Gerhards模型在针叶木材长期寿命预测中的适用性分析

doi:10.11707/j.1001-7488.20211213

摘要/Abstract

摘要：

目的: 分析木材长期寿命预测中常用Gerhards模型的适用性，探讨参数选取对不同加载工况下模型预测结果的影响，同时针对木材寿命预测中预测值大于真实值的问题，提出一种基于Gerhards模型的区间预测模型分析方法，为进一步提高木材长期寿命预测精度提供理论依据。方法: 首先对Gerhards模型进行理论推导，明确木材破坏时间与线性加载速度或恒定应力水平的关系; 然后对比文献中针叶木材受荷试验数据真实值与8组Gerhards模型预测值，分析各模型对不同受荷形式下木材寿命预测结果的优劣; 最后针对木材寿命预测中预测值大于真实值的问题，提出一种基于Gerhards模型的区间预测模型分析方法。结果: 基于Gerhards模型预测线性加载工况下木材寿命时，各模型预测值较为接近，且与试验值偏差较小; 预测恒定加载工况下木材寿命时，各模型预测值间差别较大，且个别模型预测值与试验值差异极大。当木材试样为承受恒定应力水平介于60%~95%的北美花旗松时，建议采用Gerhards模型6进行寿命预测; 当木材试样为承受恒定应力水平介于55%~105%的欧洲云杉时，建议采用Gerhards模型7进行寿命预测; 当木材试样承受恒定应力水平小于50%时，建议采用Gerhards模型1进行寿命预测。预测模型所用数据加载工况与被预测对象受荷工况之间的差异对模型预测精度影响极大。相比传统预测模型，区间预测模型能够更完整地反映试验数据分布特征，且基于试验数据分位数拟合的预测模型较基于T分布假设拟合的预测模型涵盖更多试验数据点。结论: 分析Gerhards模型在木材长期寿命预测中的适用性十分必要，当预测模型所用数据加载工况与被预测对象受荷工况相似时，模型具有较好预测效果。本研究提出的分位数模型分析方法能够使绝大多数试验数据点落在区间模型内，可为提高木材长期寿命预测精度提供理论依据。

关键词: 木材, Gerhards模型, 长期寿命预测, 适用性分析, 区间模型

Abstract:

Objective: In order to provide a theoretical basis for further improving the accuracy of wood long-term life prediction, the applicability of the commonly used Gerhards model in wood life prediction research was analyzed, the influences of the selection of model parameters on the life prediction results were discussed, and an interval model that can better reflect the distribution characteristics of test data based on the Gerhards model also proposed. Method: Firstly, the Gerhards model was theoretically deduced to clarify the relationships between the failure time of the wood specimen and the ramp loading speed or constant stress level. Then, by comparing the real values of coniferous wood loading test data in the literature with the predicted values of 8 groups of Gerhards models, the pros and cons of each model for wood life predictions of different loading conditions were analyzed. Finally, aiming at the problem that the predicted value is higher than the true value in wood life prediction, an interval prediction model analysis method based on Gerhards model was proposed. Result: When the Gerhards model is used to predict the life of wood specimens under linear loading conditions, the predicted values are relatively close, and the deviation from the experimental values is small; when predicting the life of wood specimens under constant loading conditions, the difference between each predicted values is large, and some of the predicted value are very different from the experimental values. When the constant stress level on the Northern Douglas fir sample is between 60% and 95%, it is recommended to use the Gerhards model 6 for life prediction. When the stress level on the Norway spruce sample is between 55% and 105%, it is recommended to use the Gerhards model 7 for life prediction. When the stress level on the wood sample is lower than 50%, it is recommended to use the Gerhards model 1 for life prediction. The difference between the loading condition of the data used in the fitting model and the loading condition of the predicted object has a great influence on the model prediction accuracy. Compared with the traditional prediction models, the interval model can reflect the distribution characteristics of the test data more completely, and the interval prediction model fitted by percentiles can cover more test data than that fitted by the data based on T distribution hypothesis. Conclusion: It is necessary to discuss the applicability of the Gerhards model in the study of wood life prediction. The model could have a better prediction effect when the loading condition of the data used in the fitting model is similar to the loading condition of the predicted object. The quantile model proposed in this paper can make most of the test data points fall within the interval, which can provide a reference for improving the long-term life prediction accuracy of wood.

Key words: wood, Gerhards model, long-term life prediction, applicability analysis, interval model

中图分类号:

TU366.2

王忠铖,杨娜. Gerhards模型在针叶木材长期寿命预测中的适用性分析[J]. 林业科学, 2021, 57(12): 132-139.

Zhongcheng Wang,Na Yang. Applicability Analysis of Gerhards Model in Long-Term Life Prediction of Coniferous Wood[J]. Scientia Silvae Sinicae, 2021, 57(12): 132-139.

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表附表 1

Wood长期恒定荷载试验数据"

编号 No.	名义应力水平Nominal SL(%)
	95		90		85		80
	SL(%)	FD/min	SL(%)	FD/min	SL(%)	FD/min	SL(%)	FD/min
1	96.2	15.4	91.2	50.3	86.1	224.9	81.0	5 014.8
2	95.2	33.8	91.2	173.8	85.4	45.1	80.3	3 182.8
3	95.2	14.3	91.2	92.7	85.2	213.3	80.2	10 435.1
4	95.2	15.7	90.2	1 834.4	85.2	567.1	80.2	1 884.8
5	95.2	6.1	90.2	159.1	85.2	81.6	80.2	5 663.1
6	95.2	18.3	90.2	21.0	85.2	21.3	80.2	9 074.5
7	95.2	11.2	90.2	122.4	85.2	18.2	80.2	11 587.8
8	95.2	8.4	90.2	225.6	85.2	2 253.1	80.1	6 399.2
9	95.2	7.1	90.2	880.9	85.2	421.4	80.1	5 280.8
10	95.1	5.6	90.2	46.1	85.2	27.2	80.1	4 755.5
11	94.2	33.7	90.2	14.3	85.2	14.5	80.1	3 856.5
12	94.2	17.7	90.2	1 513.7	85.2	287.0	80.1	72 493.2
13	94.2	110.6	90.1	9.1	85.2	47.5	80.1	14 288.5
14	93.2	7.9	90.1	64.2	85.1	6.1	80.1	137.3
15	93.1	12.9	90.1	30.3	85.1	188.7	80.1	184.7
16			90.1	176.7	84.1	629.2	80.1	328.7
17							80.1	285.9
18							79.1	110 145.0
19							78.1	1 983.0
20

编号 No.	名义应力水平Nominal SL(%)
	75		70		65		60
	SL(%)	FD/min	SL(%)	FD/min	SL(%)	FD/min	SL(%)	FD/min
1	76.1	11 550.8	70.6	29 020.4	65.4	1 300 926.0	61.1	136 292.4
2	75.2	501 697.8	70.5	119 394.6	65.1	432 894.0	60.4	867 258.0
3	75.2	38 512.3	70.4	134 912.4	65.1	1 073 364.0	60.4	1 743 840.0
4	75.1	10 037.2	70.4	149 815.2	65.1	154 492.2	60.0	1 654 368.0
5	75.1	14 483.6	70.1	198 060.6	65.1	110 869.2	60.0	2 345 910.0
6	75.1	16 366.9	70.1	23 119.0	65.1	1 171 242.0	60.0	504 571.2
7	75.1	333.2	70.1	132 546.0	65.1	1 394 718.0	60.0	728 094.0
8	75.1	5 352.9	70.1	8 544.4	65.1	933 372.0	60.0	320 419.8
9	75.1	1 781.6	70.1	405 265.8	65.1	515 467.2	60.0	570 151.2
10	75.1	128 491.2	70.1	15 744.3	65.1	256 355.4	59.7	1 364 916.0
11	75.1	56 549.2	70.1	219 938.4			59.7	945 894.0
12	75.1	4 495.2	70.1	178 358.4			59.0	416 056.2
13	75.1	24 033.2	70.1	1 450 008.0
14	75.0	43 515.7	70.1	322 944.6
15	73.1	267 131.4	70.1	87 162.6
16			70.0	123 591.6
17			70.0	142 122.0
18			69.2	212 230.2
19			69.1	160 488.0
20			68.7	212 160.0

表附表 1

参考文献 0

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编号No.	加载方式Loading mode	速率或量值Rate/(N·min^-1) or magnitude/ N
1		6 489.97
2	线性加载Ramp loading	25.83
3		0.11
4		3 120.52(SL≈98.46%)
5	恒定加载Constant loading	2 804.91(SL≈88.50%)
6		2 124.80(SL≈67.04%)

编号 No.	拟合使用的试验数据 Data used for fitting	拟合使用的时间参数 Time used for fitting	模型参数Model parameters
编号 No.	拟合使用的试验数据 Data used for fitting	拟合使用的时间参数 Time used for fitting	A	B
G-1	C	T	24.613 4	20.890 9
G-2	R，C，X^*	T_c	30.829 1	29.375 6
G-3	C	T_c	31.199 2	29.411 3
G-4	R，C，X^*	T	31.424 7	30.302 5
G-5	R^*	T_r	33.152 4	31.571 6
G-6	R，C，X	T_c	37.612 7	37.639 3
G-7	R，C，X	T	37.537 5	37.860 3
G-8	R	T_r	46.678 4	47.364 6

编号 No.	加载方式 Loading mode	试样破坏时间中位数 Actual median failure time/min	模型预测试样破坏时间Predicted failure time/min
编号 No.	加载方式 Loading mode	试样破坏时间中位数 Actual median failure time/min	G-1	G-2	G-3	G-4	G-5	G-6	G-7	G-8
1	线性加载 Ramp loading	0.52	0.66	0.58	0.59	0.57	0.58	0.54	0.46	0.53
2		127.0	134.2	122.8	124.1	121.6	123.5	118.8	117.9	118.5
3		24 336	24 203	23 707	24 018	23 584	24 256	23 935	23 746	24 746
4	恒定加载 Constant loading	2.50	57.1	6.73	9.08	4.9	7.8	1.73	1.3	1.1
5		670.5	457.2	125.4	170.5	100.2	181.1	73.4	56.34	119.1
6		34 600	40 457	68 562	94 636	66 816	159 054	236 641	190 175	3 076 182

树种 Tree species	气干密度 Air-dry density/ (kg·m^-3)	顺纹抗压强度 Parallel-to-grain compressive strength/MPa	抗弯强度 Bending strength/MPa	抗弯弹性模量 Bending modulus of elasticity/MPa	顺纹抗剪强度 Parallel-to-grain shear strength/MPa
北美花旗松Pseudotsuga menziesii	480	47.6	90.0	1 230	9.7
欧洲云杉Picea abies	375	36.6	71.4	1 020	10.3

试验数据Experimental data	均方误差MSE
试验数据Experimental data	G-1	G-2	G-3	G-4	G-5	G-6	G-7	G-8
Wood试验数据Wood’s experimental data	101.20	33.30	30.70	32.30	24.70	18.30	19.30	26.70
Hoffmeyer试验数据Hoffmeyer’s experimental data	124.19	34.19	35.48	30.63	30.23	16.74	15.35	34.22