Semantische Repräsentation, obligatorische Aktivierung und verbale Produktion arithmetischer Fakten / Semantic representation, obligatory activation, and verbal production of arithmetic facts

Domahs, Frank

January 2006

Die vorliegende Arbeit widmet sich der Repräsentation und Verarbeitung arithmetischer Fakten. Dieser Bereich semantischen Wissens eignet sich unter anderem deshalb besonders gut als Forschungsgegenstand, weil nicht nur seine einzelne Bestandteile, sondern auch die Beziehungen dieser Bestandteile untereinander außergewöhnlich gut definierbar sind. Kognitive Modelle können also mit einem Grad an Präzision entwickelt werden, der in anderen Bereichen kaum je zu erreichen sein wird. Die meisten aktuellen Modelle stimmen darin überein, die Repräsentation arithmetischer Fakten als eine assoziative, netzwerkartig organisierte Struktur im deklarativen Gedächtnis zu beschreiben. Trotz dieser grundsätzlichen Übereinstimmung bleibt eine Reihe von Fragen offen. In den hier vorgestellten Untersuchungen werden solche offene Fragen in Hinsicht auf drei verschiedene Themenbereiche angegangen: 1) die neuroanatomischen Korrelate 2) Nachbarschaftskonsistenzeffekte bei der verbalen Produktion sowie 3) die automatische Aktivierung arithmetischer Fakten. In einer kombinierten fMRT- und Verhaltensstudie wurde beispielsweise der Frage nachgegangen, welche neurofunktionalen Entsprechungen es für den Erwerb arithmetischer Fakten bei Erwachsenen gibt. Den Ausgangspunkt für diese Untersuchung bildete das Triple-Code-Modell von Dehaene und Cohen, da es als einziges auch Aussagen über neuroanatomische Korrelate numerischer Leistungen macht. Das Triple-Code-Modell geht davon aus, dass zum Abruf arithmetischer Fakten eine „perisylvische“ Region der linken Hemisphäre unter Einbeziehung der Stammganglien sowie des Gyrus angularis nötig ist (Dehaene & Cohen, 1995; Dehaene & Cohen, 1997; Dehaene, Piazza, Pinel, & Cohen, 2003). In der aktuellen Studie sollten gesunde Erwachsene komplexe Multiplikationsaufgaben etwa eine Woche lang intensiv üben, so dass ihre Beantwortung immer mehr automatisiert erfolgt. Die Lösung dieser geübten Aufgaben sollte somit – im Gegensatz zu vergleichbaren ungeübten Aufgaben – immer stärker auf Faktenabruf als auf der Anwendung von Prozeduren und Strategien beruhen. Hingegen sollten ungeübte Aufgaben im Vergleich zu geübten höhere Anforderungen an exekutive Funktionen einschließlich des Arbeitsgedächtnisses stellen. Nach dem Training konnten die Teilnehmer – wie erwartet – geübte Aufgaben deutlich schneller und sicherer beantworten als ungeübte. Zusätzlich wurden sie auch im Magnetresonanztomografen untersucht. Dabei konnte zunächst bestätigt werden, dass das Lösen von Multiplikationsaufgaben allgemein von einem vorwiegend linkshemisphärischen Netzwerk frontaler und parietaler Areale unterstützt wird. Das wohl wichtigste Ergebnis ist jedoch eine Verschiebung der Hirnaktivierungen von eher frontalen Aktivierungsmustern zu einer eher parietalen Aktivierung und innerhalb des Parietallappens vom Sulcus intraparietalis zum Gyrus angularis bei den geübten im Vergleich zu den ungeübten Aufgaben. So wurde die zentrale Bedeutung von Arbeitsgedächtnis- und Planungsleistungen für komplexe ungeübte Rechenaufgaben erneut herausgestellt. Im Sinne des Triple-Code-Modells könnte die Verschiebung innerhalb des Parietallappens auf einen Wechsel von quantitätsbasierten Rechenleistungen (Sulcus intraparietalis) zu automatisiertem Faktenabruf (linker Gyrus angularis) hindeuten. Gibt es bei der verbalen Produktion arithmetischer Fakten Nachbarschaftskonsistenzeffekte ähnlich zu denen, wie sie auch in der Sprachverarbeitung beschrieben werden? Solche Effekte sind nach dem aktuellen „Dreiecksmodell“ von Verguts & Fias (2004) zur Repräsentation von Multiplikationsfakten erwartbar. Demzufolge sollten richtige Antworten leichter gegeben werden können, wenn sie Ziffern mit möglichst vielen semantisch nahen falschen Antworten gemeinsam haben. Möglicherweise sollten demnach aber auch falsche Antworten dann mit größerer Wahrscheinlichkeit produziert werden, wenn sie eine Ziffer mit der richtigen Antwort teilen. Nach dem Dreiecksmodell wäre darüber hinaus sogar der klassische Aufgabengrößeneffekt bei einfachen Multiplikationsaufgaben (Zbrodoff & Logan, 2004) auf die Konsistenzverhältnisse der richtigen Antwort mit semantisch benachbarten falschen Antworten zurückzuführen. In einer Reanalyse der Fehlerdaten von gesunden Probanden (Campbell, 1997) und einem Patienten (Domahs, Bartha, & Delazer, 2003) wurden tatsächlich Belege für das Vorhandensein von Zehnerkonsistenzeffekten beim Lösen einfacher Multiplikationsaufgaben gefunden. Die Versuchspersonen bzw. der Patient hatten solche falschen Antworten signifikant häufiger produziert, welche die gleiche Zehnerziffer wie das richtigen Ergebnisses aufwiesen, als ansonsten vergleichbare andere Fehler. Damit wird die Annahme unterstützt, dass die Zehner- und die Einerziffern zweistelliger Zahlen separate Repräsentationen aufweisen – bei der Multiplikation (Verguts & Fias, 2004) wie auch allgemein bei numerischer Verarbeitung (Nuerk, Weger, & Willmes, 2001; Nuerk & Willmes, 2005). Zusätzlich dazu wurde in einer Regressionsanalyse über die Fehlerzahlen auch erstmalig empirische Evidenz für die Hypothese vorgelegt, dass der klassische Aufgabengrößeneffekt beim Abruf von Multiplikationsfakten auf Zehnerkonsistenzeffekte zurückführbar ist: Obwohl die Aufgabengröße als erster Prädiktor in das Modell einging, wurde diese Variable wieder verworfen, sobald ein Maß für die Nachbarschaftskonsistenz der richtigen Antwort in das Modell aufgenommen wurde. Schließlich wurde in einer weiteren Studie die automatische Aktivierung von Multiplikationsfakten bei gesunden Probanden mit einer Zahlenidentifikationsaufgabe (Galfano, Rusconi, & Umilta, 2003; Lefevre, Bisanz, & Mrkonjic, 1988; Thibodeau, Lefevre, & Bisanz, 1996) untersucht. Dabei sollte erstmals die Frage beantwortet werden, wie sich die automatische Aktivierung der eigentlichen Multiplikationsergebnisse (Thibodeau et al., 1996) zur Aktivierung benachbarter falscher Antworten (Galfano et al., 2003) verhält. Ferner sollte durch die Präsentation mit verschiedenen SOAs der zeitliche Verlauf dieser Aktivierungen aufgeklärt werden. Die Ergebnisse dieser Studie können insgesamt als Evidenz für das Vorhandensein und die automatische, obligatorische Aktivierung eines Netzwerkes arithmetischer Fakten bei gesunden, gebildeten Erwachsenen gewertet werden, in dem die richtigen Produkte stärker mit den Faktoren assoziiert sind als benachbarte Produkte (Operandenfehler). Dabei führen Produkte kleiner Aufgaben zu einer stärkeren Interferenz als Produkte großer Aufgaben und Operandenfehler großer Aufgaben zu einer stärkeren Interferenz als Operandenfehler kleiner Aufgaben. Ein solches Aktivierungsmuster passt gut zu den Vorhersagen des Assoziationsverteilungsmodells von Siegler (Lemaire & Siegler, 1995; Siegler, 1988), bei dem kleine Aufgaben eine schmalgipflige Verteilung der Assoziationen um das richtige Ergebnis herum aufweisen, große Aufgaben jedoch eine breitgipflige Verteilung. Somit sollte die vorliegende Arbeit etwas mehr Licht in bislang weitgehend vernachlässigte Aspekte der Repräsentation und des Abrufs arithmetischer Fakten gebracht haben: Die neuronalen Korrelate ihres Erwerbs, die Konsequenzen ihrer Einbindung in das Stellenwertsystem mit der Basis 10 sowie die spezifischen Auswirkungen ihrer assoziativen semantischen Repräsentation auf ihre automatische Aktivierbarkeit. Literatur Campbell, J. I. (1997). On the relation between skilled performance of simple division and multiplication. Journal of Experimental Psychology: Learning, Memory, and Cognition, 23, 1140-1159. Dehaene, S. & Cohen, L. (1995). Towards an anatomical and functional model of number processing. Mathematical Cognition, 1, 83-120. Dehaene, S. & Cohen, L. (1997). Cerebral pathways for calculation: double dissociation between rote verbal and quantitative knowledge of arithmetic. Cortex, 33, 219-250. Dehaene, S., Piazza, M., Pinel, P., & Cohen, L. (2003). Three parietal circuits for number processing. Cognitive Neuropsychology, 20, 487-506. Domahs, F., Bartha, L., & Delazer, M. (2003). Rehabilitation of arithmetic abilities: Different intervention strategies for multiplication. Brain and Language, 87, 165-166. Galfano, G., Rusconi, E., & Umilta, C. (2003). Automatic activation of multiplication facts: evidence from the nodes adjacent to the product. Quarterly Journal of Experimental Psychology A, 56, 31-61. Lefevre, J. A., Bisanz, J., & Mrkonjic, L. (1988). Cognitive arithmetic: evidence for obligatory activation of arithmetic facts. Memory and Cognition, 16, 45-53. Lemaire, P. & Siegler, R. S. (1995). Four aspects of strategic change: contributions to children's learning of multiplication. Journal of Experimental Psychology: General, 124, 83-97. Nuerk, H. C., Weger, U., & Willmes, K. (2001). Decade breaks in the mental number line? Putting the tens and units back in different bins. Cognition, 82, B25-B33. Nuerk, H. C. & Willmes, K. (2005). On the magnitude representations of two-digit numbers. Psychology Science, 47, 52-72. Siegler, R. S. (1988). Strategy choice procedures and the development of multiplication skill. Journal of Experimental Psychology: General, 117, 258-275. Thibodeau, M. H., Lefevre, J. A., & Bisanz, J. (1996). The extension of the interference effect to multiplication. Canadian Journal of Experimental Psychology, 50, 393-396. Verguts, T. & Fias, W. (2004). Neighborhood Effects in Mental Arithmetic. Psychology Science. Zbrodoff, N. J. & Logan, G. D. (2004). What everyone finds: The problem-size effect. In J. I. D. Campbell (Hrsg.), Handbook of Mathematical Cognition (pp.331-345). New York, NY: Psychology Press. / The present thesis deals with the representation and processing of arithmetic facts. This domain of semantic knowledge has gained a substantial amount of interest as its components as well as their interrelations are well specified. Thus, cognitive models can be developed with a degree of precision, which cannot be reached in many other domains. Most recent models agree that arithmetic facts are represented in an associative, network-like structure in declarative memory. Despite this general agreement a lot of issues still remain unresolved. The open questions tackled in the present work address three different aspects of arithmetic facts: 1) their neuro-anatomical correlates, 2) neighbourhood consistency effects in their verbal production and 3) their automatic activation. In a combined behavioural and fMRI study the neurofunctional correlates of the acquisition of arithmetic facts in adults were examined. This research was based on the Triple-Code-Model of Dehaene and Cohen, the only recent model which makes explicit assumptions on neuroanatomical correlates of numerical abilities. The Triple-Code-Model assumes that a “perisylvian” region in the left hemisphere including the basal ganglia and the Angular Gyrus is involved in the retrieval of arithmetic facts (Dehaene & Cohen, 1995; Dehaene & Cohen, 1997; Dehaene, Piazza, Pinel, & Cohen, 2003). In the present study healthy adults were asked to train complex multiplication problems extensively during one week. Thus, these problems could be solved more and more automatically. It was reasoned that answering these trained problems should more and more rely on the retrieval of facts from declarative memory, whereas answering untrained problems should rely on the application of strategies and procedures, which impose high demands on executive functions including working memory. After the training was finished, participants – as expected – could solve trained problems faster and more accurately than non-trained problems. Participants were also submitted to a functional magnetic resonance imaging examination. In general, this examination added to the evidence for a mainly left hemispheric fronto-parietal network being involved in mental multiplication. Crucially, comparing trained with non-trained problems a shift of activation from frontal to more parietal regions was observed. Thus, the central role of central executive and working memory for complex calculation was highlighted. Moreover, a shift of activation from the Intraparietal Sulcus to the Angular Gyrus took place within the parietal lobe. According to the Triple-Code-Model, this shift may be interpreted to indicate a strategy change from quantity based calculation, relying on the Intraparietal Sulcus, to fact retrieval, relying on the left Angular Gyrus. Are there neighbourhood consistency effects in the verbal production of arithmetic facts similar to what has been described for language production? According to the “Triangle Model” of simple multiplication, proposed by Verguts & Fias (2004), such effects can be expected. According to this model corrects answers can be given more easily if they share digits with many semantically close wrong answers. Moreover, it can be assumed that wrong answers, too, are more likely to be produced if they share a digit with the correct result. In addition to this, the Triangle Model also states that the classical problem size effect in simple multiplication (Zbrodoff & Logan, 2004) can be drawn back to neighbourhood consistency between the correct result and semantically close wrong answers. In fact, a re-analysis of error data from a sample of healthy young adults (Campbell, 1997) and a patient with acalculia (Domahs, Bartha, & Delazer, 2003) provided evidence for the existence of decade consistency effects in the verbal production of multiplication results. Healthy participants and the patient produced significantly more wrong answers which shared the decade digit with the correct result than otherwise comparable wrong answers. This result supports the assumption of separate representations of decade and unit digits in two-digit numbers in multiplication (Verguts & Fias, 2004) and in number processing in general (Nuerk, Weger, & Willmes, 2001; Nuerk & Willmes, 2005). Moreover, an additional regression analysis on the error rates provided first empirical evidence for the hypothesis that the classical problem size effect in the retrieval of multiplication facts may be an artefact of neighbourhood consistency: Although problem size was the first variable to enter the model, it was excluded from the model once a measure for neighbourhood consistency was included. Finally, in a further study the automatic activation of multiplication facts was examined in a number matching task (Galfano, Rusconi, & Umilta, 2003; Lefevre, Bisanz, & Mrkonjic, 1988; Thibodeau, Lefevre, & Bisanz, 1996). This experiment addressed the question how the automatic activation of actual multiplication results (Thibodeau et al., 1996) relates to the activation of semantically close wrong answers (Galfano et al., 2003). Furthermore, using different SOAs the temporal properties of these activations should be disclosed. In general, the results of this study provide evidence for an obligatory and automatic activation of a network of arithmetic facts in healthy educated adults in which correct results are stronger associated with the operands than semantically related wrong answers. Crucially, products of small problems lead to stronger interference effects than products of larger problems while operand errors of large problems lead to stronger interference effects than operand errors of small problems. Such a pattern of activation is in line with predictions of Siegler’s Distribution of Associations Model (Lemaire & Siegler, 1995; Siegler, 1988) which assumes a more peaked distribution of associations between operands and potential results for small compared to large multiplication problems. In sum, the present thesis should shed some light into largely ignored aspects of arithmetic fact retrieval: The neural correlates of its acquisition, the consequences of its implementation in the base 10 place value system, as well as the specific effects of its semantic representation for automatic activation of correct multiplication facts and related results. References Campbell, J. I. (1997). On the relation between skilled performance of simple division and multiplication. Journal of Experimental Psychology: Learning, Memory, and Cognition, 23, 1140-1159. Dehaene, S. & Cohen, L. (1995). Towards an anatomical and functional model of number processing. Mathematical Cognition, 1, 83-120. Dehaene, S. & Cohen, L. (1997). Cerebral pathways for calculation: double dissociation between rote verbal and quantitative knowledge of arithmetic. Cortex, 33, 219-250. Dehaene, S., Piazza, M., Pinel, P., & Cohen, L. (2003). Three parietal circuits for number processing. Cognitive Neuropsychology, 20, 487-506. Domahs, F., Bartha, L., & Delazer, M. (2003). Rehabilitation of arithmetic abilities: Different intervention strategies for multiplication. Brain and Language, 87, 165-166. Galfano, G., Rusconi, E., & Umilta, C. (2003). Automatic activation of multiplication facts: evidence from the nodes adjacent to the product. Quarterly Journal of Experimental Psychology A, 56, 31-61. Lefevre, J. A., Bisanz, J., & Mrkonjic, L. (1988). Cognitive arithmetic: evidence for obligatory activation of arithmetic facts. Memory and Cognition, 16, 45-53. Lemaire, P. & Siegler, R. S. (1995). Four aspects of strategic change: contributions to children's learning of multiplication. Journal of Experimental Psychology: General, 124, 83-97. Nuerk, H. C., Weger, U., & Willmes, K. (2001). Decade breaks in the mental number line? Putting the tens and units back in different bins. Cognition, 82, B25-B33. Nuerk, H. C. & Willmes, K. (2005). On the magnitude representations of two-digit numbers. Psychology Science, 47, 52-72. Siegler, R. S. (1988). Strategy choice procedures and the development of multiplication skill. Journal of Experimental Psychology: General, 117, 258-275. Thibodeau, M. H., Lefevre, J. A., & Bisanz, J. (1996). The extension of the interference effect to multiplication. Canadian Journal of Experimental Psychology, 50, 393-396. Verguts, T. & Fias, W. (2004). Neighborhood Effects in Mental Arithmetic. Psychology Science. Zbrodoff, N. J. & Logan, G. D. (2004). What everyone finds: The problem-size effect. In J. I. D. Campbell (Ed.), Handbook of Mathematical Cognition (pp.331-345). New York, NY: Psychology Press.

Multiplikation

deklaratives Gedächtnis

Rechnen

Einmaleins

Konsistenzeffekt

multiplication

declarative memory

simple arithmetic

calculation

consistency effect

Psychology

Tensor Products on Category O and Kostant's Problem

Kåhrström, Johan

January 2008

This thesis consists of a summary and three papers, concerning some aspects of representation theory for complex finite dimensional semi-simple Lie algebras with focus on the BGG-category O. Paper I is motivated by the many useful properties of functors on category O given by tensoring with finite dimensional modules, such as projective functors and translation functors. We study properties of functors on O given by tensoring with arbitrary (possibly infinite dimensional) modules. Such functors give rise to a faithful action of O on itself via exact functors which preserve tilting modules, via right exact functors which preserve projective modules, and via left exact functors which preserve injective modules. Papers II and III both deal with Kostant's problem. In Paper II we establish an effective criterion equivalent to the answer to Kostant's problem for simple highest weight modules, in the case where the Lie algebra is of type A. Using this, we derive some old and new results which answer Kostant's problem in special cases. An easy sufficient condition derived from this criterion using Kazhdan-Lusztig combinatorics allows for a straightforward computational check using a computer, by which we get a complete answer for simple highest weight modules in the principal block of O for algebras of rank less than 5. In Paper III we relate the answer to Kostant's problem for certain modules to the answer to Kostant's problem for a module over a subalgebra. We also give a new description of a certain quotient of the dominant Verma module, which allows us to give a bound on the multiplicities of simple composition factors of primitive quotients of the universal enveloping algebra.

Semi-simple Lie algebras

Tensor products

Kostant's problem

Primitive quotients

MATHEMATICS

MATEMATIK

Alcohol screening and simple advice in emergency care : staffs’ attitudes and injured patients’ drinking pattern

Nordqvist, Cecilila

January 2005

Background: About 800,000 people are risky drinkers in Sweden and the alcohol consumption has increased around 30% during the last 6 years. In order to counteract the negative effects of drinking there is a need to implement preventive measures at various levels in society. One place where risky drinkers could be identified is the healthcare setting. More than 10% of the visits at emergency departments and 20% of the injuries have been found to be alcohol‐related. So far, very few risky drinkers attending emergency departments receive advice about sensible drinking although there is good research evidence of the efficacy of such advice. Aim: The main aim was to explore the effects of a simple alcohol preventive routine in emergency care on staffs´ attitudes towards alcohol prevention and injury patients´ drinking pattern. Material and methods: A screening and simple advice routine was introduced at the emergency department of Motala County hospital. The staffs´ attitudes were explored by interviews with 12 staff members before the introduction and in 6 follow‐up interviews after a year. All the triage staffs´ attitudes were also measured by a questionnaire before the start of the routine and after 6 months. During the first 6 months of the routine 878 injury patients between 16 and 70 completed an alcohol screening questionnaire. During the next 6 months 647 patients received written advice about sensible drinking after having completed the screening questionnaire. A total of 619 patients included in the 12 months study period were followed‐up by telephone interview and changes in drinking pattern were analyzed. After a further 6 months of intervention a total of 2151 patients had been completing the questionnaire during the total study period of 18 months. The association between drinking pattern and different injury variables was analyzed in order to identify special risk groups and situations. Results: The staff was generally positive to alcohol prevention before the routine started and it was completed as intended. After 6 months of screening the staffs´ role legitimacy and perceived skills had increased. Despite of a further positive change in attitudes towards alcohol prevention the staff was uncertain after the study period whether emergency departments are appropriate settings for alcohol prevention. A total of 9% of the women and 31% of the men attending the emergency department for an injury were defined as risky drinkers. One single item in the questionnaire, concerning frequency of heavy episodic drinking, identified the majority of risky drinkers. In the cohort of patients,who was only screened, 34% was no longer engaged in heavy episodic drinking after 6 months and in the cohort that received written advice in addition to the screening the proportion was 25%. The latter group also increased readiness to change by 14%. The proportion of risky drinkers was higher among injury patients, 21% compared to 15% in the general population in the cathment area. This was mostly explained by a higher proportion of young men in the study group. When drinking pattern was compared, both risky and non‐risky drinkers proved to be significantly more likely than abstainers to be injured in amusement locations, parks, lakes or seas and during play or other recreational activities, when controlling for age and sex. Nine percent of the injury patients reported that they believed that their injury was related to alcohol. Half of this group was non risky‐drinkers. Conclusions: The triage staff performed the intervention as agreed, and in some aspects, which could facilitate further development of alcohol preventive measures, their attitudes changed positively. However, it appears difficult to expect alcohol preventive measures to involve more of the staff’s time than the routine tried, and other practical solutions have to be evaluated. A question about frequency of heavy episodic drinking identified the majority of risky drinkers and could be used as a single screening question. There was a reasonable reduction in heavy episodic drinking among the injury patients. The lack of a control group makes it difficult to fully explain whether this change is a result of the injury per se, the screening and the written advice procedure or a natural fluctuation in the patients´ drinking pattern. More studies are needed in order to establish the minimal levels of intervention in routine care that is accepted by the staff, and has a reasonable effect on risky drinkers’ alcohol consumption.

Emergency department

alcohol prevention

screening

simple advice

staff

attitudes

injury

Social medicine

Socialmedicin

Marche aléatoire sur un groupe : propriétés dimensionnelles de la mesure harmonique

Le Prince, Vincent

20 December 2004

Cette thèse a pour objet l'étude de la mesure harmonique associée à une marche aléatoire sur un groupe hyperbolique ou sur un sous-groupe discret d'un groupe semi-simple. Dans ces deux cadres, les groupes sont munis d'un bord géométrique naturel, qui porte la mesure harmonique. On s'intéresse aux relations entre celle-ci et la structure métrique du bord, à travers l'étude de sa dimension. Dans chacun des cadres, on majore la dimension de la mesure harmonique par le quotient de l'entropie asymptotique et de la vitesse de fuite de la marche aléatoire. Cette majoration nous permet de construire des mesures harmoniques de petite dimension. Un de nos résultats principaux découle de cette construction : la mesure harmonique associée à une marche aléatoire sur un réseau d'un groupe semi-simple peut être singulière par rapport à la mesure de Haar sur l'espace des drapeaux complets.

[MATH] Mathematics

marche aléatoire

groupe semi-simple

groupe hyperbolique

mesure harmonique

entropie

dimension d'une mesure

The Relationship between Insulin Sensitivity and Weight Reduction in Simple Obese and Obese Diabetic Patients

SAKAMOTO, NOBUO, OKUYAMA, MAKIO, YAMANOUCHI, KUNIO, OSHIDA, YOSHIHARU, SATO, YUZO, ISHIGURO, TETSUYA

03 1900

No description available.

physical exercise

euglycemic insulin clamp technique

insulin sensitivity

obese diabetic patients

simple obese subjects

Dynamics of Holomorphic Maps: Resurgence of Fatou coordinates, and Poly-time Computability of Julia Sets

Dudko, Artem

11 December 2012

The present thesis is dedicated to two topics in Dynamics of Holomorphic maps. The first topic is dynamics of simple parabolic germs at the origin. The second topic is Polynomial-time Computability of Julia sets.\\ Dynamics of simple parabolic germs. Let $F$ be a germ with a simple parabolic fixed point at the origin: $F(w)=w+w^2+O(w^3).$ It is convenient to apply the change of coordinates $z=-1/w$ and consider the germ at infinity $$f(z)=-1/F(-1/z)=z+1+O(z^{-1}).$$ The dynamics of a germ $f$ can be described using Fatou coordinates. Fatou coordinates are analytic solutions of the equation $\phi(f(z))=\phi(z)+1.$ This equation has a formal solution \[\tilde\phi(z)=\text{const}+z+A\log z+\sum_{j=1}^\infty b_jz^{-j},\] where $\sum b_jz^{-j}$ is a divergent power series. Using \'Ecalle's Resurgence Theory we show that $\tilde$ can be interpreted as the asymptotic expansion of the Fatou coordinates at infinity. Moreover, the Fatou coordinates can be obtained from $\tilde \phi$ using Borel-Laplace summation. J.~\'Ecalle and S.~Voronin independently constructed a complete set of invariants of analytic conjugacy classes of germs with a parabolic fixed point. We give a new proof of validity of \'Ecalle's construction. \\ Computability of Julia sets. Informally, a compact subset of the complex plane is called \emph if it can be visualized on a computer screen with an arbitrarily high precision. One of the natural open questions of computational complexity of Julia sets is how large is the class of rational functions (in a sense of Lebesgue measure on the parameter space) whose Julia set can be computed in a polynomial time. The main result of Chapter II is the following: Theorem. Let $f$ be a rational function of degree $d\ge 2$. Assume that for each critical point $c\in J_f$ the $\omega$-limit set $\omega(c)$ does not contain either a critical point or a parabolic periodic point of $f$. Then the Julia set $J_f$ is computable in a polynomial time.

Holomorphic dynamics

Resurgence Theory

Simple Parabolic Germs

0280

Undersökning och utformning av ett generellt datainsamlingssystem i LabVIEW / Designing a general program for data-aquisition with LabVIEW

Ek, Fredrik

January 2005

This report is the result of a diploma work made at IMT at US in Linköping. The purpose of this piece of work is to investigate the possibility to design a general program for data-acquisition using LabVIEW, suiting different hardwares and connections. Great importance has been attached to communication with serialport, using bluetooth, because different wireless PPG-instruments has been developed parallel to this project. These PPG-circuits uses this type of serialcommunication. Communication with USB, GPIB and analog connection has also been examined and analog communication has been tested practically. But any serious implementation of these types in the LabVIEW-program has not been made.The paper starts with theory where LabVIEW, bluetooth, PPG, different connections and the different PPG-sensors is described concisely. Theory is followed by a"performance-part"where the course of action and the LabVIEW- program is described.The result of the work is an application in LabVIEW for communication with different PPG-sensors, where interface, protocol and file-standard/format has been designed. The program is adapted to prolonged measurements with full duplex. Measurements can be saved into ascii- or binary format, and signals can be studied carefully in graphs.Since only one PPG-sensor is fully made, a test in measurement and acquisition has been made with that sensor only. Ragarding the other PPG-instruments, the communication has been tested in hyperterminal.

Physiology

Bluetooth

PPG

Simple

Digi

Ext_cpu

Ext_ad

RS-232

Interface

Fysiologi

Physiology

Fysiologi

An Automated XML-Based Webform Management System

Phoungphol, Piyaphol

03 May 2007

In a web application, “webform” plays an important role in providing interactions between users and a server. To develop a webform in conventional method, developers have to create many files including HTML-JavaScript, SQL script, and many server-side programs to process to data. In this thesis, we propose a new language, Webform Language (WFL). WFL can considerably decrease developing time of webform by describing it in XML and a parser will automatically generate all necessary files. In addition, we give an option for user to describe a webform in another language, called Simple Webform Language (SWFL). The syntax of a SWFL is simple and similar to the “CREATE TABLE” statement in SQL. When a parser parse webform description in SWFL, it translated the description to WFL first, and then processed it by as normal WFL.

web form

SQL

XML

Simple Webform Languge

Webform Language

web application

Computer Sciences

Molecular Phylogeography and Species Discrimination of Freshwater <em>Cladophora</em> (Cladophorales, Chlorophyta) in North America

Ross, Sara J.

January 2006

<em>Cladophora</em> is a widespread freshwater filamentous cholorophyte genus and is frequently observed in eutrophic waters where it can produce large nuisance blooms. These blooms can have direct impacts on water intake for power generation, irrigation canals and can be aesthetically unpleasant. Much of the ecological and physiological studies on <em>Cladophora</em> have assumed that the populations of this genus in North America belong to the species <em>Cladophora glomerata</em>. However, this has never been tested despite that it is well documented that identifying freshwater <em>Cladophora</em> to the species level is difficult due morphological variability under different ecological conditions. In addition, the species epithets for freshwater <em>Cladophora</em> are based on European collections and it is not clear if these should be applied to North America. This study examines approximately 40 collections of <em>Cladophora</em> from the Laurentian Great Lakes and 43 from various locations in North America ranging from the Northwest Territories to Puerto Rico. Initially we determined the nucleotide sequences of the internal transcribed spacer (ITS) region of the nuclear ribosomal cistron and observed sequence divergence to be low (0-3%), demonstrating an inability for this marker to resolve species delineation as divergence of this region was low. Amplification of the inter-simple sequence repeat (ISSR) regions were used to analyze microsatellite motif frequency throughout the genome to evaluate the biogeography relationships, including diversity, of freshwater <em>Cladophora</em> sp. five different primers were used on 70 individuals. UPGMA analyses of the presence/absence of bands demonstrate that each of the Great Lake populations separate into groups according to the Lake they were initially sampled from. However, collections from North America are highly variable and do not form well supported biogeographic clades. In addition, these collections appear to be distinct from type cultures of freshwater <em>Cladophora</em> from Europe. Supplementary morphological analysis using suggested taxonomically valid criterion (length and diameter of main axis, ultimate branch, and apical cell) none were able to differentiate Great Lake populations.

Biology

Cladophora

Inter-simple sequence repeats

Internal transcribed spacer region

morphometric analysis

A Survey of the Classification of Division Algebras

Ashburner, Michelle Roshan Marie

January 2008

For a given field F we seek all division algebras over F up to isomorphism. This question was first investigated for division algebras of finite dimension over F by Richard Brauer. We discuss the construction of the Brauer group and some examples. Crossed products and PI algebras are then introduced with a focus on Amitsur's non-crossed product algebra. Finally, we look at some modern results of Bell on the Gelfand-Kirillov dimension of finitely generated algebras over F and the classification of their division subalgebras.

Division Algebra

Central Simple Algebra

Crossed Product

PI Algebra

Growth

Pure Mathematics