In the prospecting and exploiting of oil, to estimate the reserves and boundaries of areservoir has a great significance. Therefore, we propose approximate formulas to estimatethe volume of oil-storing space of a rese...In the prospecting and exploiting of oil, to estimate the reserves and boundaries of areservoir has a great significance. Therefore, we propose approximate formulas to estimatethe volume of oil-storing space of a reservoir.展开更多
A saddlepoint approximation for a two-sample permutation test was obtained by Robinson[7].Although the approximation is very accurate, the formula is very complicated and difficult toapply. In this papert we shall rev...A saddlepoint approximation for a two-sample permutation test was obtained by Robinson[7].Although the approximation is very accurate, the formula is very complicated and difficult toapply. In this papert we shall revisit the same problem from a different angle. We shall first turnthe problem into a conditional probability and then apply a Lugannani-Rice type formula to it,which was developed by Skovagard[8] for the mean of i.i.d. samples and by Jing and Robinson[5]for smooth function of vector means. Both the Lugannani-Rice type formula and Robinson'sformula achieve the same relative error of order O(n-3/2), but the former is very compact andmuch easier to use in practice. Some numerical results will be presented to compare the twoformulas.展开更多
基金This project is in part supported by the National Natural Science Foundation of China
文摘In the prospecting and exploiting of oil, to estimate the reserves and boundaries of areservoir has a great significance. Therefore, we propose approximate formulas to estimatethe volume of oil-storing space of a reservoir.
文摘A saddlepoint approximation for a two-sample permutation test was obtained by Robinson[7].Although the approximation is very accurate, the formula is very complicated and difficult toapply. In this papert we shall revisit the same problem from a different angle. We shall first turnthe problem into a conditional probability and then apply a Lugannani-Rice type formula to it,which was developed by Skovagard[8] for the mean of i.i.d. samples and by Jing and Robinson[5]for smooth function of vector means. Both the Lugannani-Rice type formula and Robinson'sformula achieve the same relative error of order O(n-3/2), but the former is very compact andmuch easier to use in practice. Some numerical results will be presented to compare the twoformulas.