Non-recursive decimation filters with arbitrary integer decimation factors

2012 ◽  
Vol 6 (3) ◽  
pp. 141 ◽  
Author(s):  
K. Mondal ◽  
S. Mitra
Keyword(s):  
Arbitrary Integer ◽  
Decimation Filters

scholarly journals Bose-Hubbard phase diagram with arbitrary integer filling

2009 ◽  
Vol 79 (10) ◽  
Author(s):  
Niklas Teichmann ◽  
Dennis Hinrichs ◽  
Martin Holthaus ◽  
André Eckardt
Keyword(s):  
Phase Diagram ◽  
Arbitrary Integer

COVARIANT HELICITY-COUPLING AMPLITUDES: PRINCIPLES AND EXAMPLES

2003 ◽  
Vol 18 (03) ◽  
pp. 457-473
Author(s):  
Suh-Urk Chung
Keyword(s):  
Arbitrary Integer

A general formulation has been given for constructing covariant helicity-coupling amplitudes involving two-body decays with arbitrary integer spins. In order to illustrate the principles, the case of a spin-1 object decaying into spin-2 and spin-1 particles is treated in some detail. Also given are the helicity-coupling amplitudes for a spin-2 object decaying into a spin-2 and a spin-0 particle.

Design of Compensators for Comb Decimation Filters

2018 ◽  
pp. 6043-6056
Author(s):  
Gordana Jovanovic Dolecek
Keyword(s):  
Pass Band ◽  
Trade Off ◽  
Decimation Filters

This article presents different methods proposed to compensate for the comb pass band droop. Two main groups of methods are elaborated: Methods that require multipliers, and multiplier less methods. The width of pass band depends on the decimation factor and the decimation of the stage which follows the comb decimation stage. In that sense the compensation can be considered as a one in the wideband, or in the narrowband. There exit methods which can be used for both: wideband and narrowband compensations (with different parameters). Usually there is a trade-off between the compensator complexity and the provided quality of compensation.

scholarly journals One-dimensional game of life and its growth functions

1992 ◽  
Vol 15 (3) ◽  
pp. 499-508
Author(s):  
Mohammad H. Ahmadi
Keyword(s):  
Power Series ◽  
Rational Function ◽  
Formal Power Series ◽  
Infinite Product ◽  
Growth Function ◽  
The Other ◽  
Arbitrary Integer ◽  
One Dimensional ◽  
Growth Functions ◽  
Formal Power

We start with finitely many1's and possibly some0's in between. Then each entry in the other rows is obtained from the Base2sum of the two numbers diagonally above it in the preceding row. We may formulate the game as follows: Defined1,jrecursively for1, a non-negative integer, andjan arbitrary integer by the rules:d0,j={1     for   j=0,k         (I)0   or   1   for   0<j<kd0,j=0   for   j<0   or   j>k              (II)di+1,j=di,j+1(mod2)   for   i≥0.      (III)Now, if we interpret the number of1's in rowias the coefficientaiof a formal power series, then we obtain a growth function,f(x)=∑i=0∞aixi. It is interesting that there are cases for which this growth function factors into an infinite product of polynomials. Furthermore, we shall show that this power series never represents a rational function.

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