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发表于 2019-12-1 11:43
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本帖最后由 愚工688 于 2019-12-1 04:08 编辑
今天是2019-12-01日,
分别计算以20191201的一百倍、二百倍开始的连续偶数M的素数对下界数量的实例数据:
其中,
inf(M)是单个偶数的素对下界计算值,是具有波动性的;
infS(m)是连续偶数的区域下界计算值,是没有波动性的,其显示了连续偶数的下限数量的底部逐渐提高的特征;
k(m)则表达出各个偶数素对数量在区域下界基础上向上的波动幅度; k(m)= inf(M)/ infS(m) ;
G(2019120100) = 4289685;inf( 2019120100 )≈ 4263188.8 , Δ≈-0.006177,infS(m) = 3186053.3 , k(m)= 1.33808
G(2019120102) = 6413258;inf( 2019120102 )≈ 6372106.6 , Δ≈-0.006417,infS(m) = 3186053.3 , k(m)= 2
G(2019120104) = 3208095;inf( 2019120104 )≈ 3186893.7 , Δ≈-0.006609,infS(m) = 3186053.3 , k(m)= 1.00026
G(2019120106) = 3208246;inf( 2019120106 )≈ 3186053.3 , Δ≈-0.006917,infS(m) = 3186053.31 , k(m)= 1
G(2019120108) = 6413914;inf( 2019120108 )≈ 6373856 , Δ≈-0.006245,infS(m) = 3186053.31 , k(m)= 2.00055
G(2019120110) = 5148261;inf( 2019120110 )≈ 5111964.5 , Δ≈-0.007050,infS(m) = 3186053.31 , k(m)= 1.60448
G(2019120112) = 3291538;inf( 2019120112 )≈ 3267747 , Δ≈-0.007228,infS(m) = 3186053.32 , k(m)= 1.02564
G(2019120114) = 7126596;inf( 2019120114 )≈ 7080118.5 , Δ≈-0.006522,infS(m) = 3186053.32 , k(m)= 2.22222
G(2019120116) = 3537587;inf( 2019120116 )≈ 3514820.4 , Δ≈-0.006436,infS(m) = 3186053.32 , k(m)= 1.10319
G(2019120118) = 3361772;inf( 2019120118 )≈ 3341340 , Δ≈-0.006078,infS(m) = 3186053.33 , k(m)= 1.04874
G(2019120120) = 9111204;inf( 2019120120 )≈ 9056794.3 , Δ≈-0.005972,infS(m) = 3186053.33 , k(m)= 2.84264
G(2019120122) = 3206873;inf( 2019120122 )≈ 3186362.6 , Δ≈-0.006396,infS(m) = 3186053.33 , k(m)= 1.0001
time start =10:53:36 ,time end =10:54:28 ,time use =
G(4038240200) = 8022768;inf( 4038240200 )≈ 8002773.2 , Δ≈-0.002492,infS(m) = 5980795.9 , k(m)= 1.33808
G(4038240202) = 6348282;inf( 4038240202 )≈ 6332607.4 , Δ≈-0.002469,infS(m) = 5980795.9 , k(m)= 1.05882
G(4038240204) = 11994688;inf( 4038240204 )≈11961591.8 , Δ≈-0.002759,infS(m) = 5980795.9 , k(m)= 2
G(4038240206) = 8725093;inf( 4038240206 )≈ 8699339.5 , Δ≈-0.002952,infS(m) = 5980795.9 , k(m)= 1.45455
G(4038240208) = 5998265;inf( 4038240208 )≈ 5982373.5 , Δ≈-0.002649,infS(m) = 5980795.91 , k(m)= 1.00026
G(4038240210) = 15994859;inf( 4038240210 )≈ 15948789.1, Δ≈-0.002880,infS(m) = 5980795.91 , k(m)= 2.66667
G(4038240212) = 5997268;inf( 4038240212 )≈ 5980795.9 , Δ≈-0.002747,infS(m) = 5980795.91 , k(m)= 1
G(4038240214) = 6492509;inf( 4038240214 )≈ 6477662 , Δ≈-0.002287,infS(m) = 5980795.92 , k(m)= 1.08308
G(4038240216) = 11999636;inf( 4038240216 )≈ 11964875.7, Δ≈-0.002897,infS(m) = 5980795.92 , k(m)= 2.00055
G(4038240218) = 5996586;inf( 4038240218 )≈ 5980795.9 , Δ≈-0.002633,infS(m) = 5980795.92 , k(m)= 1
G(4038240220) = 9624742;inf( 4038240220 )≈ 9596078.2 , Δ≈-0.002978,infS(m) = 5980795.93 , k(m)= 1.60448
G(4038240222) = 12124608;inf( 4038240222 )≈ 12087133.4, Δ≈-0.003091,infS(m) = 5980795.93 , k(m)= 2.02099
time start =10:54:56 ,time end =10:56:19 ,time use = |
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