石油工程专业英语.docx

Reservoir Model Construction High-frequency cycles were picked in 48 well with in the study area using Porosity as a surrogate for rock fabric. A segmented of the resulting cycle Stratigraphy in the middle upper Clear Fork is shown in Fig 48. In order Fig.7.48.Cross section from a portion of the middle Clear Fork reservoir showing Correlation of high-frequency cycles and flow layers based on porosity logs to maintain the high- and low-permeability intervals, each high-frequency cycle is divided into two rock-fabric flow layers, sandstone and mud- dominated dolostones at the base and grain-dominated dolostones at the top. The middle upper Clear Fork reservoir is divided into 21 high- frequency cycles and 42 flow layers, and the lower Clear Fork is also divided into 42 flow layers. The high-frequency cycles are the basic geological elements, and the flow layers are the basic petrophysical elements for constructing the reservoir model. The high-frequency cycles and flows layers were correlated over the study area, forming the basis for the reservoir model. A cross section of the middle upper Clear Fork reservoir showing cycles and flow layers is illustrated in Fig. 49. No cycles are described in the lower measures because it is not part of the reservoir due to high water saturations typical of the transition zone.For illustrative purposes, petrophysical properties distributed within the flow layers using simple linear interpolation methods(Fig.50). Fig. 7.49. Cross section illustrating the layer model for the middle Clear Fork reservoir Showing 7 silt-based cycles labeled A-G, 14 carbonate cycles, and 21 rock-fabric flow layers. Fig. 7.50. North-to-south Stratamodel cross section of the middle Clear Fork reservoir Showing permeability distribution. Flow Simulation Model A 3-D reservoir flow simulation model of the study area was constructed (Fig.51) using a method that links high-resolution sequence-stratigraphic frameworks, porosity-permeability relations from core data ,outcrop-derived models of small-scale spatial statistics, and a practical approach to porosity-pemeability scaleup (Jennings et al.in press).Identification and Fig.7.51.Tracer simulation results. a Tracer sweep pattern in the improved model At one pore volume injection. b Tracer sweep pattern in the traditional model at one pore volume injection modeling of petrophysical layering are critical for waterflood performance prediction. In this study the layering is based on high-frequency cycles and rock-fabric flow layer.The large-scal component of petrophysical variability is spatially organized into rock-fabric flow units with abrupt vertical contrasts at flow-unit boundaries and gradual lateral transitions. The flow-unit-scale petrophysical layering is laterally persistent at interwell scales, leading to highly stratified reservoir behavior with rapid waterflood sweep in the higher permeability layers, bypassing of the lower permeability layers, minimal cross-flow between layers, and early water break-through. Fluid-flow simulation was conducted to assess the benefits to reservoir Performance prediction provided by the improved model described here Compared with an existing model. The existing model was constructed Without a high-resolution sequence-stratigraphic framework,and layering Was assigned by proportioning layers between traditional stratigraphic markers. This model will be referred to as the “traditional model.” The model developed in this study using layers defined by rock fabrics and high-frequency cycles will be referred to as the “improved model.” The areal grid of the improved model was chosen to coincide exactly with that of the traditional model, and the same set of well-log data was used for the construction of both models. The same simplified set of well controls was used in both models. Injectivity and sweep were the aspects of reservoir performance addressed in this study. Meaningful comparison of the injectivity and sweep predictions of the two models was achieved by conducting single-phase tracer injection simulations, avoiding the additional complications of waterflood modeling. Thus, no initial saturation, residual saturation, or relative permeability modeling was required. The single-phase fluid was modeled as an incompressible liquid having a constant viscosity. Detailed waterflood matching of the traditional model to historical SWCF performance was conducted in a previous study. A good history match was obtained by applying a kv/kh multiplier of 0.0002 to reduce cross-flow between the layers and by increasing the horizontal permeabilities by a factor of 2 to match reservoir pressure behavior. In this study the improved model was matched to the traditional model, with both models running the same simplified incompressible tracer displacement case, by adjusting the same two parameters. The kv/kh multiplier in the improved model was adjusted to obtain the same sweep at one pore volume injection. However, the kv/kh multiplier required to achieve this match was 0.02, two orders of magnitude larger than the 0.0002 required in the traditional model and much closer to the moderate flow-unit scale kv/kh ratio expected from typical whole-core data in carbonates. This improvement in performance modeling was produced by the improved representation of petrophysical layering in the model. The tracer sweep patterns at one pore volume injection in the improved model are stratigraphically organized into alternating high- and lowpermeability flow units in the middle Clear Fork, and thin higher permeability flow units near the top of the lower Clear Fork (Fig. 51a). These sweep patterns were produced by the stratigraphically organized petrophysical layering. The corresponding sweep patterns in the traditional model are more random (Fig. 51b). The improved model also predicts more injection in the southern portion of the model, relative to the injection predicted by the traditional model, because of the subtle north-tosouth porosity increase detected by the trend modeling portion of this study. Careful comparison with reservoir performance data, outside of the scope of this study, would be required to demonstrate that these sweep patterns in the improved model constitute a superior representation of reservoir behavior. Nevertheless, the sweep patterns are consistent with the SWCF geological interpretation and are thus more satisfying 7.5.3 Fullerton Clear Fork Reservoir The Fullerton Clear Fork study is an example of using stratigraphy to obtain petrophysical class numbers where only gamma-ray/neutron logs are available and multiple values are required because of the diversity of rock fabrics. The Fullerton Clear Fork field in Andrews County, Texas (Fig. 52) was discovered in 1942, and the Fullerton Clear Fork Unit formed in 1953. The unit has produced 289 million barrels of oil from 1,250 wells and covers an area of about 30,000 acres, or 47 square miles. Original oil in place (OOIP) is estimated at between 1.6 and 1.9 billion stock-tank barrels (BSTB), for a recovery efficiency of about 17%. The field produces from permeability zones scattered over 500 ft of Permian-age Wichita and Lower Clear Fork limestones and dolostones. The full report of this study can be found at the Department of Energy Web site (Ruppel 2004).. Vertical Succession of Depositional Textures Twelve facies can be identified in the Fullerton reservoir succession on the basis of grain type, grain size and sorting, fabric, depositional texture, and lithology (Ruppel et al. 2004): 1. Peritidal Mudstone–Wackestone: generally dolomitized and most abundant in the Wichita and locally in the Lower Clear Fork associated with tidal-flat facies. 2. Clay-rich Carbonate Mudstone: generally thin and locally found associated with peritidal mudstone-wackestone facies. 3. Exposed Tidal Flat: defined by fenestra, pisolites, mudcracks, microbial laminations, and marked sea-level changes in the Wichita and Lower Clear Fork. 4. Peloid Wackestone: a burrowed mud-dominated fabric deposited in a low-energy subtidal setting . Fig.7.52.Location of Fullerton Clear Fork field 5. Peloid Packstone: a burrowed mud-dominated fabric with abundant peloids (probably fecal pellets) deposited in a low-energy subtidal setting. 6. Peloid Grain-dominated Packstone: moderately well sorted peloids in intergrain pore space deposited in a subtidal setting having moderate energy levels. 7. Ooid-Peloid Grain-dominated Packstone-Grainstone: contains ooids and skeletal grains, in addition to peloids, and is moderate (grain-dominated packstone) to well (grainstone) sorted, suggesting moderate to high energy levels. 8. Fusulinid Wackestone-Packstone: most abundant in the Lower Clear Fork, found in sites suggesting water depths of 30 m of more, the deepest water facies at Fullerton. 9. Skeletal Wackestone-Packstone: found mainly in the Lower Clear Fork, containing mollusks and crinoids, suggesting a low-energy inner platform setting. 10.Oncoid Wackestone-Packstone: abundant at the base of the Lower Clear Fork through the entire field associated with fusulinids and other faunas, suggesting an open-marine environment during flooding of the platform. 11.Siltstone-Sandstone: restricted to the Tubb Formation that overlies the Lower Clear Fork, but traces can often be found in peritidal and tidalflat facies. 12.Lithoclastic Wackestone: thin beds of tidal-flat fabrics overlying tidalflat facies. The producing interval of the Fullerton field is divided into sequences and cycles based on vertical successions of depositional facies from core description. Two sequences are defined: Leonardian 1 (L 1) and Leonardian 2 (L 2). Most of the reservoir is found in the L 2 sequence, which is divided into four high-frequency sequences (HFS): Leonardian 2.0 (HFS L 2.0), Leonardian 2.1 (HFS L 2.1), Leonardian 2.2 (HFS L 2.2), and Leonardian 2.3 (HFS L 2.3) (Fig. 53). The Wichita consists of a diverse assemblage of peritidal and tidal-flat facies that group into the highstand leg of sequence L 1 and the transgressive leg of sequence L 2 (Fig. 54). The highstand leg of L 1 represents the landward tidal-flat equivalent of the basinward outer platform facies of the Abo Formation, and the transgressive leg of L 2 represents the landward tidal-flat equivalent of the basal Lower Clear Fork subtidal facies. Evidence of karst is found in a few cores below the L 1 – L 2 boundary in the middle Wichita (Fig. 54). Intervals of polymict breccia of at least 25 ft to as much as 60 ft in thickness are present in one core. Their discontinuous nature and association with other features indicative of karst processes suggest that they originated as cave-fill deposits. Sequence L 2 is subdivided into four high-frequency sequences (L 2.0, L 2.1, L 2.2, L 2.3) (Fig. 54). HFS L 2.0 documents the initial flooding of the platform following exposure at the end of L 1 time. In the field area it consists of peritidal and tidal-flat facies of the upper Wichita. HFS L 2.1 forms the base of the Lower Clear Fork and consists of a basal section of transgressive subtidal platform facies and an upper section of highstand tidal-flat facies. It represents the sharp change from peritidal deposition of the Wichita to subtidal deposition of the basal Lower Clear Fork. HFS L 2.2 is similar to HFS L 2.1 in consisting of a basal transgressive leg composed of backstepping tidal-flat facies, a middle leg composed dominantly of subtidal facies, and an uppermost highstand leg composed of tidal-flat Fig.7.53.Fullerton field type log showing formation, sequences,high-frequency cycles, and flow layers(Ruppel 2004) facies. HFS L 2.3 is composed of tidal-flat-capped restricted subtidal cycles in the field area and is capped by the siliciclastic Tubb Formation. The fundamental goal of cycle stratigraphy is to develop a correlation framework based on time-equivalent surfaces. These surfaces form the basic correlations for constructing the reservoir model and define highfrequency cycles (HFC’s). Because the Wichita is composed of peritidal and tidal-flat facies, cycles are difficult to define and correlate. Only one bed of good subtidal facies was found. Most of the correlations were based on porosity and limestone-dolostone layering, the porous intervals being dolostone and the dense intervals being mostly limestone and occasionally dense dolostone. It is assumed that each dolostone bed was formed by hypersaline reflux flowing down from a tidal-flat into peritidal facies. Fig.7.54.Schematic cross section of Fullerton field showing formations,sequences, And general facies distribution(Ruppel,2004) Therefore, the dolostone beds mark the tops of the HFC’s (Fig. 55). Using this approach, we divided the Wichita into 10 HFS’s labeled W1 – W5 and W8 – W12. The interval between W5 and W8 has little porosity and was not subdivided. HFS L 2.1 is divided into seven high-frequency cycles (Fig. 53). These cycles are labeled LC4 – LC10. The lower cycles are transgressive and typically grade upward from fusulinid and oncoid mud-dominated facies to better sorted peloid-rich and tidal-flat caps. The upper cycles are highstand and are typically composed of peloidal facies at their bases and grain-rich peloid- or ooid-bearing facies at their tops. The top two cycles are composed of peritidal and tidal-flat facies. Cycle definition was difficult in the dolostones of HFS L.2.2 because of low porosity. However, three HFC’s were proposed on the basis of a rare limestone core that consisted of three upward-shoaling successions. These successions are labeled LC 1 – LC 3. The three cycles were subdivided into eight autocycles for the purposes of full field mapping, but these subdivisions were not used in the simulation model. High-frequency cyclicity is most readily definable in HFS L.2.3. These rocks, which are characterized by a tidal-flat-capped subtidal cycle, are Fig.7.55.Well log of Wichita formation showing high-frequency cycles and flow Layers based primarily on porosity and lithology more easily correlated than HFC’s in L 2.1 or L 2.2. However, this HFS is not considered to be part of the reservoir and is not included in the reservoir model.