• The Korean Journal of Applied Statistics
• /
• v.11 no.2
• /
• pp.287-302
• /
• 1998

Saddlepoint approximation to the distribution function of sample mean(Daniels, 1987) is extended to the case of general statistic in this paper. The suggested approximation methods are applied to derive the approximations to the distributions of some statistics, including sample valiance and studentized mean. Some comparisons with other methods show that the suggested approximations are very accurate for moderate or small sample sizes. Even in extreme tail the accuracies are also maintained.

• Proceedings of the Korea Information Processing Society Conference
• /
• 2003.05a
• /
• pp.367-370
• /
• 2003

과학자나 공학자들은 빛이나 소리와 같이 주기적인 특성을 갖는 현상을 연구하는 경우가 많다. Fourier 변환은 이러한 주기함수의 근사 함수를 구할 때 유용하게 이용되고 있다. 본 논문에서는 극좌표 표현되는 함수의 근사 함수를 구하는 문제를 다룬다 일반적으로 컴퓨터 상에 구현하기 위해서는 이산형 Fourier 급수전개를 이용하는데 지금까지는 근사 함수를 컴퓨터 상에서 구할 때 이산화 표본수를 경험에 의해 임의로 결정하여 이용하였으나 본 연구에서는 Fourier 변환의 성질을 이용하여 주어진 함수에 따라 필요한 이산화 표본 수를 자동적으로 결정하는 알고리즘을 제안한다.

• 전기의세계
• /
• v.10
• /
• pp.10-18
• /
• 1963

본 논문은 Laguerre함수의 Fourier변환에 의한 Wiener와 Lee의 회로망구성법을 일반화한 것이다. 즉 Laplace변환을 사용하여 시간영역에서 임의의 과도특성을 나타내는 회로를 구성하는 문제를 복소주파수면상의 직교함수계에 의한 근사문제로 귀착시켰으며 이때 얻어진 근사함수의 물리적실현성을 확인하고 실제구성예를 들었다. 이때 근사함수로는 복소극이 포함되었을 때도 적용할 수 있도록 이론과 방법이 일반화되었다.

• The Korean Journal of Applied Statistics
• /
• v.14 no.2
• /
• pp.333-344
• /
• 2001

통계적 추론에 사용되는 많은 통계량들은 평균벡터의 평활함수의 형태로 표현이 가능하다. 본 연구에서는 이들 통계량들의 분포함수에 대한 안부점근사법을 제시하였다. 이 방법은 Na(1998)에서 제시된 일반적 통계량의 분포함수에 대한 안부점근사법이 평균벡터의 평활함수모형에 특히 유용하게 사용될 수 있음을 보인 것이다. 이 근사법은 정규근사에 비해 근사의 정도가 뛰어나며, 특히 통계량의 꼬리부분의 확률에 대해서도 정확도가 그대로 유지되는 장점이 있어 정밀한 추론이 요구되는 많은 문제에 효과적으로 사용될 수 있다. 모의 실험에 사용할 평균벡터의 평활함수 모형으로는 스튜던트화 분산을 고려하였다.

• The Journal of the Korea Contents Association
• /
• v.21 no.3
• /
• pp.616-625
• /
• 2021

Deep neural networks are an approximation method that approximates an arbitrary function to a linear model and then repeats additional approximation using a nonlinear active function. In this process, the method of evaluating the performance of approximation uses the loss function. Existing in-depth learning methods implement approximation that takes into account loss functions in the linear approximation process, but non-linear approximation phases that use active functions use non-linear transformation that is not related to reduction of loss functions of loss. This study proposes parametric activation functions that introduce scale parameters that can change the scale of activation functions and location parameters that can change the location of activation functions. By introducing parametric activation functions based on scale and location parameters, the performance of nonlinear approximation using activation functions can be improved. The scale and location parameters in each hidden layer can improve the performance of the deep neural network by determining parameters that minimize the loss function value through the learning process using the primary differential coefficient of the loss function for the parameters in the backpropagation. Through MNIST classification problems and XOR problems, parametric activation functions have been found to have superior performance over existing activation functions.

• The Korean Journal of Applied Statistics
• /
• v.20 no.2
• /
• pp.333-343
• /
• 2007

The auxiliary renewal function has an important role in analyzng queues in which the either of the inter-arrival time and the service time of customers is not exponential. As like the renewal function, the auxiliary renewal function is hard to compute although it can be defined theoretically. In this paper, we suggest two approximations for auxiliary renewal function and compare the two with the true value of auxiliary renewal function which can be computed in some special cases.

• The Transactions of the Korea Information Processing Society
• /
• v.7 no.6
• /
• pp.1867-1873
• /
• 2000

Function approximation from a set of input-output pairs has numerous applications in scientific and engineering areas. Support vector machine (SVM) is a new and very promising classification, regression and function approximation technique developed by Vapnik and his group at AT&TG Bell Laboratories. However, it has failed to establish itself as common machine learning tool. This is partly due to the fact that this is not easy to implement, and its standard implementation requires the use of optimization package for quadratic programming (QP). In this appear we present simple iterative Kernel Adatron (KA) algorithm for function approximation and compare it with standard SVM algorithm using QP.

• The Korean Journal of Applied Statistics
• /
• v.29 no.4
• /
• pp.571-579
• /
• 2016

Most of studies related to the distributions of quadratic forms are conducted under the assumption of multivariate normal distribution. In this paper, we suggested an approximation to the distribution of quadratic forms based on multivariate skew-normal distribution as alternatives for multivariate normal distribution. Saddlepoint approximations are considered and the accuracy of the approximations are verified through simulation studies.

• Proceedings of the Korean Society of Broadcast Engineers Conference
• /
• 2018.06a
• /
• pp.182-184
• /
• 2018

본 논문에서는 HDR 영상 신호의 고속 광전변환을 위한 파라미터 룩업 테이블 기반 구간 선형 근사 방법을 제안한다. 제안하는 방법은 고속화하기 위한 광전변환함수의 입력 값의 범위를 다수개의 구간으로 나누고 각 구간마다 별도의 선형 근사함수를 구하여 광전변환함수를 근사하고 각 구간별로 필요한 선형 근사함수의 파라미터를 룩업 테이블에 미리 저장하고 사용함으로써 보다 빠른 근사 값 계산이 가능하다. 제안한 방법의 성능 평가를 위해 MPEG 에서 제공하는 참조 소프트웨어인 HDRTools 를 기반으로 실험을 수행했고 이를 통해 참조 소프트웨어에 구현되어 있는 기존의 고속화 방법과 비교하여 더 적은 연산 수를 가지며 평균 24% 빠른 처리속도와 약 0.05dB 의 평균 PSNR 손실을 보임을 확인하였다.

• The Korean Journal of Applied Statistics
• /
• v.34 no.6
• /
• pp.889-904
• /
• 2021

This study is a follow-up study of Kang and Kim (2020). In this study, we derive the sample influence functions of the t-statistic which were not directly derived in previous researches. Throughout these results, we both mathematically examine the relationship between the empirical influence function and the sample influence function, and consider a method to approximate the sample influence function by the empirical influence function. Also, the validity of the relationship between an approximated sample influence function and the empirical influence function is verified by a simulation of a random sample of size 300 from normal distribution. As a result of the simulation, the relationship between the sample influence function which is derived from the t-statistic and the empirical influence function, and the method of approximating the sample influence function through the empirical influence function were verified. This research has significance in proposing both a method which reduces errors in approximation of the empirical influence function and an effective and practical method that evolves from previous research which approximates the sample influence function directly through the empirical influence function by constant revision.