Stability Analysis of Method of Foundamental Solutions for Laplace's Equations

Huang, Shiu-ling

21 June 2006

This thesis consists of two parts. In the first part, to solve the boundary value problems of homogeneous equations, the fundamental solutions (FS) satisfying the homogeneous equations are chosen, and their linear combination is forced to satisfy the exterior and the interior boundary conditions. To avoid the logarithmic singularity, the source points of FS are located outside of the solution domain S. This method is called the method of fundamental solutions (MFS). The MFS was first used in Kupradze in 1963. Since then, there have appeared numerous reports of MFS for computation, but only a few for analysis. The part one of this thesis is to derive the eigenvalues for the Neumann and the Robin boundary conditions in the simple case, and to estimate the bounds of condition number for the mixed boundary conditions in some non-disk domains. The same exponential rates of Cond are obtained. And to report numerical results for two kinds of cases. (I) MFS for Motz's problem by adding singular functions. (II) MFS for Motz's problem by local refinements of collocation nodes. The values of traditional condition number are huge, and those of effective condition number are moderately large. However, the expansion coefficients obtained by MFS are scillatingly large, to cause another kind of instability: subtraction cancellation errors in the final harmonic solutions. Hence, for practical applications, the errors and the ill-conditioning must be balanced each other. To mitigate the ill-conditioning, it is suggested that the number of FS should not be large, and the distance between the source circle and the partial S should not be far, either. In the second part, to reduce the severe instability of MFS, the truncated singular value decomposition(TSVD) and Tikhonov regularization(TR) are employed. The computational formulas of the condition number and the effective condition number are derived, and their analysis is explored in detail. Besides, the error analysis of TSVD and TR is also made. Moreover, the combination of TSVD and TR is proposed and called the truncated Tikhonov regularization in this thesis, to better remove some effects of infinitesimal sigma_{min} and high frequency eigenvectors.

truncated singular value decomposition

effective condition number

method of fundamental solutions

Tikhonov regularization

traditional condition number

Screening Of Tomato Seeds For Genetic Modification And Identification Of Genetically Modified Ripening Delayed Tomato Seeds

Turkoglu, Selda St

01 May 2007

Tomato has been genetically modified for providing properties such as insect-resistance or delayed-ripening. Tomato seeds purchased from several bazaars and markets were screened for the presence of genetic modification by targeting NptII kanamycin resistance, Nos terminator, and 35S promoter gene regions which are the most commonly transformed gene regions in transgenic plants, and then ripening-delayed tomato seeds were tried to be identified in this study. F type truncated-PG gene and Sam-k gene were selected as the indicator of genetically modified ripening delayed tomatoes. DNAs of 25 seed samples were isolated by CTAB method and examined with several primer pairs, and the primer sets that provided consistent results were selected to conduct routine testing by PCR analysis of the samples. In screening analysis via conventional PCR, 4 samples were amplified with 35S, Nos and NptII primer sets. Among other samples, 3 of them were amplified with 35S and Nos primer sets and 2 of them were amplified only with 35S primer set. The amplification was observed with Nos, NptII and Sam-k primers in one sample and this sample was identified as 35 1 N, since the sequence result of the PCR product amplified with Sam-k primers showed high homology with the Samase gene of T3 Coliphage. F type truncated PG gene was not observed in any of the samples. Although this study demonstrates the presence of commonly used gene regions in genetically modified tomatoes, further analysis of the genetically modified ripening delayed tomato seeds via construct specificor event specific PCR techniques is needed for confirmation.

Q Research 179.9-180

Generalized rank tests for univariate and bivariate interval-censored failure time data

Sun, De-Yu

20 June 2003

In Part 1 of this paper, we adapt Turnbull¡¦s algorithm to estimate the distribution function of univariate interval-censored and truncated failure time data. We also propose four non-parametric tests to test whether two groups of the data come from the same distribution. The powers of proposed test statistics are compared by simulation under different distributions. The proposed tests are then used to analyze an AIDS study. In Part 2, for bivariate interval-censored data, we propose some models of how to generate the data and several methods to measure the correlation between the two variates. We also propose several nonparametric tests to determine whether the two variates are mutually independent or whether they have the same distribution. We demonstrate the performance of these tests by simulation and give an application to AIDS study¡]ACTG 181¡^.

Turnbull's algorithm

non-parametric tests

simulation

The effects of three different priors for variance parameters in the normal-mean hierarchical model

Chen, Zhu, 1985-

01 December 2010

Many prior distributions are suggested for variance parameters in the hierarchical model. The “Non-informative” interval of the conjugate inverse-gamma prior might cause problems. I consider three priors – conjugate inverse-gamma, log-normal and truncated normal for the variance parameters and do the numerical analysis on Gelman’s 8-schools data. Then with the posterior draws, I compare the Bayesian credible intervals of parameters using the three priors. I use predictive distributions to do predictions and then discuss the differences of the three priors suggested. / text

Bayesian inference

Conjugate prior

Log-normal

Truncated normal

Hierarchical model

Metropolis-Hastings within Gibbs

Gibbs sampler

Μελέτη κατανομών μεγέθους συστάδας για επιγενή Poisson και συναφείς ασυμπτωτικές κατανομές

Κουσίδης, Σωκράτης

09 October 2008

Σε προβλήματα ερμηνείας βιολογικών δεδομένων όπου οι υπό μελέτη μονάδες εμφανίζονται κατά συστάδες (cluster) τυχαίου μεγέθους και πλήθους, ιδιαίτερο ρόλο παίζουν οι επιγενείς κατανομές. Συγκεκριμένα ως επιγενής Poisson κατανομή μπορεί να παρασταθεί κάθε μονοδιάστατη διακριτή κατανομή η οποία είναι άπειρα διαιρετή. Έχει μελετηθεί, η περίπτωση στην οποία η κατανομή του μεγέθους της συστάδας (csd) είναι μια γενικευμένη (εισάγεται νέα παράμετρος) εξαρτώμενη μεγέθους (gsb) λογαριθμική κατανομή. Παίρνοντας τα όρια αυτής της παραμέτρου ως οριακές κατανομές προκύπτουν η ΝΝΒD και η Pόlya-Aeppli. Στη παρούσα διπλωματική μελετάται η κατανομή που προκύπτει όταν ως csd χρησιμοποιείται η gsb μιας οιασδήποτε κατανομής. Δίνεται η πιθανογεννήτρια και προσδιορίζονται οι ασυμπτωτικές κατανομές στη γενικότερη περίπτωση. Μελετώνται επίσης, οι ιδιότητες της κατανομής και δίνονται εκτιμητές με τις μεθόδους των ροπών και της μέγιστης πιθανοφάνειας. Ειδικότερα, παρουσιάζεται η περίπτωση της ακρότμητης Poisson που δίνει ως οριακές κατανομές τις Νeyman και Thomas και προσομοιώνονται δεδομένα. Εξάγονται επίσης, ως ειδική περίπτωση των γενικών τύπων, τα αποτελέσματα που έχουν αποδειχθεί για τη λογαριθμική κατανομή. Στη συνέχεια αναπτύσσονται αντίστοιχα γενικευμένα διδιάστατα μοντέλα τέτοιων κατανομών. Δίνονται επίσης οι περιθώριες και οι δεσμευμένες κατανομές τους, υπολογίζονται οι ροπές, και χρήσιμες σχέσεις για τα διδιάστατα μοντέλα. Τέλος, παρουσιάζονται ειδικές περιπτώσεις, όπως οι Sum-Symmetric Power-Series και δίνονται εφαρμογές των διδιαστάτων κατανομών που μελετήθηκαν. / In biological data interpretation domains, where the units we exam come along as clusters of random size and number, generalized distributions have a very major role. In particular, every univariate discrete distribution that is infinite divisible can be formed like a generalized Poisson distribution. The case where the cluster-size distribution is a generalized (a new parameter has been inserted) size-biased log-series distribution has been studied. Taking the limits of this parameter, as limited cases we have the NNBD and Polya-Aeppli distribution. In this diplomatic work, we study the distribution which arises when as a csd we use the gsb of a random distribution. We give the pgf and we see the asymptotic distributions in the general case. We also see the attributes of the distribution and we give estimators with the method of moments and maximum likelihood estimators. Specially, we report the case of Truncated Poisson, which gives Neyman and Thomas as limiting cases and we simulate some data. Likewise, we also see the results that have been proofed for the Log-Series distribution as a special case of the general formulas. Then, we see correspond generalized Bivariate models of these distributions. We also give the marginals and the conditional distributions, we find the moments and some useful relations about the Bivariate models. Final, we present special cases, like Sum-Symmetric Power-Series and we give applications of the Bivariate distributions that we saw. In biological data interpretation domains, where the units we exam come along as clusters of random size and number, generalized distributions have a very major role. In particular, every univariate discrete distribution that is infinite divisible can be formed like a generalized Poisson distribution. The case where the cluster-size distribution is a generalized (a new parameter has been inserted) size-biased log-series distribution has been studied. Taking the limits of this parameter, as limited cases we have the NNBD and Polya-Aeppli distribution. In this diplomatic work, we study the distribution which arises when as a csd we use the gsb of a random distribution. We give the pgf and we see the asymptotic distributions in the general case. We also see the attributes of the distribution and we give estimators with the method of moments and maximum likelihood estimators. Specially, we report the case of Truncated Poisson, which gives Neyman and Thomas as limiting cases and we simulate some data. Likewise, we also see the results that have been proofed for the Log-Series distribution as a special case of the general formulas. Then, we see correspond generalized Bivariate models of these distributions. We also give the marginals and the conditional distributions, we find the moments and some useful relations about the Bivariate models. Final, we present special cases, like Sum-Symmetric Power-Series and we give applications of the Bivariate distributions that we saw.

Σταθμισμένη

Επιγενής

Ακρότμητη

519.24

Weighted

Generalized

Truncated

Cluster size distribution

Limited Dependent Variable Correlated Random Coefficient Panel Data Models

Liang, Zhongwen

2012 August 1900

In this dissertation, I consider linear, binary response correlated random coefficient (CRC) panel data models and a truncated CRC panel data model which are frequently used in economic analysis. I focus on the nonparametric identification and estimation of panel data models under unobserved heterogeneity which is captured by random coefficients and when these random coefficients are correlated with regressors. For the analysis of linear CRC models, I give the identification conditions for the average slopes of a linear CRC model with a general nonparametric correlation between regressors and random coefficients. I construct a sqrt(n) consistent estimator for the average slopes via varying coefficient regression. The identification of binary response panel data models with unobserved heterogeneity is difficult. I base identification conditions and estimation on the framework of the model with a special regressor, which is a major approach proposed by Lewbel (1998, 2000) to solve the heterogeneity and endogeneity problem in the binary response models. With the help of the additional information on the special regressor, I can transfer a binary response CRC model to a linear moment relation. I also construct a semiparametric estimator for the average slopes and derive the sqrt(n)-normality result. For the truncated CRC panel data model, I obtain the identification and estimation results based on the special regressor method which is used in Khan and Lewbel (2007). I construct a sqrt(n) consistent estimator for the population mean of the random coefficient. I also derive the asymptotic distribution of my estimator. Simulations are given to show the finite sample advantage of my estimators. Further, I use a linear CRC panel data model to reexamine the return from job training. The results show that my estimation method really makes a difference, and the estimated return of training by my method is 7 times as much as the one estimated without considering the correlation between the covariates and random coefficients. It shows that on average the rate of return of job training is 3.16% per 60 hours training.

Limited dependent variable

Panel data

Nonparametric

Binary response

Truncated

Correlated random coefficient

Distribuição de lei de potência gradualmente truncada aplicada na educação : vestibular da Academia da Força Aérea /

Schinaider, Sidney Jorge.

January 2006

Orientador: Hari Mohan Gupta / Banca: Gerson Antonio Santarine / Banca: Osvaldo Missiato / Resumo: Educação e aprendizado são assuntos de grande importância para a sociedade em vista do desenvolvimento tecnológico e do progresso social. No presente trabalho analisamos a distribuição estatística das notas dos candidatos ao vestibular (Exame de Admissão) da Academia da Força Aérea, situada em Pirassununga, Estado de São Paulo Brasil, onde se formam os Oficiais da Aeronáutica (Força Aérea Brasileira), entre os anos de 1999 a 2004, em busca de algumas características que indiquem o processo de aprendizagem em cada disciplina do vestibular. O exame de admissão consta de 4 disciplinas: Física, Matemática, Inglês e Português, todos com questões objetivas. Os candidatos melhor classificados são selecionados de acordo com o número de vagas determinado pelo Comando da Aeronáutica. Notou-se, claramente, que, nas disciplinas Física, Matemática e Inglês, as notas obedecem a uma distribuição do tipo Lei de Potência Gradualmente Truncada, como também foi observado anteriormente nas disciplinas, em conjunto, de Ciências Exatas e Biológicas. Na disciplina Português as notas obedecem a uma distribuição normal, resultado que se explica, considerando-se a dependência dos assuntos dados na área de Física, Matemática e Inglês (língua estrangeira) aos assuntos ministrados anteriormente, enquanto em Português, (língua materna) cada capítulo é relativamente independente. Também apresentamos sugestão para melhorar o ensino de ciências e matemáticas. / Abstract: Science and Mathematic Education is a subject of great importance for the society in sight of recent technological and social program. In the present work, we study the statistical distribution of the marks obtained by the candidates in entrance examination of Air Force Academy, which prepare officers for Brazilian Air Force and is situated at Pirassununga São Paulo, in the period of 1999-2004. Our object is to find some characteristics of the process of learning in various disciplines. The admission examination consist of four disciplines; Physics, Mathematics, English and Portuguese. The candidates are selected in accordance with the merit list in the examination and number of seats available as determined by the Air Force Command. We showed that in the discipline of Physics, Mathematics and English, the distribution of marks obtained is in accordance with Gradually Truncated Power Law as also have been reported earlier in Exact and Biological Sciences in University entrance examination. In Portuguese the Distribution is Normal. We explained these results considering importance of the understanding of material given previously to understand a new chapter in area of Physics, Mathematics and English as our foreign language. In the case of Portuguese (Native Language), each chapter is relatively independent and thus not require knowledge of previous chapters. We also presented some suggestions to improve the science and Mathematics Education at High School level. / Mestre

Modelos matemáticos.

Vestibular.

Ensino médio.

Gradually truncated power law. eng

Complex systems. eng

Useknutá data a stochastické rezervování škod / Truncated data and stochastic claims reserving

Marko, Dominik

January 2018

In this thesis stochastic claims reserving under the model of randomly trun- cated data is presented. For modelling the claims, a compound Poisson process is assumed. Introducing a random variable representing the delay between oc- currence and reporting of a claim, a probability model of IBNR claims is built. The fact that some claims are incurred but not reported yet leads to truncated data. Basic results of non-parametric statistical estimation under the model of randomly truncated data are shown, which can be used to obtain an estimate of IBNR claims reserves. Theoretical background is then used for application on real data from Czech Insurers' Bureau. 36

The role of N-truncated Aβ peptides in Alzheimer’s Disease

Lopez Noguerola, Jose Socrates

26 June 2018

No description available.

570

Alzheimer’s disease

N-truncated Aβ

Pyroglutamate Aβ

Neuron loss

Intraneuronal Aβ

Biologie (PPN619462639)

Fluctuations and non-equilibrium phenomena in strongly-correlated ultracold atoms / 強相関極低温冷却原子における揺らぎと非平衡現象

Nagao, Kazuma

25 March 2019

京都大学 / 0048 / 新制・課程博士 / 博士(理学) / 甲第21550号 / 理博第4457号 / 新制||理||1640(附属図書館) / 京都大学大学院理学研究科物理学・宇宙物理学専攻 / (主査)准教授 戸塚 圭介, 教授 川上 則雄, 教授 前野 悦輝 / 学位規則第4条第1項該当 / Doctor of Science / Kyoto University / DFAM

ultracold atoms

optical lattice

non-equilibirum

strongly correlated

semiclassical

Higgs mode

truncated Wigner approximation

400