• 한국초등수학교육학회지
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• 제19권4호
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• pp.501-525
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• 2015

본 논문은 2009 개정 교육과정 초등학교 3학년 수학 교과서와 익힘책에 제시된 곱셈과 나눗셈 문장제를 유형별로 분석하고, 초등학교 4학년 학생을 대상으로 문장제 유형에 따른 문제해결능력을 살펴봄으로써 곱셈과 나눗셈 문장제의 효율적인 지도 방안을 생각해보기 위한 것이다. 이를 위해 먼저 초등학교 3학년 수학 교과서와 익힘책에 제시된 자연수의 곱셈 문장제를 동수누가, 비율, 비교, 정렬, 조합의 5가지 의미 유형으로, 나눗셈은 등분제와 포함제의 2가지 유형으로 구분하여 살펴보았다. 이와 함께 곱셈과 나눗셈 문장제에서 미지수의 위치에 따라 처음량, 변화량, 결과량을 묻는 문장제의 구문 유형에 대해서도 살펴보았다. 그런 다음 4학년 학생을 대상으로 문장제 문제해결능력 검사 도구를 개발하였는데, 앞서 분석한 곱셈과 나눗셈의 문장제 유형을 의미와 구문으로 나누어 2차례의 검사를 실시하여 정답률과 학생들의 오답 반응 등을 분석하였다. 분석 결과 곱셈은 동수누가에서의 정답률이 높게 나온 반면 나눗셈의 경우 포함제와 등분제에서 차이를 보이지 않았는데, 이는 교과서의 문제 유형 분포와 상관관계를 보임을 알 수 있다. 이러한 논의를 바탕으로 곱셈과 나눗셈 문장제의 효과적인 지도와 학생들의 문장제 문제해결능력을 향상시키기 위해 다양한 유형의 문장제를 제시할 필요가 있음을 제안하고 있다.

• Communications for Statistical Applications and Methods
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• 제7권3호
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• pp.643-654
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• 2000

In this paper, we review some class of t-norms on which fuzzy arithmetic operations preserve the shapes of fuzzy numbers and the Hausdorff-distance between fuzzy numbers as the measure of distance between fuzzy numbers. And we suggest the least Hausdorff-distance square method for fuzzy linear regression model using shape preserving fuzzy arithmetic operations.

• East Asian mathematical journal
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• 제29권4호
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• pp.355-392
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• 2013

Generally school algebra is to start with introducing variables and algebraic expressions, which have major cognitive obstacles to students in the transfer from arithmetic to algebra. But the recent studies in the teaching school algebra argue the algebraic thinking from an early algebraic point of view. We compare the Korean elementary mathematics textbooks with Americans from this perspective. First, we discuss the history of school algebra in the school curriculum. And Second, we investigate the recent studies in relation to early algebra. We clarify the goals of this study(the importance of early algebra in the elementary school) through these discussions. Next we examine closely the number sense in the arithmetic and the symbol sense in the algebra. And we conclude that the operation sense can connect these senses within early algebra using the algebraic thinking. Finally, we compare the elementary mathematics books between Korean and American according to the components of the operation sense. In this comparative study, we identify a possibility of teaching algebraic thinking in the elementary mathematics and early algebra can be introduced to the elementary mathematics textbooks from aspects of the operation sense.

• 대한수학회보
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• 제54권5호
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• pp.1699-1718
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• 2017

We give a construction of the second Chern number of a vector bundle over a smooth projective surface by means of adelic transition matrices for the vector bundle. The construction does not use an algebraic K-theory and depends on the canonical ${\mathbb{Z}}-torsor$ of a locally linearly compact k-vector space. Analogs of certain auxiliary results for the case of an arithmetic surface are also discussed.

• 전자공학회논문지CI
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• 제43권1호
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• pp.1-8
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• 2006

본 논문은 의사난수발생기로 사용할 수 있는 산술 시프트 레지스터(ASR, Arithmetic Shift Register)를 제안한다. 산술 시프트 레지스터는 $GF(2^n)$상에서 0이 아닌 초기 값에 0 또는 1이 아닌 임의의 수 D를 곱하는 수열로 정의한다. 그리고 이를 본 논문에서는 ASR-D로 표현한다. $GF(2^n)$상에서 $'D^k=1'$ 되는 t가 $'t=2^n-1'$로 유일하게 되는 비복원다항식이 ASR-D의 특성다항식이며, ASR-D의 주기는 $'2^n-1'$로 최대주기를 가진다 갈로이 선형 궤환 시프트 레지스터는 $ASR-2^{-1}$에 해당한다. 그러므로 제안하는 산술 시프트 레지스터는 갈로이 선형 제환 시프트 레지스터를 일반화한 것이다. $GF(2^n)$상의 ASR-D의 선형복잡도는 $'n{\leq}LC{\leq}\frac{n^2+n}{2}'$으로 종래의 선형 궤환 시프트 레지스터와 비교하여 안정도가 높다. 제안한 산술 시프트 레지스터의 소프트웨어 구현은 종래의 선형 제환 시프트 레지스터에 비하여 효율적이며, 하드웨어 복잡도는 동일하다. 제안한 산술 시프트 레지스터는 종래의 선형 제환 시프트 레지스터와 같이 암호, 오류수정부호, 몬테카를로 적분, 데이터통신 등 여러 분야에서 폭 넓게 사용될 수 있다.

• 한국지능시스템학회논문지
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• 제15권6호
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• pp.754-758
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• 2005

There have been several tipical methods being used tomeasure the fuzziness (entropy) of fuzzy sets. Pedrycz is the original motivation of this paper. Recently, Wang and Chiu [FSS103(1999) 443-455] and Pedrycz [FSS 64(1994) 21-30] showed the relationship(addition, subtraction, multiplication) between the entropies of the resultant fuzzy number and the original fuzzy numbers of same type. In this paper, using Lebesgue-Stieltjes integral, we generalize results of Wang and Chiu [FSS 103(1999) 443-455] concerning entropy arithmetic operations without the condition of same types of fuzzy numbers. And using this results and trade-off relationship between information energy and entropy, we study more properties of information energy of fuzzy numbers.

• 대한전기학회:학술대회논문집
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• 대한전기학회 1987년도 전기.전자공학 학술대회 논문집(II)
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• pp.1185-1187
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• 1987

Digital systems are increasingly being used in the ranges of many control engineering. The residue number system offers the possibility of high speed operation and error correction. The compact self-checking pulse-train residue arithmetic circuit is proposed. A fault tolerant digital filter is practically implemented using these proposed circuits.

• 대한의용생체공학회:학술대회논문집
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• 대한의용생체공학회 1994년도 추계학술대회
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• pp.31-38
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• 1994

This paper proposed signal decomposition and multiresolution representation through wavelet transform using wavelet orthonormal basis. And it suggested most appropriate filter for scaling function in multiresoltion representation and compared two compression method, arithmetic coding and Huffman coding. Results are as follows 1. Daub18 coefficient is most appropriate in computing time, energy compaction, image quality. 2. In case of image browsing that should be small in size and good for recognition, it is reasonable to decompose to 3 scale using pyramidal algorithm. 3. For the case of progressive transmittion where requires most grateful image reconstruction from least number of sampls or reconstruction at any target rate, I embedded the data in order of significance after scaling to 5 step. 4. Medical images such as information loss is fatal have to be compressed by lossless method. As a result from compressing 5 scaled data through arithmetic coding and Huffman coding, I obtained that arithmetic coding is better than huffman coding in processing time and compression ratio. And in case of arithmetic coding I could compress to 38% to original image data.

• JSTS:Journal of Semiconductor Technology and Science
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• 제13권5호
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• pp.473-481
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• 2013

A fractional folding analog-to-digital converter (ADC) with a novel arithmetic digital encoding technique is discussed. In order to reduce the asymmetry errors of the boundary conditions for the conventional folding ADC, a structure using an odd number of folding blocks and fractional folding rate is proposed. To implement the fractional technique, a new arithmetic digital encoding technique composed of a memory and an adder is described. Further, the coding errors generated by device mismatching and other external factors are minimized, since an iterating offset self-calibration technique is adopted with a digital error correction logic. A prototype 8-bit 1GS/s ADC has been fabricated using an 1.2V 0.13 um 1-poly 6-metal CMOS process. The effective chip area is $2.1mm^2$(ADC core : $1.4mm^2$, calibration engine : $0.7mm^2$), and the power consumption is 88 mW. The measured SNDR is 46.22 dB at the conversion rate of 1 GS/s. Both values of INL and DNL are within 1 LSB.

• 한국데이터정보과학회:학술대회논문집
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• 한국데이터정보과학회 2006년도 추계 학술발표회 논문집
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• pp.81-95
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• 2006

The usual arithmetic operations on real numbers can be extended to arithmetical operations on fuzzy intervals by means of Zadeh's extension principle based on a t-norm T. A t-norm is called consistent with respect to a class of fuzzy intervals for some arithmetic operation if this arithmetic operation is closed for this class. It is important to know which t-norms are consistent with a particular type of fuzzy intervals. Recently Dombi and Gyorbiro proved that addition is closed if the Dombi t-norm is used with two bell-shaped fuzzy intervals. A result proved by Mesiar on a strict t-norm based shape preserving additions of LR-fuzzy intervals with unbounded support is recalled. As applications, we define a broader class of bell-shaped fuzzy intervals. Then we study t-norms which are consistent with these particular types of fuzzy intervals. Dombi and Gyorbiro's results are special cases of the results described in this paper.