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1. A Simple Introduction to the SiMPL Method for Density-Based Topology Optimization

Author

Kim, Dohyun, Lazarov, Boyan Stefanov, Surowiec, Thomas M., and Keith, Brendan

Subjects
Mathematics - Optimization and Control, Mathematics - Numerical Analysis
Abstract

We introduce a novel method for solving density-based topology optimization problems: Sigmoidal Mirror descent with a Projected Latent variable (SiMPL). The SiMPL method (pronounced as "the simple method") optimizes a design using only first-order derivative information of the objective function. The bound constraints on the density field are enforced with the help of the (negative) Fermi--Dirac entropy, which is also used to define a non-symmetric distance function called a Bregman divergence on the set of admissible designs. This Bregman divergence leads to a simple update rule that is further simplified with the help of a so-called latent variable. Because the SiMPL method involves discretizing the latent variable, it produces a sequence of pointwise-feasible iterates, even when high-order finite elements are used in the discretization. Numerical experiments demonstrate that the method outperforms other popular first-order optimization algorithms. To outline the general applicability of the technique, we include examples with (self-load) compliance minimization and compliant mechanism optimization problems.

Published
2024

2. Analysis of the SiMPL method for density-based topology optimization

Author

Keith, Brendan, Kim, Dohyun, Lazarov, Boyan S., and Surowiec, Thomas M.

Subjects
Mathematics - Optimization and Control, Mathematics - Numerical Analysis, 68Q25, 68R10, 68U05
Abstract

We present a rigorous convergence analysis of a new method for density-based topology optimization: Sigmoidal Mirror descent with a Projected Latent variable. SiMPL provides point-wise bound preserving design updates and faster convergence than other popular first-order topology optimization methods. Due to its strong bound preservation, the method is exceptionally robust, as demonstrated in numerous examples here and in a companion article. Furthermore, it is easy to implement with clear structure and analytical expressions for the updates. Our analysis covers two versions of the method, characterized by the employed line search strategies. We consider a modified Armijo backtracking line search and a Bregman backtracking line search. Regardless of the line search algorithm, SiMPL delivers a strict monotone decrease in the objective function and further intuitive convergence properties, e.g., strong and pointwise convergence of the density variables on the active sets, norm convergence to zero of the increments, and more. In addition, the numerical experiments demonstrate apparent mesh-independent convergence of the algorithm and superior performance over the two most popular first-order methods in topology optimization: OC and MMA.

Published
2024

5. A Risk Management Perspective on Statistical Estimation and Generalized Variational Inference

Author

Javeed, Aurya S., Kouri, Drew P., and Surowiec, Thomas M.

Subjects
Mathematics - Optimization and Control, Mathematics - Probability, Mathematics - Statistics Theory, 62A10, 62A15, 62C12, 62G05, 62G07
Abstract

Generalized variational inference (GVI) provides an optimization-theoretic framework for statistical estimation that encapsulates many traditional estimation procedures. The typical GVI problem is to compute a distribution of parameters that maximizes the expected payoff minus the divergence of the distribution from a specified prior. In this way, GVI enables likelihood-free estimation with the ability to control the influence of the prior by tuning the so-called learning rate. Recently, GVI was shown to outperform traditional Bayesian inference when the model and prior distribution are misspecified. In this paper, we introduce and analyze a new GVI formulation based on utility theory and risk management. Our formulation is to maximize the expected payoff while enforcing constraints on the maximizing distribution. We recover the original GVI distribution by choosing the feasible set to include a constraint on the divergence of the distribution from the prior. In doing so, we automatically determine the learning rate as the Lagrange multiplier for the constraint. In this setting, we are able to transform the infinite-dimensional estimation problem into a two-dimensional convex program. This reformulation further provides an analytic expression for the optimal density of parameters. In addition, we prove asymptotic consistency results for empirical approximations of our optimal distributions. Throughout, we draw connections between our estimation procedure and risk management. In fact, we demonstrate that our estimation procedure is equivalent to evaluating a risk measure. We test our procedure on an estimation problem with a misspecified model and prior distribution, and conclude with some extensions of our approach.

Published
2023

6. Proximal Galerkin: A structure-preserving finite element method for pointwise bound constraints

Author

Keith, Brendan and Surowiec, Thomas M.

Subjects
Mathematics - Numerical Analysis, Mathematics - Optimization and Control
Abstract

The proximal Galerkin finite element method is a high-order, low-iteration complexity, nonlinear numerical method that preserves the geometric and algebraic structure of point-wise bound constraints in infinite-dimensional function spaces. This paper introduces the proximal Galerkin method and applies it to solve free boundary problems, enforce discrete maximum principles, and develop a scalable, mesh-independent algorithm for optimal design with pointwise bound constraints. This paper also introduces the latent variable proximal point (LVPP) algorithm, from which the proximal Galerkin method derives. When analyzing the classical obstacle problem, we discover that the underlying variational inequality can be replaced by a sequence of second-order partial differential equations (PDEs) that are readily discretized and solved with, e.g., the proximal Galerkin method. Throughout this work, we arrive at several contributions that may be of independent interest. These include (1) a semilinear PDE we refer to as the entropic Poisson equation; (2) an algebraic/geometric connection between high-order positivity-preserving discretizations and certain infinite-dimensional Lie groups; and (3) a gradient-based, bound-preserving algorithm for two-field, density-based topology optimization. The complete proximal Galerkin methodology combines ideas from nonlinear programming, functional analysis, tropical algebra, and differential geometry and can potentially lead to new synergies among these areas as well as within variational and numerical analysis. This work is accompanied by open-source implementations of our methods to facilitate reproduction and broader adoption.

Published
2023

9. Optimal Control of the Landau-de Gennes Model of Nematic Liquid Crystals

Author

Surowiec, Thomas M. and Walker, Shawn W.

Subjects
Mathematics - Optimization and Control, Mathematics - Analysis of PDEs, Mathematics - Numerical Analysis, 49M25, 35K91, 65N30
Abstract

We present an analysis and numerical study of an optimal control problem for the Landau-de Gennes (LdG) model of nematic liquid crystals (LCs), which is a crucial component in modern technology. They exhibit long range orientational order in their nematic phase, which is represented by a tensor-valued (spatial) order parameter $Q = Q(x)$. Equilibrium LC states correspond to $Q$ functions that (locally) minimize an LdG energy functional. Thus, we consider an $L^2$-gradient flow of the LdG energy that allows for finding local minimizers and leads to a semi-linear parabolic PDE, for which we develop an optimal control framework. We then derive several a priori estimates for the forward problem, including continuity in space-time, that allow us to prove existence of optimal boundary and external ``force'' controls and to derive optimality conditions through the use of an adjoint equation. Next, we present a simple finite element scheme for the LdG model and a straightforward optimization algorithm. We illustrate optimization of LC states through numerical experiments in two and three dimensions that seek to place LC defects (where $Q(x) = 0$) in desired locations, which is desirable in applications., Comment: 26 pages, 9 figures

Published
2023

10. Magnetocaloric effect in the high-temperature antiferromagnet YbCoC2

Author

Salamatin, D. A., Krasnorussky, V. N., Semeno, A. V., Bokov, A. V., Velichkov, A., Surowiec, Z., and Tsvyashchenko, A. V.

Subjects
Condensed Matter - Strongly Correlated Electrons
Abstract

The magnetic $H$-$T$ phase diagram and magnetocaloric effect in the recently discovered high-temperature heavy-fermion compound YbCoC$_2$ have been studied. With the increase in the external magnetic field YbCoC$_2$ experiences the metamagnetic transition and then transition to the ferromagnetic state. The dependencies of magnetic entropy change -$\Delta S_m (T)$ have segments with positive and negative magnetocaloric effects for $\Delta H \leq 6$~T. For $\Delta H = 9$~T magnetocaloric effect becomes positive with a maximum value of -$\Delta S_m (T)$ is 4.1 J / kg K and a refrigerant capacity is 56.6 J / kg.

Published
2023

11. Risk-averse optimal control of random elliptic variational inequalities

Author

Alphonse, Amal, Geiersbach, Caroline, Hintermüller, Michael, and Surowiec, Thomas M.

Subjects
Mathematics - Optimization and Control, Mathematics - Analysis of PDEs, Mathematics - Probability
Abstract

We consider a risk-averse optimal control problem governed by an elliptic variational inequality (VI) subject to random inputs. By deriving KKT-type optimality conditions for a penalised and smoothed problem and studying convergence of the stationary points with respect to the penalisation parameter, we obtain two forms of stationarity conditions. The lack of regularity with respect to the uncertain parameters and complexities induced by the presence of the risk measure give rise to new challenges unique to the stochastic setting. We also propose a path-following stochastic approximation algorithm using variance reduction techniques and demonstrate the algorithm on a modified benchmark problem., Comment: 31 pages

Published
2022

13. Asymptotic Consistency for Nonconvex Risk-Averse Stochastic Optimization with Infinite Dimensional Decision Spaces

Author

Milz, Johannes and Surowiec, Thomas M.

Subjects
Mathematics - Optimization and Control, Mathematics - Statistics Theory, 90C15, 90C06, 62F12, 35Q93, 49M41, 49J52
Abstract

Optimal values and solutions of empirical approximations of stochastic optimization problems can be viewed as statistical estimators of their true values. From this perspective, it is important to understand the asymptotic behavior of these estimators as the sample size goes to infinity. This area of study has a long tradition in stochastic programming. However, the literature is lacking consistency analysis for problems in which the decision variables are taken from an infinite dimensional space, which arise in optimal control, scientific machine learning, and statistical estimation. By exploiting the typical problem structures found in these applications that give rise to hidden norm compactness properties for solution sets, we prove consistency results for nonconvex risk-averse stochastic optimization problems formulated in infinite dimensional space. The proof is based on several crucial results from the theory of variational convergence. The theoretical results are demonstrated for several important problem classes arising in the literature., Comment: 24 pages

Published
2022
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19. Pozycja geopolityczna Chin w ujęciu potęgometrycznym

Author

Krzysztof Surowiec

Subjects
china's position, powermetrics, sułek model, geopolitics, security, Political science
Abstract

After the end of the Cold War, the geopolitical situation in the world began to change rapidly. The decline in Russia's importance enabled the U.S. to achieve world supremacy for two decades, but since the beginning of the 21st century there has also been a very rapid rise in China's power. The purpose of the article is to explain the reasons for the country's growth in recent decades, based on analyses of its geopolitical position, as determined by synthetic measures of power, particularly by the Mirosław Sułek model, as well as available rankings. China's position calculated on the basis of synthetic measures indicated that China, in all categories of power in the 21st century, ranked first or second in the world. No other country has achieved such a position in the 21st century except the US and China. It is worth noting that in terms of economic/general power, Beijing has already surpassed Washington in 2017. In the other models presented for the 2019-23 power categories, China also ranked very high. In contrast, the selected rankings present an overall low position of the Middle Kingdom.

Published
2024

21. Impact of Kidney Function on Physiological Assessment of Coronary Circulation

Author

Wojciech Zasada, Barbara Zdzierak, Tomasz Rakowski, Beata Bobrowska, Agata Krawczyk-Ożóg, Sławomir Surowiec, Stanisław Bartuś, Andrzej Surdacki, and Artur Dziewierz

Subjects
borderline stenoses, fractional flow reserve, glomerular filtration rate, instantaneous wave-free ratio, physiological assessment, resting full-cycle ratio, Diseases of the circulatory (Cardiovascular) system, RC666-701
Abstract

Background: Diagnosing myocardial ischemia in chronic kidney disease (CKD) patients is crucial since coronary artery disease (CAD) forms the predominant cause of mortality in these patients. Thus, this study aimed to assess the impact of kidney function on the results of coronary circulation physiological assessment. Methods: Data were collected from 279 consecutive patients admitted to the Clinical Department of Cardiology and Cardiovascular Interventions at the University Hospital in Krakow. A total of 417 vessels were assessed for fractional flow reserve (FFR) and non-hyperemic resting pressure ratios, such as instantaneous wave-free ratio (iFR) and resting full-cycle ratio (RFR). Patients were categorized into two groups: glomerular filtration rate (GFR)-L (estimated GFR (eGFR)

Published
2024
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22. Optimal Control of the Kirchhoff Equation

Author

Hashemi, Masoumeh, Herzog, Roland, and Surowiec, Thomas M.

Subjects
Mathematics - Optimization and Control, Mathematics - Numerical Analysis
Abstract

We consider an optimal control problem for the steady-state Kirchhoff equation, a prototype for nonlocal partial differential equations, different from fractional powers of closed operators. Existence and uniqueness of solutions of the state equation, existence of global optimal solutions, differentiability of the control-to-state map and first-order necessary optimality conditions are established. The aforementioned results require the controls to be functions in $H^1$ and subject to pointwise upper and lower bounds. In order to obtain the Newton differentiability of the optimality conditions, we employ a Moreau-Yosida-type penalty approach to treat the control constraints and study its convergence. The first-order optimality conditions of the regularized problems are shown to be Newton diffentiable, and a generalized Newton method is detailed. A discretization of the optimal control problem by piecewise linear finite elements is proposed and numerical results are presented.

Published
2021

24. THE POWER STATUS OF ASIAN AND PACIFIC REGION STATES ON THE BASIS OF SYNTHETIC POWER MEASURES FROM 1992 TO 2022

Author

Krzysztof SUROWIEC and Petro MATEICHYK

Subjects
security, power status, powermetrics, asia and the pacific, Social Sciences
Abstract

This paper presents power status in Asia and the Pacific region states – an issue that has a major impact on the international security of countries. To illustrate this, the study takes the period after the end of the Cold War, from 1992 to 2022. The purpose of the paper is to characterize the power status of the Asian and Pacific region countries based on synthetic power measures, adopting the powermetrics model of Professor Mirosław Sułek to calculate the power of states. The analysis proves that the most important role in international security is played by the countries known as superpowers and world powers, whose power enables the implementation of relevant strategic goals, especially in such an important region as Asia and the Pacific. In the coming decades, there is a high probability that China will gain the status of a superpower, while the US must fight to maintain its global position among the rapidly developing countries of the Asia-Pacific region, which in the game for power may take away some of Washington’s current advantage.

Published
2023
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25. Risk awareness in making consumer online decisions during Covid-19 pandemichttps://www.editorialsystem.com/editor/jms/js/article/176172/#

Author

Agnieszka Barbara Bojanowska, Monika Kulisz, and Agnieszka Surowiec

Subjects
risk, consumer decisions, consumer behavior, covid-19 pandemic, marketing, Social Sciences
Abstract

Objectives Every organization operating in the 20s of the 21st century struggles with operating in a turbulent environment. The effects of the Covid-19 pandemic, which are still being felt today, cause some changes in customer behavior. This article focuses on the study of this phenomenon in relation to the risk perceived by customers in making online purchases. The article's purpose is to identify the broad management implications of online shopping risk perceptions among consumers during the Covid-19 pandemic. Material and methods The research conducted concerns customers' purchasing risk perceptions. An analysis is made of the countermeasures respondents use to minimize purchasing risks. The research used a diagnostic survey on a sample of 1,000 consumers. Results The results of the conducted surveys indicate that consumers in general are aware of the risks associated with purchasing various goods via the Internet. In addition, it can be concluded that age is not significant when it comes to the perception of purchasing risks when shopping online, while concerns about buying online are dependent on the respondents' sex. There is also a statistically significant difference between the respondents' sex and sensitivity to purchase risk in various aspects. Conclusions This paper fulfils a gap in knowledge about shopping risk perceptions among consumers during the Covid-19 pandemic.

Published
2023
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26. Fair division in Shaplay sense - case studies

Author

Agnieszka Surowiec and Tomasz Warowny

Subjects
shapley value, fair division, n-person games, game theory, cost sharing, Social Sciences
Abstract

Objectives The aim of the work is to determine the Shapley value for the considered cases, important from the point of view of financial management. Material and methods Case descriptions, game theory, Shapley value Results In the examples considered regarding the construction of a private common road and the division of profits between the company owner and his employees, the Shapley value represents a fair division, but contrary to the social sense of justice. In the first example, a pre-imposed, equal or proportional division of costs could only satisfy one of the considered players, while in the second, although the example is idealized (e.g. it does not take into account competition on the market), the result allows to justify why the boss (company owner, president) earns incomparably more than his employees. Conclusions The work shows that even in a very simplified situation, various division concepts are possible, which may contradict each other and other requirements for decision-making methods.

Published
2023
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27. On Binary Optimal Control in $H^s(0,T)$, $s < 1/2$

Author

Manns, Paul and Surowiec, Thomas M.

Subjects
Mathematics, QA1-939
Abstract

The function space $H^s(0,T)$, $s < 1/2$, allows for functions with jump discontinuities and is thus attractive for treating optimal control problems with discrete-valued control functions. We show that while arbitrary chattering controls are impossible, there exist feasible controls in $H^s(0,T)$ that have countably jump discontinuities with jump height one in each of countably many pairwise disjoint intervals. However, under mild assumptions, we show that certain types of jump discontinuities cannot be optimal. The derivation of meaningful optimality conditions via a direct variational argument using simple feasible perturbations remains a major challenge; as illustrated by an example.

Published
2023
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31. Asymptotic Properties of Monte Carlo Methods in Elliptic PDE-Constrained Optimization under Uncertainty

Author

Römisch, Werner and Surowiec, Thomas M.

Subjects
Mathematics - Optimization and Control, Mathematics - Numerical Analysis, Mathematics - Probability, 49J20 49J55 60F17 65C05 90C15 35R60
Abstract

Monte Carlo approximations for random linear elliptic PDE constrained optimization problems are studied. We use empirical process theory to obtain best possible mean convergence rates $O(n^{-\frac{1}{2}})$ for optimal values and solutions, and a central limit theorem for optimal values. The latter allows to determine asymptotically consistent confidence intervals by using resampling techniques.

Published
2021

33. Deep Learning ECG Signal Analysis: Description and Preliminary Results

Author

Surowiec, Mateusz, Ciskowski, Piotr, Kluwak, Kondrad, Jeleń, Łukasz, Kacprzyk, Janusz, Series Editor, Gomide, Fernando, Advisory Editor, Kaynak, Okyay, Advisory Editor, Liu, Derong, Advisory Editor, Pedrycz, Witold, Advisory Editor, Polycarpou, Marios M., Advisory Editor, Rudas, Imre J., Advisory Editor, Wang, Jun, Advisory Editor, Zamojski, Wojciech, editor, Mazurkiewicz, Jacek, editor, Sugier, Jarosław, editor, and Walkowiak, Tomasz, editor

Published
2023
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40. Summary

Author

Bek-Gaik, Bogusława, primary and Surowiec, Anna, additional

Published
2023
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46. Am I big boned? Bone length scaled reference data for HRpQCT measures of the radial and tibial diaphysis in White adults

Author

Stuart J. Warden, Robyn K. Fuchs, Ziyue Liu, Katelynn R. Toloday, Rachel Surowiec, and Sharon M. Moe

Subjects
Bone allometry, Bone strength, Cortical bone, Normative data, Osteoporosis, Diseases of the musculoskeletal system, RC925-935
Abstract

Cross-sectional size of a long bone shaft influences its mechanical properties. We recently used high-resolution peripheral quantitative computed tomography (HRpQCT) to create reference data for size measures of the radial and tibial diaphyses. However, data did not take into account the impact of bone length. Human bone exhibits relatively isometric allometry whereby cross-sectional area increases proportionally with bone length. The consequence is that taller than average individuals will generally have larger z-scores for bone size outcomes when length is not considered. The goal of the current work was to develop a means of determining whether an individual's cross-sectional bone size is suitable for their bone length. HRpQCT scans performed at 30 % of bone length proximal from the distal end of the radius and tibia were acquired from 1034 White females (age = 18.0 to 85.3 y) and 392 White males (age = 18.4 to 83.6 y). Positive relationships were confirmed between bone length and cross-sectional areas and estimated mechanical properties. Scaling factors were calculated and used to scale HRpQCT outcomes to bone length. Centile curves were generated for both raw and bone length scaled HRpQCT data using the LMS approach. Excel-based calculators are provided to facilitate calculation of z-scores for both raw and bone length scaled HRpQCT outcomes. The raw z-scores indicate the magnitude that an individual's HRpQCT outcomes differ relative to expected sex- and age-specific values, with the scaled z-scores also considering bone length. The latter enables it to be determined whether an individual or population of interest has normal sized bones for their length, which may have implications for injury risk. In addition to providing a means of expressing HRpQCT bone size outcomes relative to bone length, the current study also provides centile curves for outcomes previously without reference data, including tissue mineral density and moments of inertia.

Published
2024
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47. Computing multiple solutions of topology optimization problems

Author

Papadopoulos, Ioannis P. A., Farrell, Patrick E., and Surowiec, Thomas M.

Subjects
Mathematics - Numerical Analysis, Computer Science - Computational Engineering, Finance, and Science
Abstract

Topology optimization problems often support multiple local minima due to a lack of convexity. Typically, gradient-based techniques combined with continuation in model parameters are used to promote convergence to more optimal solutions; however, these methods can fail even in the simplest cases. In this paper, we present an algorithm to perform a systematic exploratory search for the solutions of the optimization problem via second-order methods without a good initial guess. The algorithm combines the techniques of deflation, barrier methods and primal-dual active set solvers in a novel way. We demonstrate this approach on several numerical examples, observe mesh-independence in certain cases and show that multiple distinct local minima can be recovered.

Published
2020

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