On the Weyl Matrix Balls Corresponding to the Matricial Carathéodory Problem in Both Nondegenerate and Degenerate Cases

On the Weyl Matrix Balls Associated with the Matricial Schur Problem in the Nondegenerate and Degenerate Cases

Complex Analysis and Operator Theory ◽

10.1007/s11785-007-0030-1 ◽

2007 ◽

Vol 2 (1) ◽

pp. 29-54 ◽

Cited By ~ 2

Author(s):

Vladimir Kirillovich Dubovoj ◽

Bernd Fritzsche ◽

Bernd Kirstein ◽

Andreas Lasarow

Keyword(s):

Weyl Matrix ◽

Matricial Schur Problem ◽

Degenerate Cases

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On the Weyl matrix balls associated with J-Potapov sequences in both nondegenerate and degenerate cases

Linear Algebra and its Applications ◽

10.1016/j.laa.2011.06.026 ◽

2012 ◽

Vol 436 (5) ◽

pp. 1028-1060

Author(s):

Bernd Fritzsche ◽

Bernd Kirstein ◽

Uwe Raabe

Keyword(s):

Weyl Matrix ◽

Degenerate Cases

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Some Remarks on the Regular Splitting of Quasi-Polynomials with Two Delays. Characterization of Double Roots in Degenerate Cases

IFAC-PapersOnLine ◽

10.1016/j.ifacol.2020.12.363 ◽

2020 ◽

Vol 53 (2) ◽

pp. 4386-4391

Author(s):

Alejandro Martínez-González ◽

César-Fernando Méndez-Barrios ◽

Silviu-Iulian Niculescu

Keyword(s):

Regular Splitting ◽

Two Delays ◽

Degenerate Cases

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Second solutions of equations involving positive operators in degenerate cases

Mathematical Notes ◽

10.1007/bf01316985 ◽

1971 ◽

Vol 9 (2) ◽

pp. 85-88

Author(s):

I. N. Astaf'eva ◽

V. I. Malovikov

Keyword(s):

Positive Operators ◽

Solutions Of Equations ◽

Degenerate Cases

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On a conjecture of Bennewitz, and the behaviour of the Titchmarsh–Weyl matrix near a pole

Proceedings of The Royal Society A Mathematical Physical and Engineering Sciences ◽

10.1098/rspa.1998.0213 ◽

1998 ◽

Vol 454 (1973) ◽

pp. 1383-1406

Author(s):

B. M. Brown ◽

M. Marletta

Keyword(s):

Weyl Matrix

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On Desargues Theorem

Edinburgh Mathematical Notes ◽

10.1017/s0950184300000136 ◽

1944 ◽

Vol 34 ◽

pp. 17-19

Author(s):

J. H. M. Wedderburn

Keyword(s):

Analytical Methods ◽

Geometrical Proof ◽

Analytical Proof ◽

Desargues Theorem ◽

Degenerate Cases

The usual proofs of Desargues Theorem employ either metrical or analytical methods of projection from a point outside the plane; and if it is attempted to translate the analytical proof by the von Stuadt-Reye methods, the result is very long and there is trouble with coincidences. It is the object of this note to give a short geometrical proof which, in addition to the usual axioms of incidence and extension, uses only the assumption that a projectivity which leaves three points on a line unchanged also leaves all points on it unchanged. Degenerate cases are excluded as having no interest.

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Averaging of the equation of motion of a satellite with respect to its center of mass in degenerate cases: 1. Oscillations in the absolute frame of reference

Cosmic Research ◽

10.1134/s0010952508020081 ◽

2008 ◽

Vol 46 (2) ◽

pp. 172-180 ◽

Cited By ~ 1

Author(s):

S. Yu. Sadov

Keyword(s):

Center Of Mass ◽

Equation Of Motion ◽

Frame Of Reference ◽

The Absolute ◽

Absolute Frame ◽

Degenerate Cases

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Chiral spiral cyclic twins

Acta Crystallographica Section A Foundations and Advances ◽

10.1107/s2053273321012237 ◽

2022 ◽

Vol 78 (1) ◽

Author(s):

Wolfgang Hornfeck

Keyword(s):

Long Range ◽

Orientational Order ◽

Two Dimensional ◽

Point Sets ◽

Degenerate Cases

A formula is presented for the generation of chiral m-fold multiply twinned two-dimensional point sets of even twin modulus m > 6 from an integer inclination sequence; in particular, it is discussed for the first three non-degenerate cases m = 8, 10, 12, which share a connection to the aperiodic crystallography of axial quasicrystals exhibiting octagonal, decagonal and dodecagonal long-range orientational order and symmetry.

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On The Factorization of Partial Differential Equations

Canadian Journal of Mathematics ◽

10.4153/cjm-1987-040-8 ◽

1987 ◽

Vol 39 (4) ◽

pp. 825-834 ◽

Cited By ~ 6

Author(s):

W. Dale Brownawell

Keyword(s):

Differential Equation ◽

Partial Differential Equations ◽

Differential Equations ◽

Nevanlinna Theory ◽

Algebraic Differential Equation ◽

List Type ◽

Variable Result ◽

Several Variables ◽

Function Of Several Variables ◽

Degenerate Cases

In [4] N. Steinmetz used Nevanlinna theory to establish remarkably versatile theorems on the factorization of ordinary differential equations which implied numerous previous results of various authors. (Here factorization is taken in the sense of function composition as introduced by F. Gross in [2].) The thrust of Steinmetz’ central results on factorization is that if g(z) is entire and f(z) is meromorphic in C such that the composite fog satisfies an algebraic differential equation, then so do f(z) and, degenerate cases aside, g(z). In addition, the more one knows about the equation for fog (e.g. degree, weight, autonomy), the more one can conclude about the equations for f and g.In this note we generalize Steinmetz’ work to show the following:a) Steinmetz’ two basic results, Satz 1 and Korollar 1 of [4] can be seen as one-variable specializations of a single two variable result, andb) the function g(z) can itself be allowed to be a function of several variables.

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Balanced Polymorphisms With Unlinked Loci

Australian Journal of Biological Sciences ◽

10.1071/bi9630001 ◽

1963 ◽

Vol 16 (1) ◽

pp. 1 ◽

Cited By ~ 10

Author(s):

PAP Moran

Keyword(s):

Stationary States ◽

Genetic Population ◽

Degenerate Cases

The stationary states of a genetic population whose fitness is controlled by two independent loci, with two alleles each, are considered. It is shown that apart from degenerate cases there are at most five such states. It is also shown that there are at most three stationary states which are stable. Examples are given where these bounds are attained.

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