistence of overflow oscillations in fixed-point state-space digital filters using saturation arithmetic. Digital Signal Processing 17(3): 685-689 (2007)
6		Amit Dhawan, Haranath Kar: Optimal guaranteed cost control of 2-D discrete uncertain systems: An LMI approach. Signal Processing 87(12): 3075-3085 (2007)
5		Amit Dhawan, Haranath Kar: LMI-based criterion for the robust guaranteed cost control of 2-D systems described by the Fornasini-Marchesini second model. Signal Processing 87(3): 479-488 (2007)
	2005
4		Haranath Kar, Vimal Singh: Elimination of overflow oscillations in digital filters employing saturation arithmetic. Digital Signal Processing 15(6): 536-544 (2005)
3		Haranath Kar, Vimal Singh: Stability analysis of 2-D digital filters with saturation arithmetic: an LMI approach. IEEE Transactions on Signal Processing 53(6): 2267-2271 (2005)
	2003
2		Haranath Kar, Vimal Singh: Stability of 2-D systems described by the Fornasini-Marchesini first model. IEEE Transactions on Signal Processing 51(6): 1675-1676 (2003)
	1997
1		Haranath Kar, Vimal Singh: Stability analysis of 2-D state-space digital filters using Lyapunov function: a caution. IEEE Transactions on Signal Processing 45(10): 2620-2621 (1997)

Coauthor Index

1 Anurita Dey [19]

2 Amit Dhawan [5] [6] [12] [17]

3 V. Krishna Rao Kandanvli [10] [11]

4 Vimal Singh [1] [2] [3] [4]

Colors in the list of coauthors

Last update Sat Jun 2 20:57:36 2012 CET by the DBLP Team —

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1	Anurita Dey	[19]
2	Amit Dhawan	[5] [6] [12] [17]
3	V. Krishna Rao Kandanvli	[10] [11]
4	Vimal Singh	[1] [2] [3] [4]