Global ETD Search

1	Nucleo-cytoplasmic relationships in differentiation : studies on the development of Mayetiola destructor (Cecidomyidae, Dipt.) Bantock, C. R. January 1964 (has links) No description available. Hessian fly
2	Sexual attraction, mating behavior, and demonstration of a female sex pheromone in the Hessian fly, Mayetiola destructor (Say) (Diptera: cecidomyiidae) McKay, Patricia Anne January 2011 (has links) Vita. / Digitized by Kansas Correctional Industries Hessian flies Pheromones Flies
3	The inheritance of the Marquillo type resistance in wheat to the Great Plains biotype of the Hessian fly Maas, Fred B January 2011 (has links) Typescript (photocopy). / Digitized by Kansas Correctional Industries Wheat--Genetics Hessian flies Wheat--Diseases and pests
4	The inheritance of resistance to Hessian fly in a cross between Tenmarq and Kawvale wheat Hollingsworth, Hosea Samuel January 2011 (has links) Typescript, etc. / Digitized by Kansas State University Libraries Wheat--Disease and pest resistance Hessian fly
5	Bordered Complex Hessians John P. D'Angelo, Andreas.Cap@esi.ac.at 07 December 2000 (has links) No description available.
6	Efficient Hessian computation in inverse problems with application to uncertainty quantification Chue, Bryan C. January 2013 (has links) Thesis (M.Sc.Eng.) PLEASE NOTE: Boston University Libraries did not receive an Authorization To Manage form for this thesis or dissertation. It is therefore not openly accessible, though it may be available by request. If you are the author or principal advisor of this work and would like to request open access for it, please contact us at open-help@bu.edu. Thank you. / This thesis considers the efficient Hessian computation in inverse problems with specific application to the elastography inverse problem. Inverse problems use measurements of observable parameters to infer information about model parameters, and tend to be ill-posed. They are typically formulated and solved as regularized constrained optimization problems, whose solutions best fit the measured data. Approaching the same inverse problem from a probabilistic Bayesian perspective produces the same optimal point called the maximum a posterior (MAP) estimate of the parameter distribution, but also produces a posterior probability distribution of the parameter estimate, from which a measure of the solution's uncertainty may be obtained. This probability distribution is a very high dimensional function with which it can be difficult to work. For example, in a modest application with N = 104 optimization variables, representing this function with just three values in each direction requires 3^10000 U+2248 10^5000 variables, which far exceeds the number of atoms in the universe. The uncertainty of the MAP estimate describes the shape of the probability distribution and to leading order may be parameterized by the covariance. Directly calculating the Hessian and hence the covariance, requires O(N) solutions of the constraint equations. Given the size of the problems of interest (N = O(10^4 - 10^6)), this is impractical. Instead, an accurate approximation of the Hessian can be assembled using a Krylov basis. The ill-posed nature of inverse problems suggests that its Hessian has low rank and therefore can be approximated with relatively few Krylov vectors. This thesis proposes a method to calculate this Krylov basis in the process of determining the MAP estimate of the parameter distribution. Using the Krylov space based conjugate gradient (CG) method, the MAP estimate is computed. Minor modifications to the algorithm permit storage of the Krylov approximation of the Hessian. As the accuracy of the Hessian approximation is directly related to the Krylov basis, long term orthogonality amongst the basis vectors is maintained via full reorthogonalization. Upon reaching the MAP estimate, the method produces a low rank approximation of the Hessian that can be used to compute the covariance. / 2031-01-01 Mechanical engineering Mathematics Hessian computation Inverse problems
7	Automated Fluorescence Microscopy Determination of Mycobacterium Tuberculosis Count via Vessel Filtering Claybon, Swazoo III 20 June 2017 (has links) Tuberculosis (TB), a deadly infectious disease caused by the bacillus Mycobacterium tuberculosis (MTB), is the leading infectious disease killer globally, ranking in the top 10 overall causes of death despite being curable with a timely diagnosis and the correct treatment [3]. As such, eradicating tuberculosis (TB) is one of the targets of the Sustainable Development Goals (SDGs) for global health as approved by the World Health Assembly (WHA) in 2014 [2,3]. This work describes an automated method of screening and determining the severity, or count, of the TB infection in patients via images of fluorescent TB on a sputum smear. Using images from a previously published dataset [9], the algorithm involves a vessel filter which uses the second derivative information in an image by looking at the eigenvalues of the Hessian matrix. Finally, filtering for size and by using background subtraction techniques, each bacillus is effectively isolated in the image. The primary objective was to develop an image processing algorithm in Python that can accurately detect Mycobacteria bacilli in an image for a later deployment in an automated microscope that can improve the timeliness of accurate screenings for acid-fast bacilli (AFB) in a high-volume healthcare setting. Major findings include comparable average and overall object level precision, recall, and F1-score results as compared to the support vector machine (SVM) based algorithm from Chang et al. [9]. Furthermore, this work's algorithm is more accurate on the field level infectiousness accuracy, based on F1-score results, and has a high visual semantic accuracy. / Master of Science tuberculosis Frangi filter image processing Hessian
8	Just diagonalize: a curvelet-based approach to seismic amplitude recovery Herrmann, Felix J., Moghaddam, Peyman P., Stolk, Christiaan C. January 2007 (has links) No description available. curvelet seismic amplitude transform nonlinear approximation wave propagation hessian
9	A study of Hessian fly, Mayetiola destructor (Say), biotypes and resistance in wheats in Morocco El Bouhssini, Mustapha January 1986 (has links) Call number: LD2668 .T4 1986 E42 / Master of Science / Entomology Hessian fly. Wheat--Diseases and pests--Morocco. Masters theses
10	Asymptotic Regularity Estimates for Diffusion Processes Hernandez, David 01 January 2023 (has links) (PDF) A fundamental result in the theory of elliptic PDEs shows that the hessian of solutions of uniformly elliptic PDEs belong to the Sobolev space ��^2,ε. New results show that for the right choice of c, the optimal hessain integrability exponent ε* is given by ε* = �� (1−��) / ��(1−��), �� ∈ (0,1) Through the techniques of asymptotic analysis, the behavior and properties of this function are better understood to establish improved quantitative estimates for the optimal integrability exponent in the ��^2,ε-regularity theory. PDEs Elliptical PDEs Regularity Universal Hessian Estimates Mathematics

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