TWO THEOREMS ON POSITIVE-REAL FUNCTIONS AND THEIR APPLICATION TO THE SYNTHESIS OF SYMMETRIC AND ANTIMETRIC FILTERS,
Abstract
It is first shown that the power gain of a filter which has been partitioned into two component parts may be expressed in terms of a formula involving only the two impedances seen looking to the left and the right of the common junction. By imposing the constraints of symmetry and antimetry this formula leads quite naturally to two global equations for positive-real functions. Theorems 1 and 2 present necessary and sufficient conditions for the existence of solutions. Moreover, the construction of these p.r. functions is made to depend on two algorithms of an extremely simple character. The theory is fully illustrated by means of four worked, non-trivial examples. Finally, it is pointed out that synthesis by bi-section is often wasteful of reactances (especially in the symmetric case) and a careful count of elements is presented for antimetric filters. (Author)
Document Details
- Document Type
- Technical Report
- Publication Date
- Apr 01, 1965
- Accession Number
- AD0616266
Entities
People
- D. C. Youla
Organizations
- New York University Tandon School of Engineering