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Physical Sciences and Mathematics Commons™
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- Abelian difference sets (2)
- Different sets (2)
- Elementary abelian group of order (2)
- Finite abelian group (2)
- Harmonic Dirichlet space (2)
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- Invariant subspaces (2)
- P-subgroup (2)
- Backward shift (1)
- Disconnected domains (1)
- Exponentially weighted moving-average (1)
- First-kind integral equations (1)
- Hadamard difference sets (1)
- Hardy space (1)
- Inverse problems (1)
- Math (1)
- Nondestructive testing (1)
- Reliability data (1)
- Shewhart chart (1)
- Statistics (1)
- Weighted Bergman spaces (1)
Articles 1 - 7 of 7
Full-Text Articles in Physical Sciences and Mathematics
An Inverse Problem In Thermal Imaging, Kurt Bryan, Lester Caudill
An Inverse Problem In Thermal Imaging, Kurt Bryan, Lester Caudill
Department of Math & Statistics Faculty Publications
This paper examines uniqueness and stability results for an inverse problem in thermal imaging. The goal is to identify an unknown boundary of an object by applying a heat flux and measuring the induced temperature on the boundary of the sample. The problem is studied in both the case in which one has data at every point on the boundary of the region and the case in which only finitely many measurements are available. An inversion procedure is developed and used to study the stability of the inverse problem for various experimental configurations.
Invariant Subspaces Of The Harmonic Dirichlet Space With Large Co-Dimension, William T. Ross
Invariant Subspaces Of The Harmonic Dirichlet Space With Large Co-Dimension, William T. Ross
Department of Math & Statistics Faculty Publications
In this paper, we comment on the complexity of the invariant subspaces (under the bilateral Dirichlet shift f → ζf) of the harmonic Dirichlet space D. Using the sampling theory of Seip and some work on invariant subspaces of Bergman spaces, we will give examples of invariant subspaces F ⊂ D with dim(F/ζF) = n, n ∈ N ∪ {∞}. We will also generalize this to the Dirichlet classes Dα, 0 <α< ∞, as well as the Besov classes Bα p , 1
A Survey Of Hadamard Difference Sets, James A. Davis, Jonathan Jedwab
A Survey Of Hadamard Difference Sets, James A. Davis, Jonathan Jedwab
Department of Math & Statistics Faculty Publications
A (v, k, λ) difference set is a k-element subset D of a group G of order v for which the multiset {d1d2-1 : d1, d2 ∈ D, d1 ≠ d2} contains each nonidentity element of G exactly λ times. A difference set is called abelian, nonabelian or cyclic according to the properties of the underlying group. Difference sets are important in design theory because they are equivalent to symmetric (v, k, λ) designs with a regular automorphism group [L].
Detecting Trends And Patterns In Reliability Data Over Time Using Exponentially Weighted Moving-Averages, Harry F. Martz, Paul H. Kvam
Detecting Trends And Patterns In Reliability Data Over Time Using Exponentially Weighted Moving-Averages, Harry F. Martz, Paul H. Kvam
Department of Math & Statistics Faculty Publications
A simple, easy-to-use graphical method is presented for use in determining if there is any statistically significant trend or pattern over time in an underlying Poisson event rate of occurrence or binomial failure on demand probability. The method is based on the combined use of both an exponentially weighted moving-average (EWMA) and a Shewhart chart. Two nuclear power plant examples are introduced and used to illustrate the method. The false alarm probability and power when using the combined procedure are also determined for both cases using Monte Carlo simulation. The results indicate that the combined procedure is quite effective in …
Bergman Spaces On Disconnected Domains, William T. Ross, Alexandru Aleman, Stefan Richter
Bergman Spaces On Disconnected Domains, William T. Ross, Alexandru Aleman, Stefan Richter
Department of Math & Statistics Faculty Publications
For a bounded region G C C and a compact set K C G, with area measure zero, we will characterize the invariant subspaces M (under f -> zf)of the Bergman space Lpa(G \ K), 1 ≤ p < ∞, which contain Lpa(G) and with dim(M/(z - λ)M) = 1 for all λϵ G \ K. When G \ K is connected, we will see that di\m(M /(z — λ)M) = 1 for all λ ϵ G \ K and thus in this case we will have a complete …
Exponent Bounds For A Family Of Abelian Difference Sets, K. T. Arasu, James A. Davis, Jonathan Jedwab, Siu Lun Ma, Robert L. Mcfarland
Exponent Bounds For A Family Of Abelian Difference Sets, K. T. Arasu, James A. Davis, Jonathan Jedwab, Siu Lun Ma, Robert L. Mcfarland
Department of Math & Statistics Faculty Publications
Which groups G contain difference sets with the parameters (v, k, λ)= (q3 + 2q2 , q2 + q, q), where q is a power of a prime p? Constructions of K. Takeuchi, R.L. McFarland, and J.F. Dillon together yield difference sets with these parameters if G contains an elementary abelian group of order q2 in its center. A result of R.J. Turyn implies that if G is abelian and p is self-conjugate modulo the exponent of G, then a necessary condition for existence is that the exponent …
The Backward Shift Of Weighted Bergman Spaces, William T. Ross, Alexandru Aleman
The Backward Shift Of Weighted Bergman Spaces, William T. Ross, Alexandru Aleman
Department of Math & Statistics Faculty Publications
No abstract provided.