lattice network in a sentence

Examples

1. If an unbalanced equivalent circuit of the lattice is ultimately required, it would be better if z b started with a series inductor ( see Lattice networks ).
2. A delay network can be conveniently made up of a cascade of second order lattice networks, allocating a quad of poles and zeros, from the tables above, to each section.
3. He published a treatment of geometrically symmetrical 2-port networks in 1927 and is responsible for Bartlett's bisection theorem which shows that any symmetrical network can be transformed into a symmetrical lattice network.
4. Bartlett's bisection theorem states that the network N is equivalent to a lattice network with series branches of Z _ { sc } and cross branches of Z _ { oc }.
5. Ogg's idea for what became the HX ball was to replace the dimples with a tubular lattice network of 332 hexagons and 12 pentagons with rounded edges, which eliminated the flat areas between dimples.
6. All high-order lattice networks can be replaced by a cascade of simpler lattices, provided their characteristic impedances are all equal to that of the original and the sum of their propagation functions equals the original.
7. These are important circuits because, as Bode pointed out, all high order all-pass lattice networks can be replaced by a cascade of second order networks with, possibly, one first order network, to give the identical response.
8. The networks can be realised as a cascade of second order lattices ( or their bridged-T equivalents ) by allocating a complex conjugate quad of poles and zeros to each section of the cascade ( as outlined in Lattice networks ).
9. It is possible for the lattice network to have the characteristics of : a delay network, an amplitude or phase correcting network, a dispersive network & thinsp; or as a linear phase filter, according to the choice of components for the lattice elements.
10. All of the delay characteristics can be realized as a single lattice network, or as a cascade of second-order lattices by allocating a symmetrical group ( quad ) of two poles and two zeros to each second-order lattice in the network, and using the relationships given in Lattice network.