% Tue Apr 25 17:10:04 2000
% Input layer: (9, 9)
% Output layer: (1, 81)
% Fanout size: (1, 4)
% Fanout spacing: (1, 1)
% Specified fanout weights
Connect(estg, ea2c) {
From: (1, 1) {
([ 1,80] 0.001777) ([ 1,81] 0.001266) ([ 1, 1] 0.001730) ([ 1, 2] 0.001485)
}
From: (1, 2) {
([ 1,81] 0.001403) ([ 1, 1] 0.001748) ([ 1, 2] 0.000918) ([ 1, 3] 0.000872)
}
From: (1, 3) {
([ 1, 1] 0.001378) ([ 1, 2] 0.000692) ([ 1, 3] 0.001024) ([ 1, 4] 0.000777)
}
From: (1, 4) {
([ 1, 2] 0.000984) ([ 1, 3] 0.000840) ([ 1, 4] 0.001005) ([ 1, 5] 0.001028)
}
From: (1, 5) {
([ 1, 3] 0.001328) ([ 1, 4] 0.001388) ([ 1, 5] 0.000803) ([ 1, 6] 0.001452)
}
From: (1, 6) {
([ 1, 4] 0.001008) ([ 1, 5] 0.000821) ([ 1, 6] 0.001172) ([ 1, 7] 0.001339)
}
From: (1, 7) {
([ 1, 5] 0.000910) ([ 1, 6] 0.001732) ([ 1, 7] 0.001464) ([ 1, 8] 0.001597)
}
From: (1, 8) {
([ 1, 6] 0.001293) ([ 1, 7] 0.000784) ([ 1, 8] 0.001041) ([ 1, 9] 0.001229)
}
From: (1, 9) {
([ 1, 7] 0.001604) ([ 1, 8] 0.001794) ([ 1, 9] 0.000700) ([ 1,10] 0.001234)
}
From: (2, 1) {
([ 1, 8] 0.001486) ([ 1, 9] 0.001411) ([ 1,10] 0.001745) ([ 1,11] 0.001253)
}
From: (2, 2) {
([ 1, 9] 0.001797) ([ 1,10] 0.001012) ([ 1,11] 0.001290) ([ 1,12] 0.001806)
}
From: (2, 3) {
([ 1,10] 0.001557) ([ 1,11] 0.001577) ([ 1,12] 0.001124) ([ 1,13] 0.000897)
}
From: (2, 4) {
([ 1,11] 0.000965) ([ 1,12] 0.001731) ([ 1,13] 0.001084) ([ 1,14] 0.001318)
}
From: (2, 5) {
([ 1,12] 0.001615) ([ 1,13] 0.001568) ([ 1,14] 0.000911) ([ 1,15] 0.001824)
}
From: (2, 6) {
([ 1,13] 0.001516) ([ 1,14] 0.001573) ([ 1,15] 0.000843) ([ 1,16] 0.001780)
}
From: (2, 7) {
([ 1,14] 0.001404) ([ 1,15] 0.000833) ([ 1,16] 0.001718) ([ 1,17] 0.000959)
}
From: (2, 8) {
([ 1,15] 0.001590) ([ 1,16] 0.001139) ([ 1,17] 0.001103) ([ 1,18] 0.001521)
}
From: (2, 9) {
([ 1,16] 0.001307) ([ 1,17] 0.001317) ([ 1,18] 0.001551) ([ 1,19] 0.001331)
}
From: (3, 1) {
([ 1,17] 0.001206) ([ 1,18] 0.000999) ([ 1,19] 0.001538) ([ 1,20] 0.001603)
}
From: (3, 2) {
([ 1,18] 0.001005) ([ 1,19] 0.001287) ([ 1,20] 0.000654) ([ 1,21] 0.001665)
}
From: (3, 3) {
([ 1,19] 0.001253) ([ 1,20] 0.000668) ([ 1,21] 0.000976) ([ 1,22] 0.000724)
}
From: (3, 4) {
([ 1,20] 0.001844) ([ 1,21] 0.000900) ([ 1,22] 0.001421) ([ 1,23] 0.001642)
}
From: (3, 5) {
([ 1,21] 0.001503) ([ 1,22] 0.001737) ([ 1,23] 0.001345) ([ 1,24] 0.001231)
}
From: (3, 6) {
([ 1,22] 0.001231) ([ 1,23] 0.001417) ([ 1,24] 0.000765) ([ 1,25] 0.001220)
}
From: (3, 7) {
([ 1,23] 0.001761) ([ 1,24] 0.000842) ([ 1,25] 0.001116) ([ 1,26] 0.001221)
}
From: (3, 8) {
([ 1,24] 0.001320) ([ 1,25] 0.000723) ([ 1,26] 0.001496) ([ 1,27] 0.001519)
}
From: (3, 9) {
([ 1,25] 0.000920) ([ 1,26] 0.001653) ([ 1,27] 0.001300) ([ 1,28] 0.000774)
}
From: (4, 1) {
([ 1,26] 0.001722) ([ 1,27] 0.001256) ([ 1,28] 0.001091) ([ 1,29] 0.000694)
}
From: (4, 2) {
([ 1,27] 0.001034) ([ 1,28] 0.000960) ([ 1,29] 0.001781) ([ 1,30] 0.001478)
}
From: (4, 3) {
([ 1,28] 0.001481) ([ 1,29] 0.001190) ([ 1,30] 0.001797) ([ 1,31] 0.001272)
}
From: (4, 4) {
([ 1,29] 0.000987) ([ 1,30] 0.001434) ([ 1,31] 0.000839) ([ 1,32] 0.001492)
}
From: (4, 5) {
([ 1,30] 0.001061) ([ 1,31] 0.001197) ([ 1,32] 0.001073) ([ 1,33] 0.001387)
}
From: (4, 6) {
([ 1,31] 0.000654) ([ 1,32] 0.000747) ([ 1,33] 0.001443) ([ 1,34] 0.000717)
}
From: (4, 7) {
([ 1,32] 0.001380) ([ 1,33] 0.001822) ([ 1,34] 0.000892) ([ 1,35] 0.001393)
}
From: (4, 8) {
([ 1,33] 0.000749) ([ 1,34] 0.001829) ([ 1,35] 0.001768) ([ 1,36] 0.000911)
}
From: (4, 9) {
([ 1,34] 0.000847) ([ 1,35] 0.001589) ([ 1,36] 0.001519) ([ 1,37] 0.001273)
}
From: (5, 1) {
([ 1,35] 0.000654) ([ 1,36] 0.001739) ([ 1,37] 0.001708) ([ 1,38] 0.001517)
}
From: (5, 2) {
([ 1,36] 0.001226) ([ 1,37] 0.001483) ([ 1,38] 0.000882) ([ 1,39] 0.001750)
}
From: (5, 3) {
([ 1,37] 0.001610) ([ 1,38] 0.000934) ([ 1,39] 0.001062) ([ 1,40] 0.000655)
}
From: (5, 4) {
([ 1,38] 0.001080) ([ 1,39] 0.001326) ([ 1,40] 0.001756) ([ 1,41] 0.000698)
}
From: (5, 5) {
([ 1,39] 0.001376) ([ 1,40] 0.001815) ([ 1,41] 0.001344) ([ 1,42] 0.001426)
}
From: (5, 6) {
([ 1,40] 0.001444) ([ 1,41] 0.001485) ([ 1,42] 0.001669) ([ 1,43] 0.000755)
}
From: (5, 7) {
([ 1,41] 0.001540) ([ 1,42] 0.001721) ([ 1,43] 0.000693) ([ 1,44] 0.001196)
}
From: (5, 8) {
([ 1,42] 0.001845) ([ 1,43] 0.000832) ([ 1,44] 0.000759) ([ 1,45] 0.001159)
}
From: (5, 9) {
([ 1,43] 0.000975) ([ 1,44] 0.001471) ([ 1,45] 0.001655) ([ 1,46] 0.001796)
}
From: (6, 1) {
([ 1,44] 0.001142) ([ 1,45] 0.001395) ([ 1,46] 0.000691) ([ 1,47] 0.001090)
}
From: (6, 2) {
([ 1,45] 0.000833) ([ 1,46] 0.001606) ([ 1,47] 0.001487) ([ 1,48] 0.000918)
}
From: (6, 3) {
([ 1,46] 0.001103) ([ 1,47] 0.001628) ([ 1,48] 0.001655) ([ 1,49] 0.001340)
}
From: (6, 4) {
([ 1,47] 0.001177) ([ 1,48] 0.000836) ([ 1,49] 0.000974) ([ 1,50] 0.000833)
}
From: (6, 5) {
([ 1,48] 0.001375) ([ 1,49] 0.001324) ([ 1,50] 0.001155) ([ 1,51] 0.001008)
}
From: (6, 6) {
([ 1,49] 0.000820) ([ 1,50] 0.000658) ([ 1,51] 0.000807) ([ 1,52] 0.001307)
}
From: (6, 7) {
([ 1,50] 0.001186) ([ 1,51] 0.000704) ([ 1,52] 0.001018) ([ 1,53] 0.001822)
}
From: (6, 8) {
([ 1,51] 0.001497) ([ 1,52] 0.001226) ([ 1,53] 0.001694) ([ 1,54] 0.001464)
}
From: (6, 9) {
([ 1,52] 0.001818) ([ 1,53] 0.001717) ([ 1,54] 0.001732) ([ 1,55] 0.001801)
}
From: (7, 1) {
([ 1,53] 0.000932) ([ 1,54] 0.001457) ([ 1,55] 0.000678) ([ 1,56] 0.000845)
}
From: (7, 2) {
([ 1,54] 0.001799) ([ 1,55] 0.000671) ([ 1,56] 0.000730) ([ 1,57] 0.001054)
}
From: (7, 3) {
([ 1,55] 0.001709) ([ 1,56] 0.001048) ([ 1,57] 0.001620) ([ 1,58] 0.001023)
}
From: (7, 4) {
([ 1,56] 0.001047) ([ 1,57] 0.001232) ([ 1,58] 0.000745) ([ 1,59] 0.000826)
}
From: (7, 5) {
([ 1,57] 0.000732) ([ 1,58] 0.001186) ([ 1,59] 0.001724) ([ 1,60] 0.001032)
}
From: (7, 6) {
([ 1,58] 0.001723) ([ 1,59] 0.001516) ([ 1,60] 0.001036) ([ 1,61] 0.001194)
}
From: (7, 7) {
([ 1,59] 0.001172) ([ 1,60] 0.001036) ([ 1,61] 0.001459) ([ 1,62] 0.001751)
}
From: (7, 8) {
([ 1,60] 0.001017) ([ 1,61] 0.001711) ([ 1,62] 0.001029) ([ 1,63] 0.000711)
}
From: (7, 9) {
([ 1,61] 0.001484) ([ 1,62] 0.001771) ([ 1,63] 0.001553) ([ 1,64] 0.001120)
}
From: (8, 1) {
([ 1,62] 0.001425) ([ 1,63] 0.000943) ([ 1,64] 0.001763) ([ 1,65] 0.001620)
}
From: (8, 2) {
([ 1,63] 0.001603) ([ 1,64] 0.001443) ([ 1,65] 0.001432) ([ 1,66] 0.000715)
}
From: (8, 3) {
([ 1,64] 0.000751) ([ 1,65] 0.001641) ([ 1,66] 0.001675) ([ 1,67] 0.001719)
}
From: (8, 4) {
([ 1,65] 0.000687) ([ 1,66] 0.001461) ([ 1,67] 0.001756) ([ 1,68] 0.001367)
}
From: (8, 5) {
([ 1,66] 0.001173) ([ 1,67] 0.001504) ([ 1,68] 0.001535) ([ 1,69] 0.001105)
}
From: (8, 6) {
([ 1,67] 0.000720) ([ 1,68] 0.001360) ([ 1,69] 0.000827) ([ 1,70] 0.001747)
}
From: (8, 7) {
([ 1,68] 0.001431) ([ 1,69] 0.001515) ([ 1,70] 0.001249) ([ 1,71] 0.000684)
}
From: (8, 8) {
([ 1,69] 0.001762) ([ 1,70] 0.000848) ([ 1,71] 0.001346) ([ 1,72] 0.001006)
}
From: (8, 9) {
([ 1,70] 0.001254) ([ 1,71] 0.001131) ([ 1,72] 0.001552) ([ 1,73] 0.000860)
}
From: (9, 1) {
([ 1,71] 0.001326) ([ 1,72] 0.000789) ([ 1,73] 0.001064) ([ 1,74] 0.000793)
}
From: (9, 2) {
([ 1,72] 0.000695) ([ 1,73] 0.001273) ([ 1,74] 0.001097) ([ 1,75] 0.000709)
}
From: (9, 3) {
([ 1,73] 0.001094) ([ 1,74] 0.001134) ([ 1,75] 0.001221) ([ 1,76] 0.001132)
}
From: (9, 4) {
([ 1,74] 0.001296) ([ 1,75] 0.001250) ([ 1,76] 0.001365) ([ 1,77] 0.001840)
}
From: (9, 5) {
([ 1,75] 0.001650) ([ 1,76] 0.001249) ([ 1,77] 0.000910) ([ 1,78] 0.001688)
}
From: (9, 6) {
([ 1,76] 0.000737) ([ 1,77] 0.001245) ([ 1,78] 0.000921) ([ 1,79] 0.001040)
}
From: (9, 7) {
([ 1,77] 0.001026) ([ 1,78] 0.001238) ([ 1,79] 0.001063) ([ 1,80] 0.001104)
}
From: (9, 8) {
([ 1,78] 0.001701) ([ 1,79] 0.000694) ([ 1,80] 0.001613) ([ 1,81] 0.001727)
}
From: (9, 9) {
([ 1,79] 0.001153) ([ 1,80] 0.000735) ([ 1,81] 0.001205) ([ 1, 1] 0.001739)
}
}