• 한국자원식물학회지
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• 제14권2호
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• pp.152-156
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• 2001

최근 중국에서 도입되어 경북 북부지방을 중심으로 재배면적이 확대되고 있는 백출의 재배기술확립 시험의 일환으로 화기제거가 생육과 수량에 미치는 영향을 구명하기 위하여 시험 수행 한 결과를 요약하면 다음과 같다. 1. 백출의 화기제거에 따른 지상부 생육은 무제거에 비해 화기제거에서 초장은 1.7∼2.5cm정도 화기가 제거된 만큼 짧았으며 엽의 크기, 경수와 경직경은 차이가 없었으나 지상부 생체중은 48∼60% 감소되었다. 2. 백출의 화기제거시기별 화기생체중은 화기제거시기가 늦어질수록 무거워져 개화직후에는 주당 39g으로 지상부 생 체 중의 60%를 차지 하였다. 3. 화기제거에 따른 지하부 생육은 무제거에 비해 화뢰출현기제거(7월 15일)와 개화전제거(8월 20일)에서 근경장, 근경직경 등이 컷으며 건근경수량도 유의하게 증수되었는데 화뢰출현기제거구는 290.5kg/10a으로 무제거구보다 40% 증수되어 가장 많았다. 4. 정유함량은 무제거구 0.71m1/50g에 비해 화뢰출현기제거는 12% 개화전 제거는 9%증가한 것으로 나타났으나 개화후 제거는 차이가 없었다.

• 전기전자학회논문지
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• 제28권1호
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• pp.110-115
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• 2024

본 논문은 3D NAND Flash memory에서 tapering된 O/N/O(Oxide/Nitride/Oxide) 구조와 blocking oxide를 ferroelectric material로 대체한 O/N/F(Oxide/Nitride/Ferroelectric) 구조의 V_th(Threshold Voltage) 변화량을 분석했다. Tapering 각도가 0°일 때 O/N/F 구조는 O/N/O 구조보다 저항이 작고 WL(Word-Line) 상부와 WL 하부의 V_th 변화량이 감소한다. Tapering된 3D NAND Flash memory는 WL 상부에서 WL 하부로 내려갈수록 channel 면적이 감소하며 channel 저항이 증가한다. 따라서 tapering 각도가 증가할수록 WL 상부의 V_th가 감소하고 WL 하부의 V_th는 증가한다. Tapering된 O/N/F 구조는 channel 반지름 길이와 비례하는 V_fe로 인해 WL 상부의 V_th는 O/N/O 구조보다 더 감소한다. 또한 O/N/F 구조의 WL 하부는 O/N/O 구조보다 V_th가 증가하기 때문에 tapering 각도에 따른 V_th 변화량이 O/N/O 구조보다 더 증가한다.

• 대한수학회논문집
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• 제9권3호
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• pp.579-591
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• 1994

We consider the nonlinear nonautonomous differential system $$(1) x' = f(t,x), x(t_0) = x_0,$$ where $f \in C(R^+ \times R^n, R^n)$ and $R^+ = [0, \infty}$. We assume that the Jacobian matrix $f_x = \partail f/\partial x$ exists and is continuous on $R^+ \times R^n$ and that $f(t,0) \equiv 0$. The symbol $$\mid$\cdot$\mid$$ denotes arbitary norm in $R^n$.

• 대한수학회보
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• 제44권4호
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• pp.623-629
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• 2007

In this paper, we study the uniqueness of entire functions and prove the following result: Let f and g be two nonconstant entire functions, n, m be positive integers. If $f^n(f^m-1)f#\;and\;g^n(g^m-1)g#$ share 1 IM and n>4m+11, then $f{\equiv}g$. The result improves the result of Fang-Fang.

• 충청수학회지
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• 제20권1호
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• pp.23-29
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• 2007

Let X and Y be vector spaces. In this paper we prove that a mapping $f:X{\rightarrow}Y$ satisfies the following functional equation $${\large}\sum_{1{\leq}k<l{\leq}n}\;(f(x_k+x_l)+f(x_k-x_l))-2(n-1){\large}\sum_{i=1}^{n}f(x_i)=0$$ if and only if the mapping f is quadratic. In addition we investigate the generalized Hyers-Ulam-Rassias stability problem for the functional equation.

• 한국해양공학회지
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• 제3권2호
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• pp.108-117
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• 1989

This paper deals with a fatigue life prediction of a surface crack based on the experimentally obtained relationship between surface crack length ratio $a/a_{f}$ and cycle ratio $N/N_{f}$ using micro computer. Firstly $a/a_{f}$-$N/N_{f}$ curves obtained from experimental tests, were assumed as three curves UC(the upper limit curve), LC(the lower limit curve) and MC(the middle curve), and these were utilized to predict the fatigue life. Comparing the calculated values which represent the characteristics of crack growth behaviors from the three assumed curves with the experimental ones, it has been found that in the stable crack growth region, they coincide reasonably well each other. And the differences between the fatigue lives obtained from the assumed curves and the experimental fatigue life did not exceed 20%. Using the characteristics of $a/a_{f}$-$N/N_{f}$ curves, it is possible to predict the da/dN-Kmax curves and the S-$N_{f}$ curves.

• 대한수학회논문집
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• 제9권2호
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• pp.419-421
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• 1994

Recently Hong and Oh [5] provided a fairly general weak law for arrays in the following form: Let {(X/sub ni/, l ≤ i ≤ k/sub n/), n ≥ l}, k/sub n/ → ∞ as n → ∞, be an array of random variables on (Ω, F, P) and set F/sub nj/ = σ{X/sub ni/, 1 ≤ i ≤ j}, 1 ≤ j ≤ k/sub n/, n ≥ 1, and F/sub n0/ = {ø, Ω}, n ≥ 1. Suppose that (equation omitted) aP { X/sub ni/ /sup p/ ＞ a} → 0 as a → ∞ uniformly in n for some 0 < p < 2. Then S/sub n//(equation omitted) → 0 in probability as n → ∞ where S/sub n/ = (equation omitted)(X/sub ni/ - E(X/sib ni/I( X/sub ni/ /sub p/ ≤ k/sub n/) F/sub n,i-l/)). In this note, we will prove the following result under the same domination condition of Hong and Oh [5].(omitted)

• 대한수학회보
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• 제54권1호
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• pp.343-358
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• 2017

Let {$X_i$} be a sequence of stationary ${\alpha}-mixing$ random variables with probability density function f(x). The recursive kernel estimators of f(x) are defined by $$\hat{f}_n(x)={\frac{1}{n\sqrt{b_n}}{\sum_{j=1}^{n}}b_j{^{-\frac{1}{2}}K(\frac{x-X_j}{b_j})\;and\;{\tilde{f}}_n(x)={\frac{1}{n}}{\sum_{j=1}^{n}}{\frac{1}{b_j}}K(\frac{x-X_j}{b_j})$$, where 0 < $b_n{\rightarrow}0$ is bandwith and K is some kernel function. Under appropriate conditions, we establish the Berry-Esseen bounds for these estimators of f(x), which show the convergence rates of asymptotic normality of the estimators.

• 대한수학회보
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• 제57권4호
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• pp.991-1002
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• 2020

We show that when n > m, the following delay differential equation fⁿ(z)f'(z) + p(z)(f(z + c) - f(z))^m = r(z)e^q(z) of rational coefficients p, r doesn't admit any transcendental entire solutions f(z) of finite order. Furthermore, we study the conditions of α₁, α₂ that ensure existence of transcendental meromorphic solutions of the equation fⁿ(z) + f^n-2(z)f'(z) + P_d(z, f) = p₁(z)e^α₁(z) + p₂(z)e^α₂(z). These results have improved some known theorems obtained most recently by other authors.

• 대한수학회논문집
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• 제32권4호
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• pp.959-970
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• 2017

In this paper, we investigate the transcendental meromorphic solutions with finite order of two different types of difference equations $${\sum\limits_{j=1}^{n}}a_jf(z+c_j)={\frac{P(z,f)}{Q(z,f)}}={\frac{{\sum_{k=0}^{p}}b_kf^k}{{\sum_{l=0}^{q}}d_lf^l}}$$ and $${\prod\limits_{j=1}^{n}}f(z+c_j)={\frac{P(z,f)}{Q(z,f)}={\frac{{\sum_{k=0}^{p}}b_kf^k}{{\sum_{l=0}^{q}}d_lf^l}}$$ that share three distinct values with another meromorphic function. Here $a_j$, $b_k$, $d_l$ are small functions of f and $a_j{\not{\equiv}}(j=1,2,{\ldots},n)$, $b_p{\not{\equiv}}0$, $d_q{\not{\equiv}}0$. $c_j{\neq}0$ are pairwise distinct constants. p, q, n are non-negative integers. P(z, f) and Q(z, f) are two mutually prime polynomials in f.