• Title/Summary/Keyword: mathematical process

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GIRSANOV THEOREM FOR GAUSSIAN PROCESS WITH INDEPENDENT INCREMENTS

  • Im, Man Kyu;Ji, Un Cig;Kim, Jae Hee
    • Journal of the Chungcheong Mathematical Society
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    • v.19 no.4
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    • pp.383-391
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    • 2006
  • A characterization of Gaussian process with independent increments in terms of the support of covariance operator is established. We investigate the Girsanov formula for a Gaussian process with independent increments.

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STOCHASTIC CALCULUS FOR BANACH SPACE VALUED REGULAR STOCHASTIC PROCESSES

  • Choi, Byoung Jin;Choi, Jin Pil;Ji, Un Cig
    • Journal of the Chungcheong Mathematical Society
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    • v.24 no.1
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    • pp.45-57
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    • 2011
  • We study the stochastic integral of an operator valued process against with a Banach space valued regular process. We establish the existence and uniqueness of solution of the stochastic differential equation for a Banach space valued regular process under the certain conditions. As an application of it, we study a noncommutative stochastic differential equation.

Mathematical Elaboration Process of the Elementary Gifted Children's Board Game Re-creation in Group Project (모둠별 게임 변형을 통한 초등수학영재들의 수학적 정교화 과정 분석)

  • Sung, Ye Won;Song, Sang Hun
    • School Mathematics
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    • v.15 no.3
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    • pp.619-632
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    • 2013
  • One area where research is especially needed is their elaboration process and how they elaborate their idea as a group in a mathematical board game re-creation project. In this research, this process was named 'Mathematical Elaboration Process'. The purpose of this research is to understand how the gifted children elaborate their idea in a small group, and which idea can be chosen for a new board game when they are exposed to a project for making new mathematical board games using the what-if-not strategy. One of the gifted children's classes was chosen in which there were twenty students, and the class was composed of four groups in an elementary school in Korea. The researcher presented a series of re-creation game projects to them during the course of five weeks. To interpret their process of elaborating, the communication of the gifted students was recorded and transcribed. Students' elaboration processes were constructed through the interaction of both the mathematical route and the non-mathematical route. In the mathematical route, there were three routes; favorable thoughts, unfavorable thoughts and a neutral route. Favorable thoughts was concluded as 'Accepting', unfavorable thoughts resulted in 'Rejecting', and finally, the neutral route lead to a 'non-mathematical route'. Mainly, in a mathematical route, the reason of accepting the rule was mathematical thinking and logical reasons. The gifted children also show four categorized non-mathematical reactions when they re-created a mathematical board game; Inconsistency, Liking, Social Proof and Authority.

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A Study of Modelling Task for Mathematical Modelling in the Secondary Schools (중등학교에서 수학적 모델링을 위한 모델링 문항 구성에 관한 연구)

  • Oh, Chun Young
    • East Asian mathematical journal
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    • v.36 no.2
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    • pp.147-172
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    • 2020
  • The purpose of this study is to provide to understand correctly for teachers and pre-service teachers who have the wrong conception of mathematical modeling. We present the differences modeling problems and general application problems to identify between general application and modeling problems. We propose the entire process from modeling tasks development to solve the problems of mathematical modeling. Additionally, the entire process of the possible solutions was concluded for the presented modeling problems. We proposed what students and teachers should perform at each stage of each phase of the modeling cycle. The concrete tasks were suggested for teachers and students at each phase of modeling cycles, with the specific role of the teacher in the overall process for students' modeling activities.

A mathematical theory of the AHP(Analytic Hierarchy Process) and its application to assess research proposals (계층분석적 의사결정(AHP)을 이용한 연구과제 선정방법에 관한 연구)

  • Yang, Jeong-Mo;Lee, Sang-Gu
    • Communications of Mathematical Education
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    • v.22 no.4
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    • pp.459-469
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    • 2008
  • We give a mathematical approach using Linear Algebra, especially largest eigenvalue and eigenvector on decision making support system. We find a mathematical modeling on decision making problem which could be solved by AHP(Analytic Hierarchy Process) method. Especially, we give a new approach to change evaluation indicator weight on assessing research proposals.

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A Case study of Metacognitive Strategy Training on Mathematical Problem Solving (메타인지적 활동의 훈련을 통한 문제해결 과정에서의 사고 과정 분석 사례 연구)

  • Lee, Bong-Ju;Ko, Ho-Kyoung
    • Journal of the Korean School Mathematics Society
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    • v.12 no.3
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    • pp.291-305
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    • 2009
  • The purpose of this article is to formulate the base that mathematical thinking power can be improved through activating the metacognitive ability of students in the math problem solving process. The guidance material for activating the metacognitive ability was devised based on a body of literature and various studies. Two high school students used it in their math problem solving process. They reported that their own mathematical thinking power was improved in this process. And they showed that the necessary strategies and procedures for math problem solving can be monitored and controled by analyzing their own metacognition in the mathematical thinking process. This result suggests that students' metacognition does play an important role in the mathematical thinking process.

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An Analysis of Communication Means in the Elementary Mathematical Small Group Cooperative Learning (초등학교 수학과 소집단 협동학습에 나타나는 의사소통의 수단 분석)

  • Kong, Hee-Jung;Shin, Hang-Kyun
    • Journal of Elementary Mathematics Education in Korea
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    • v.9 no.2
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    • pp.181-200
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    • 2005
  • The purpose of this thesis was to analyze communicational means of mathematical communication in perspective of languages and behaviors. Research questions were as follows; First, how are the characteristics of mathematical languages in communicating process of mathematical small group learning? Second, how are the characteristics of behaviors in communicating process of mathematical small group learning? The analyses of students' mathematical language were as follows; First, the ordinary language that students used was the demonstrative pronoun in general, mainly substituted for mathematical language. Second, students depended on verbal language rather than mathematical representation in case of mathematical communication. Third, quasi-mathematical language was mainly transformed in upper grade level than lower grade, and it was shown prominently in shape and measurement domain. Fourth, In mathematical communication, high level students used mathematical language more widely and initiatively than mid/low level students. Fifth, mathematical language use was very helpful and interactive regardless of the student's level. In addition, the analyses of students' behavior facts were as follows; First, students' behaviors for problem-solving were shown in the order of reading, understanding, planning, implementing, analyzing and verifying. While trials and errors, verifying is almost omitted. Second, in mathematical communication, while the flow of high/middle level students' behaviors was systematic and process-directed, that of low level students' behaviors was unconnected and product-directed.

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Analysis on mathematical behavior characteristics of a mathematically gifted student in independent study (독자적 연구에서 나타난 수학영재의 수학적 행동특성 분석)

  • Jeong, Jin-Yeong;Kang, Soon-Ja
    • The Mathematical Education
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    • v.53 no.4
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    • pp.479-492
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    • 2014
  • According to Krutetskii, the education of mathematically gifted students must be focused on the improvement of creative mathematical ability and the mathematically gifted students need to experience the research process like mathematician. Independent study is highly encouraged as the self-directed activity of highest level in the learning process which is similar to research process used by experts. We conducted independent study as a viable differentiation technique for gifted middle school students in the 3rd grade, which participated in mentorship program for 10 months. Based on the data through the research process, interview with a study participant and his parents, and his blog, we analyzed mathematical behavior characteristics of a study participant. This behavior characteristics are not found in all mathematically gifted students. But through this case study, we understand mathematically gifted students better and furthermore obtain the message for the selection and education of the mathematically gifted students and for the effective method of running mentorship program particularly.