地球物理学报  2015, Vol. 58 Issue (6): 1985-1997   PDF    
一阶多次波聚焦变换成像
刘学建1,2, 刘伊克1, 胡昊1,2, 谢宋雷3    
1. 中国科学院地质与地球物理研究所 中国科学院工程地质力学重点实验室, 北京 100029;
2. 中国科学院大学, 北京 100049;
3. 中国科学院南海海洋研究所, 广州 510301
摘要:将多次波转换成反射波并按传统反射波偏移算法成像, 是多次波成像的一种方法.聚焦变换能准确的将多次波转换为纵向分辨率更高的新波场记录, 其中一阶多次波转换为反射波.本文对聚焦变换提出了两点改进: 1)提出局部聚焦变换, 以减小存储量和计算量, 增强该方法对检波点随炮点移动的采集数据的适应性; 2)引入加权矩阵, 理论上证明原始记录的炮点比检波点稀疏时, 共检波点道集域的局部聚焦变换可以将多次波准确转换成炮点与检波点有相同采样频率的新波场记录.本文在第一个数值实验中对比了对包含反射波与多次波的原始记录做局部聚焦变换和直接对预测的多次波做局部聚焦变换两种方案, 验证了第二种方案转换得到的波场记录信噪比更高且避免了第一个方案中切聚焦点这项比较繁杂的工作.第二个数值实验表明:在炮点采样较为稀疏时, 该方法能有效的将一阶多次波转换成反射波;转换的反射波能提供更丰富的波场信息, 成像结果更均衡、在局部有更高的信噪比, 以及较高的纵向分辨率.
关键词聚焦变换     多次波成像     多次波消除    
Focal transformation imaging of first-order multiples
LIU Xue-Jian1,2, LIU Yi-Ke1, HU Hao1,2, XIE Song-Lei3    
1. Key Laboratory of Engineering Geomechanics, Institute of Geology and Geophysics, Chinese Academy of Sciences, Beijing 100029, China;
2. University of Chinese Academy of Sciences, Beijing 100049, China;
3. South China Sea Institute of Oceanology, Chinese Academy of Sciences, Guangzhou 510301, China
Abstract: Surface-related multiples penetrate into the subsurface several times and contain abundant reflection information of small angles. Compared with primaries, they sometimes can provide higher fold and better illumination for subsurface. Instead of trashing multiples as noises during the seismic data processing, nowadays, a lot of methods have been proposed to image multiples. Conventional migration methods have been modified for directly imaging multiples, e.g., Kirchhoff migration of multiples, wave equation migration of multiples, or reverse-time migration (RTM) of multiples. Alternatively, the linear two-step procedures can be utilized for imaging multiples. Primaries can be extracted from multiples based on seismic interferometry or focal transformation, and then imaged by utilizing conventional migration methods. However, most methods for imaging multiples would generate so many artifacts due to the undesired interactions between seismic-events (i.e. primaries and different-order multiples), which are hard to be attenuated and seriously pollute the true-image. Moreover, the least-squares based focal transformation can transform first-order multiples into primaries, second-order multiples into first-order multiples, etc., with few noises generated. Multiples focal-transformed from higher-order multiples can be eliminated by surface-related multiples elimination (SRME). And then, primaries focal-transformed from first-order multiples can be imaged by any conventional migration methods, and we call the procedures focal transformation imaging of first-order multiples.
The focal transformation is proposed by Berkhout and Verschuur, which is developed from SRME. Primaries are once subsurface response of sources, surface-related multiples include different-orders, and the raw data contain primaries and surface-related multiples. Focal transformation is manipulated with several matrices that contain the full data of mono-frequency, one column stores one shot gather or one common-receiver gather. Primaries need to be estimated prior to focal transformation, and the inverse of primaries matrix is used as focal operator. The full raw data will be transformed into the new wavefield records. In fact, the focal transformation is implemented with a stable form of least-squares sense. Primaries are focused around one point in the profile of zero-time and zero-offset, the so called focal-point; first-order multiples are transformed into primaries; second-order multiples are transformed into first-order multiples; etc. Focal transformation is a kind of least-squares transformation, which nearly doesn't generate noises. So, after muting the energies around focal point, SRME can be utilized to eliminate the multiples transformed from higher-order multiples, and transformed primaries are obtained. Alternatively, in order to utilize the information of multiples, we can directly implement the focal transformation of multiples that usually have been separated from primaries during the regular seismic data processing, and the muting work can be avoided. On the other hand, the focal transformation has the effect of deconvolution by utilizing the inverse of real source-signature matrix, so the transformed primaries have higher vertical resolution than the acquired primaries. However, when the receive array moves with the source position, the matrices will occupy large memory that are mostly wasted by off diagonal 0 elements. In this article, we put forward two improvements for focal transformation: (1) develop the local focal transformation for reducing storage and computation; (2) bring in the weighted matrix, and demonstrating that local focal transformation in common-receiver domain can transform multiples into new wavefield records retrieving the missing shot-gathers of acquired data. The local transformation is implemented specially for one shot gather or one common-receiver gather, so the local focal transformation has better adaptation to the acquired data whose traces move with corresponding source position. We introduce the diagonal matrix into the focal transformation. When source sampling rate is sparser than receiver sampling rate of acquired data and one column of the matrices stores one common-receiver gather, the diagonal elements of the weighted matrix are periodically 1 spaced by 0 diagonal elements. The focal transformation transforms multiples into new wavefield records where source sampling is the same with receiver sampling, when the source sampling is sparser than receiver sampling in the acquired data. The local focal transformation in common-receiver domain also can transform multiples into new wavefild records with denser source sampling, but the common-receiver gathers must be extracted from shot-gathers in advance.
In the first numerical test, two workflows of local focal transformation of row data and direct local focal transformation of predicted multiples are compared. They are both implemented in common-shot domain. We verify the second work flow will generate wavefield records with higher signal to noise ratio, and the laborious task for muting the energies around focal point is avoided. With the first workflow, a few parts of primaries are not focused around the focal point and leaked into the profile transformed from multiples. With the second workflow, the new wavefiled records directly transformed from multiples nearly do not have noises, and multiples transformed from higher multiples can be successfully eliminated by SRME. Obviously, the wavefield records transformed from multiples have higher vertical resolution than the acquired data. The second numerical test demonstratesthat when source sampling is relatively sparse, the local focal transformation in common-receiver domain can effectively transform first-order multiples into primaries; the transformed primaries include the missing shot-gathers of the acquired data; the imaging result of transformed primaries is more balanced, locally has higher signal-to-noise ratio, and shows slightly higher vertical resolution. The separated primaries and multiples are both rearranged into common-receiver gathers in advance; the zero traces in common-receiver gathers show the missing shot records; that every other trace in common-receiver gathers are zero represents the sparse source sampling, and alias artifacts can be clearly seen in the FK domain. The direct local transformation of multiples on common-receiver gathers can retrieve the missing shot records from multiples, and the alias artifacts in the FK domain are avoided. In the common-receiver domain, multiples transformed from higher-order multiples are eliminated by SRME, and the transformed primaries are rearranged back into the common-shot domain. The transformed primaries have wider amplitude spectrum than acquired primaries, which demonstrate focal transformation has the effect of deconvolution. The transformed primaries and acquired primaries are both migrated by RTM.
The focal transformation can transform first-order multiples into primaries with few noises, and it has the effect of deconvolution. The proposed local focal transformation is implemented specially for one shot or one common-receiver gather, so the local focal transformation can save computation and storage. The local focal transformation in common-receiver domain can retrieve the missing shot records of acquired data from multiples. When source sampling of acquired data is sparse, the RTM image of primaries transformed from first-order multiples is more balanced, locally has higher signal-to-noise ratio, and shows slightly higher vertical resolution.
Key words: Focal transformation     Imaging of multiples     Multiples elimination    
1 引言

传统的偏移算法往往只利用反射波对地下结构成像,多次波要在偏移之前的预处理中尽可能的减掉.实际上多次波在地下比反射波传播路径更长、覆盖范围更广(如图 1).近年来,很多的学者致力于多 次波成像的研究,发展出多次波地震干涉成像、多次波直接偏移成像、多次波聚焦变换成像等方法(Berkhout,1993; Berkhout and Verschuur,1994; Schuster et al.,2004; Guitton,2002; Berkhout and Verschuur,2006; Vasconcelos et al.,2008).甚至有的学者尝试利用多次波进行偏移速度分析(Manuel and Uren,2001).多次波地震干涉成像、多次波聚焦变换成像都是先将多次波转换成反射波,然后按传统反射波偏移算法成像.

图 1 反射波与多次波的传播路径 Fig. 1 Propagating paths of the primary and the multipl

地震干涉法最早可以追溯到1968年,Claerbout(1968)在二维模型上进行了被动震源地震记录的自 相关实验,现已经取得了广泛的研究成果(Schuster,2009). 多次波地震干涉成像的简单流程为:首先将共炮点道集内(或共检波点道集内)的道记录两两之间做互相关生成虚拟炮记录,叠加相同位置处的虚拟 炮记录,多次波转换成反射波和噪声(Wapenaar and Fokkema,2006; Schuster,2009),然后再按传统反射波偏移算法成像(Sheng,2001; He et al.,2007; Jiang et al.,2007).地震干涉法的算法简单、计算效率高.然而,地震干涉法不够精确,生成的虚拟炮记录有大量的串声噪声.另一方面,虚拟炮记录同相轴的子波是原始地震记录同相轴子波的互相关.

Berkout等(1994)提出多次波直接偏移成像的思想.修改传统的单程波偏移或逆时偏移方法,可以很容易的实现多次波的直接偏移成像,其原理为:将包含反射波与多次波的原始道记录代替传统偏移算法中的点震源向地下正传,将多次波(或原始道记录)代替传统偏移算法中的反射波向地下反传,同一 位置处的正传波场与反传波场互相关成像(Guitton,2002; Muijs,2007; Liu et al.,2011a2011b; Lu et al.,2011; Wang et al.,2014). 该方法不需要提前将多次波转换为反射波,且有与传统反射波偏移方法相同的偏移计算效率.然而其在成像域产生的串声噪声和结构性假象较难消除.

聚焦变换从基于波动方程的表面多次波消减方法SRME(surface-related multiples elimination)(Verschuur et al.,1992; Berkhout et al.,1997; Verschuur and Berkhout,1997; 李鹏等,2007)发展而来,由Berkhout和Verschuur(2003)首次提出,已应用到多次波聚焦变换消除、多次波成像和地震道插值等方面(Berkhout et al.,20042006; Verschuur and Berkhout,2005; Groenestijn and Verschuur,2006).该方法将原始波场记录中的反射波能量聚焦到时间为零的点周围,准确的将一阶多次波转换为反射波,二阶多次波转换为一阶多次波,依次类推.在共炮点道集,反射波能量的聚焦点为炮点;在共检波点道集,反射波能量的聚焦点为检波点.聚焦变换是最小二乘意义上的变换,多次波转换的新波场记录具有很高的信噪比.切去聚焦点周围的能量,然后将新波场记录中的多次波(由二阶及更高阶的多次波转换而来)减去,得到的一阶多次波转换的反射波.将转换的反射波成像,实质上是对一阶多次波的反射位置成像.

本文提出了局部聚焦变换,增强了该方法对检波点随炮点移动的采集数据的适应性.引入加权矩阵后,本文验证了:当原始波场记录的炮点采样相对稀疏时,共检波点道集域的局部聚焦变换能将多次波准确转换成炮点与检波点有相同采样频率的新波场记录.传统反射波成像算法,我们采用的是对速度模型的横向变化及陡倾角适应性强的逆时偏移(Baysal et al.,1983; 胡昊等,2013).

2 一阶多次波聚焦变换成像原理 2.1 聚焦变换基本原理

在炮点与检波点重合的观测系统上,用单频矩阵表示全波场的波场记录,波场矩阵的列存储共炮点或共检波点道集记录(如图 2).忽略算符细节,用 Δ P 表示反射波波场记录,M 表示多次波波场记录,P 表示包含反射波和多次波的原始波场记录,根据反馈迭代模型(Verschuur et al.,1992; Berkhout and Verschuur,20032006)(图 3):

其中:对角矩阵 S 为震源特性矩阵,对角元素为频率域的震源子波; Δ X 表示脉冲震源在地下的一次响应; R 为自由表面反射系数特性矩阵.

图 2 频率域数据矩阵的结构(数据矩阵Δ P (xr, xs , ωi)的行列可以互换) Fig. 2 Structure of data matrix in frequency domain, row and column of data matrix Δ P (xr, xs , ωi) are interchangeable

图 3 反馈迭代模型 Fig. 3 The feedback model

表面算符 A 记为

显而易见,P′ 为缺少原始波场记录 P 中最高阶多次波的波场记录.当测线在自由表面之下时,自由表面的反射系数特性(R )包含在波场记录中,此时表面算符 A 记为:

聚焦变换定义为:

预先通过任意的多次波消减方法得到反射波记录的估计,用于构建聚焦变换算符 Δ P -1.

聚焦变换最小二乘意义上的稳定表达式为:

上标H表示复数矩阵的共轭转置,ε 较为保证矩阵求逆计算稳定的较小正常数.

联立公式(5)、(6)、(8)、(9)可以推出:

单频矩阵 I 对应波场记录中聚焦点,反射波能量聚焦到该点周围.在共炮点道集域,聚焦点对应各炮的炮点;在共检波点道集域,聚焦点为相应的检波点. AP ′ 为我们从多次波中还原得到的所有波场记录;其中一阶多次波转换为反射波,二阶多次波转换为一阶多次波,依次类推. A 近似为震源特性矩阵的逆,因此聚焦变换具有去子波效应,多次波转换的新波场记录比原波场记录有更高的纵向分辨率.

2.2 聚焦变换的改进 2.2.1 局部聚焦变换

在检波点随炮点移动的观测系统中,若用一个矩阵存储全波场记录,存储量、计算量会相常的大.为了增强聚焦变换的适用性,我们提出局部聚焦变换:在逐个共炮点或共检波点道集记录上做聚焦变换.在炮点与检波点重合的情况下,局部聚焦变换表示为:

相应的:

其中:列向量 P j、 M j 表示观测系统中第 j 个共炮点或共检波点道集记录,P j 存储包含反射波与多次波的原始记录,M j 存储多次波记录.将第 j 个记录覆盖范围内的所有反射波记录按位置逐列存储在矩阵 Δ P j 中. Q j 为从原始波场记录中还原得到的新波场记录,AP ′ j 为从多次波中还原得到的所有波场记录.

2.2.2 引入加权矩阵

用全波场记录矩阵的列存储共检波点道集记录,行存储共炮点道集记录.引入对角矩阵 Λ 做加权矩阵,表示炮记录的缺失:

当加权矩阵 Λ 的对角元素周期性的为1其余为0时,表示炮点比检波点稀疏的观测系统.联立公式(8)、(10)、(15)容易推导出:

相应的:

在检波点随炮点移动的观测系统上:

其中 Λ P j、 Λ M j 为炮点比检波点稀疏的观测系统上的第j个共检波点道集(从共炮点道集记录中抽出共检波点道集记录).从理论推导可以证明:炮点比检波点稀疏时,共检波点道集域局部聚焦变换可以将多次波准确转换成炮点与检波点有相同采样频率的新波场记录 AP ′ j. 聚焦变换重建的波场信息来源于多次波,真实的反应地下信息.

2.3 一阶多次波成像

多次波聚焦变换转换的新波场记录 AP ′ j 只含有较少的噪声,利用多次波消除方法(如SRME)较容易分离出一阶多次波转换的反射波:

在时间域将转换的反射波成像.将转换的反射波成像,实质上是对一阶多次波的反射位置成像.本文采用对速度模型的横向变化及陡倾角适应性强的逆时偏移成像(互相关成像条件),其基本原理为:

Ws(x,t)为时间正向延拓到地下的震源波场,Wg(x,t)为时间逆向延拓到地下的检波点波场.

3 模型算例 3.1 Pluto1.5模型的完整数据

Pluto1.5声波速度模型如图 4,共1387炮,炮间距和道间距为22.86 m,检波点随炮点移动.以炮点位于7985 m的第350炮为例,在共炮点道集域对比如图 5a图 5b所示的两种方案.如图 6a为包含反射波与多次波的原始炮记录,图 6b图 6c分别为通过SRME方法得到的炮记录的反射波和多次波.

图 4 Pluto1.5声波速度模型 Fig. 4 Acoustic wave velocity of pluto1.5 model

图 5 局部聚焦变换(a)方案一和(b)方案二,(c)减去高阶多次波转换的多次波 Fig. 5 (a) First scheme and (b) second scheme for local focal transformation; (c) eliminate multiples transformed from high-order multiples

图 6 原始炮集中第350炮的(a)原始记录; (b)反射波估计; (c)预测得到的多次波 Fig. 6 The 350th shot′s in original shot gather (a) Original wavefield record; (b) Estimated primaries; (c) Predicted multiples

按照图 5a中的方案一,对如图 6a中包含反射波与多次波的原始炮记录做局部聚焦变换(公式(13))得到新的波场记录(图 7a).反射波聚焦到炮点周围,如图 7a中水平箭头所指位置;一阶多次波转换为反射波,二阶多次波转换为一阶多次波,依次类推.减去炮点周围的能量即可得到多次波转换的新波场记录(图 7b).按照图 5b中的方案二,直接对如图 6c中的多次波做局部聚焦变换(公式(14))得到多次波转换的新波场记录(图 8a).相比原始波场记录,多次波转换的新波场记录(图 7b图 8a)有更好的纵向分辨率,体现了聚焦变换的去子波效应.

图 7 (a)原始记录转换的波场记录; (b)切去图(a)中聚焦点周围的能量,得到多次波转换的波场记录 Fig. 7 (a)Wavefield record transformed from original record; (b) get wavefiled record transformed from multiples after muting energies around the focal point

图 8 (a)多次波直接转换的波场记录; (b)消减图(a)中的多次波,得到一阶多次波转换的反射波 Fig. 8 (a) Wavefiled record transformed directly from multiples; (b) Primaries transformed from first-order multiples after subtracting multiples in figure(a)

由于SRME方法分离反射波与多次波过程中多次波能量的泄露(Berkhout and Verschuur,2006),方案一的优势在于能利用完全无损失的多次 波信息.然而,当采用方案一时,原始记录的反射波能量并非最佳聚焦,部分能量泄露到多次波转换的剖面中(如图 7b中倾斜箭头所指位置).显然,图 8a中的波场记录比图 7b中波场记录有更高的信噪比.这一现象或许与采样数据的空间间隔不够小以及引入的稳定因子 ε 都使得聚焦变换不再完全准确有关.在方案一中经常需要人工切除聚焦点及其周围的能量,而这项工作非常繁杂.

将多次波转换的波场记录(图 8a)中的高阶多 次波转换的多次波减去(如图 5c)得到一阶多次波 转换的反射波;对比图 8a图 8b图 8a中箭头所指位置处的多次波较好的被消除.3.2 Pluto1.5模型的抽稀数据

将原始炮集抽稀:保留炮号为奇数的原始记录,炮号为偶数的原始记录充零,此时炮间距是道间距的2倍.本例局部聚焦变换的工作流程采用如图 5b所示的方案二,直接对多次波做局部聚焦变换.与算例1不同之处在于:算例2首先在共炮点道集域分离反射波与多次波记录;然后将反射波及多次波记录分别抽到共检波点道集域,炮记录的缺失在共检波点道集表现为数值为0的一个空道;多次波的局部聚焦变换在共检波点道集域内进行;图 5c所示的消减高阶多次波转换的多次波在共检波点道集内进行;最后将一阶多次波转换的反射波抽回到共炮域.共检波点道集域的局部聚焦变换能够从多次波中提取原始波场记录中缺失的炮记录信息.

利用SRME分离抽稀数据的反射波及多次波记录,当炮间距过大时应当采用其他方法分离反射波与多次波(Liu et al.,20092010; 薛亚茹等,2012).将反射波及多次波记录抽到共检波点道集域,按检波器位置分别有1746个共检波点道集.

以位于15324 m处的第850个共检波点道集为例.为了方便与下文中的图片对比,抽出第850个共检波点道集的原始记录(图 9a)在本文展示,图 9b为该共检波点道集的反射波记录.炮间距为道间距的2倍,在共检波点道集域表现为每隔一道有一个 数值为0的空道,反射波记录的FK谱中出现空间假频(图 9c).

图 9 抽稀原始炮集, 即将偶数炮充零并将奇数炮保留.然后在共炮域利用SRME分离反射波和多次波.将数据从共炮域整理到共检波点道集域.图中展示了抽稀数据第850个共检波点道集的(a)原始记录和(b)反射波 记录;(c)图(b)中反射波的FK谱. Fig. 9 Extract the original shot gather to be sparseness, i.e., fill the even number shots with zero and retain the odd number shots. And then, we separate primaries and multiples with SRME in the common shot domain. Rearrange data from common shot domain into common receiver domain. For the sparse data, the 850 th common receiver gather′s (a) Primaries and (b) Multiples are displayed in this figure; (c) Primaries′ FK spectrum in figure(b).

直接对第850个共检波点道集的多次波 ΛM r850 做局部聚焦变换(公式(20)),首先要将该道集覆盖范围内的所有共检波点道集的反射波估计按位置逐列存储到矩阵 Λ ΔPr850 中.从多次波中还原得到炮间距与道间距相同的新波场记录(图 10a).将新波场记录中高阶多次波转换的多次波减去,得到一阶 多次波转换的反射波(图 10b).转换反射波的FK 谱如图 10c所示,其中没有空间假频.

图 10 在共检波点道集域,对多次波直接做局部聚焦变换(a) 多次波转换的波场记录,原始炮集中缺失的炮记录信息得到还原; (b) 减去图
(a)中的多次波,得到一阶多次波转换的反射波记录; (c) 图(b)中反射波的FK谱.
Fig. 10 In the common receiver domain, do the local focal transformation directly with multiples
(a) Wavefield record transformed from multiples, the information of missing shot records in original gather is retrieved; (b) Primaries transformed from first-order multiples got after subtracting multiples in figure(a); (c) Primaries′ FK spectrum in figure(b).

原始抽稀炮集的反射波记录如图 11a所示,将转换的反射波记录从共道集域(如图 10b)抽回到共炮域如图 11b所示.对比两图可知:从多次波还原得到了炮点采样频率与检波点采样频率相同的新波场记录,提供比原始记录更丰富的叠前偏移信息.从图 12的振幅谱分析中可以看出,一阶多次波转换的反射波有比原始反射波更宽的频带范围;由于聚焦变换的去子波效应,一阶多次波转换的反射波比原始反射波有更高的纵向分辨率.

图 11 将一阶多次波在共检波点道集域转换的反射波抽回到共炮域
(a)抽稀炮集的反射波记录;(b)一阶多次波转换的反射波记录,原始炮集中缺失的炮记录信息得到还原.图中从左到右依次为第350、351、352、353炮.
Fig. 11 Rearrange primaries transformed from first order multiples in common receiver gather domain back into common shot domain
(a)Primaries of shot gather extracted to be sparseness; (b)Primaries transformed from first order multiples, the information of missing shot record in original gather is retrieved. The 350th、351th、352th、353th shot are displayed from left to right.

图 12 灰白色与黑色曲线分别为图11a、图11b中第351炮反射波的平均振幅谱.两条曲线被调整为有相同的最大值 Fig. 12 The gray and black curves are respectively average amplitude spectrums of 351th shots′ primaries in Fig.11a and Fig.11b. The maximum value of two curves are scaled to be identity

原始反射波、转换反射波的逆时偏移结果分别如图 13图 14所示,转换反射波的逆时偏移成像即为一阶多次波的聚焦变换逆时偏移成像.逆时偏移的成像条件是互相关成像条件;原始反射波逆时偏移的震源子波为15 Hz雷克子波;为了与如图 12所示的振幅谱分析吻合,转换反射波逆时偏移的震源子波采用20 Hz雷克子波.对比图 13图 14可知,一阶多次波聚焦变换成像的优势体现在: 1)纵向分辨率更高,尤其在剖面的浅层,剖面能量整体分布更为均衡;2)在局部有更高的信噪比(如矩形虚线所圈位置)及更好的偏移噪声压制(如箭头所指位置以及椭圆虚线所圈位置).

图 13 抽稀炮集中反射波的(如图11a)逆时偏移剖面 Fig. 13 Reverse time migration section of primaries in shot gather extracted to be sparseness (as shown in Fig.11a)

图 14 一阶多次波转换的反射波(如图11b)的逆时偏移剖面其有更均衡的能量分布、相对较高的纵向分辨率和局部更高的信噪比. Fig. 14 Reverse time migration section of primaries transformed from first order multiples (as shown in Fig.11b), which has more balance energy distribution, relatively higher vertical resolution and locally has higher signal-to-noise ratio

一阶多次波成像剖面往往与传统反射波成像剖 面有近似的有效信息和不同的构造假象,并在局部 表现出更好的成像效果.因此: 1)一阶多次波成像剖面可以成为反射波成像剖面解释工作中的有益参考; 2)寻找使反射波成像剖面与一阶多次波成像剖面最佳匹配的局部滤波器,压制反射波成像剖面 中的噪声.此外,一阶多次波成像提供了比传统反射波成像更丰富的小角度信息,可以为速度分析作出贡献.

4 结论

本文叙述了聚焦变换的基本原理,并提出局部聚焦变换;理论上证明炮点比检波点稀疏时,共检波点道集域的局部聚焦变换可以将多次波准确转换成炮点与检波点有相同采样频率的新波场记录;数值算例很好地验证了上述理论.由于聚焦变换的去子波效应,在两个数值实验中,我们都可以看到多次波转换的新波场记录比原始波场记录有更高的纵向分辨率.在第二个数值算例中,相比原始反射波成像,一阶多次波聚焦变换成像的能量更为均衡、在局部表现出更好的偏移噪声压制和更高的信噪比、以及较高的纵向分辨率.通过理论分析和数值试验可以看出,多次波完全可以做为有效信号,提供更高的下地表覆盖次数,对成像做出贡献.

致谢 感谢匿名审稿专家提出的宝贵意见.作者感谢国家自然科学基金项目、国家油气重大专项以及中国科学院战略性先导科技专项(B类)资助的联合资助.

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