home← all results complex #393

Complex #393 — Ru(2) [[Ru(TAP)2phen]2+]

GT: {"N": 6} → Top-1: {"N": 2}
rdmetallics.net (363)Sequential multi-lig (7058)Single-ligand (939)
30
Candidates
{"N": 6}
Ground Truth
{"N": 2}
Top-1 Prediction
0.333
Match Score
⬇ MOL (coordinated) Raw MOL 🔬 3D Viewer Complex detail
#1 TOP-1 0.28 ± 0.00
c1c[n]2->[Ru+2]<-[n]3ccnc4ccc(n1)c2c43
#1 TOP-1 0.28 ± 0.00
c1c[n]2->[Ru+2]<-[n]3ccnc4ccc(n1)c2c43
#1 TOP-1 0.28 ± 0.00
c1c[n]2->[Ru+2]<-[n]3ccnc4ccc(n1)c2c43
#1 TOP-1 0.28 ± 0.00
c1c[n]2->[Ru+2]<-[n]3ccnc4ccc(n1)c2c43
#1 TOP-1 0.28 ± 0.00
c1c[n]2->[Ru+2]<-[n]3ccnc4ccc(n1)c2c43
#1 TOP-1 0.28 ± 0.00
c1c[n]2->[Ru+2]<-[n]3ccnc4ccc(n1)c2c43
#1 TOP-1 0.28 ± 0.00
c1c[n]2->[Ru+2]<-[n]3ccnc4ccc(n1)c2c43
#1 TOP-1 0.28 ± 0.00
c1c[n]2->[Ru+2]<-[n]3ccnc4ccc(n1)c2c43
#1 TOP-1 0.28 ± 0.00
c1c[n]2->[Ru+2]<-[n]3ccnc4ccc(n1)c2c43
#2 0.02 ± 0.00
c1c[n]2->[Ru+2]3(<-[n]4ccnc5ccc(n1)c2c54)<-[n]1ccnc2ccc4ncc[n]->3c4c21
#2 0.02 ± 0.00
c1c[n]2->[Ru+2]3(<-[n]4ccnc5ccc(n1)c2c54)<-[n]1ccnc2ccc4ncc[n]->3c4c21
#2 0.02 ± 0.00
c1c[n]2->[Ru+2]3(<-[n]4ccnc5ccc(n1)c2c54)<-[n]1ccnc2ccc4ncc[n]->3c4c21
#2 0.02 ± 0.00
c1c[n]2->[Ru+2]3(<-[n]4ccnc5ccc(n1)c2c54)<-[n]1ccnc2ccc4ncc[n]->3c4c21
#2 0.02 ± 0.00
c1c[n]2->[Ru+2]3(<-[n]4ccnc5ccc(n1)c2c54)<-[n]1ccnc2ccc4ncc[n]->3c4c21
#2 0.02 ± 0.00
c1c[n]2->[Ru+2]3(<-[n]4ccnc5ccc(n1)c2c54)<-[n]1ccnc2ccc4ncc[n]->3c4c21
#2 0.02 ± 0.00
c1c[n]2->[Ru+2]3(<-[n]4ccnc5ccc(n1)c2c54)<-[n]1ccnc2ccc4ncc[n]->3c4c21
#2 0.02 ± 0.00
c1c[n]2->[Ru+2]3(<-[n]4ccnc5ccc(n1)c2c54)<-[n]1ccnc2ccc4ncc[n]->3c4c21
#2 0.02 ± 0.00
c1c[n]2->[Ru+2]3(<-[n]4ccnc5ccc(n1)c2c54)<-[n]1ccnc2ccc4ncc[n]->3c4c21
#3 0.01 ± 0.00
[Ru+2]<-[n]1ccnc2ccc3nccnc3c21
#3 0.01 ± 0.00
[Ru+2]<-[n]1ccnc2ccc3nccnc3c21
#3 0.01 ± 0.00
[Ru+2]<-[n]1ccnc2ccc3nccnc3c21
#3 0.01 ± 0.00
[Ru+2]<-[n]1ccnc2ccc3nccnc3c21
#3 0.01 ± 0.00
[Ru+2]<-[n]1ccnc2ccc3nccnc3c21
#3 0.01 ± 0.00
[Ru+2]<-[n]1ccnc2ccc3nccnc3c21
#3 0.01 ± 0.00
[Ru+2]<-[n]1ccnc2ccc3nccnc3c21
#3 0.01 ± 0.00
[Ru+2]<-[n]1ccnc2ccc3nccnc3c21
#3 0.01 ± 0.00
[Ru+2]<-[n]1ccnc2ccc3nccnc3c21
#4 0.01 ± 0.00
c1cc2ccc3ccc[n]4->[Ru+2](<-[n]5ccnc6c7nccnc7ccc65)(<-[n]5ccnc6c7nccnc7ccc65)<-[n](c1)c2c34
#4 0.01 ± 0.00
c1cc2ccc3ccc[n]4->[Ru+2](<-[n]5ccnc6c7nccnc7ccc65)(<-[n]5ccnc6c7nccnc7ccc65)<-[n](c1)c2c34
#4 0.01 ± 0.00
c1cc2ccc3ccc[n]4->[Ru+2](<-[n]5ccnc6c7nccnc7ccc65)(<-[n]5ccnc6c7nccnc7ccc65)<-[n](c1)c2c34
#4 0.01 ± 0.00
c1cc2ccc3ccc[n]4->[Ru+2](<-[n]5ccnc6c7nccnc7ccc65)(<-[n]5ccnc6c7nccnc7ccc65)<-[n](c1)c2c34
#4 0.01 ± 0.00
c1cc2ccc3ccc[n]4->[Ru+2](<-[n]5ccnc6c7nccnc7ccc65)(<-[n]5ccnc6c7nccnc7ccc65)<-[n](c1)c2c34
#4 0.01 ± 0.00
c1cc2ccc3ccc[n]4->[Ru+2](<-[n]5ccnc6c7nccnc7ccc65)(<-[n]5ccnc6c7nccnc7ccc65)<-[n](c1)c2c34
#4 0.01 ± 0.00
c1cc2ccc3ccc[n]4->[Ru+2](<-[n]5ccnc6c7nccnc7ccc65)(<-[n]5ccnc6c7nccnc7ccc65)<-[n](c1)c2c34
#4 0.01 ± 0.00
c1cc2ccc3ccc[n]4->[Ru+2](<-[n]5ccnc6c7nccnc7ccc65)(<-[n]5ccnc6c7nccnc7ccc65)<-[n](c1)c2c34
#4 0.01 ± 0.00
c1cc2ccc3ccc[n]4->[Ru+2](<-[n]5ccnc6c7nccnc7ccc65)(<-[n]5ccnc6c7nccnc7ccc65)<-[n](c1)c2c34
#5 0.00 ± 0.00
c1cnc2c(ccc3c2[n]2->[Ru+2]4(<-[n]3cc2)<-[n]2cc[n]->4c3c4nccnc4ccc32)n1
#5 0.00 ± 0.00
c1cnc2c(ccc3c2[n]2->[Ru+2]4(<-[n]3cc2)<-[n]2cc[n]->4c3c4nccnc4ccc32)n1
#5 0.00 ± 0.00
c1cnc2c(ccc3c2[n]2->[Ru+2]4(<-[n]3cc2)<-[n]2cc[n]->4c3c4nccnc4ccc32)n1
#5 0.00 ± 0.00
c1cnc2c(ccc3c2[n]2->[Ru+2]4(<-[n]3cc2)<-[n]2cc[n]->4c3c4nccnc4ccc32)n1
#5 0.00 ± 0.00
c1cnc2c(ccc3c2[n]2->[Ru+2]4(<-[n]3cc2)<-[n]2cc[n]->4c3c4nccnc4ccc32)n1
#5 0.00 ± 0.00
c1cnc2c(ccc3c2[n]2->[Ru+2]4(<-[n]3cc2)<-[n]2cc[n]->4c3c4nccnc4ccc32)n1
#5 0.00 ± 0.00
c1cnc2c(ccc3c2[n]2->[Ru+2]4(<-[n]3cc2)<-[n]2cc[n]->4c3c4nccnc4ccc32)n1
#5 0.00 ± 0.00
c1cnc2c(ccc3c2[n]2->[Ru+2]4(<-[n]3cc2)<-[n]2cc[n]->4c3c4nccnc4ccc32)n1
#5 0.00 ± 0.00
c1cnc2c(ccc3c2[n]2->[Ru+2]4(<-[n]3cc2)<-[n]2cc[n]->4c3c4nccnc4ccc32)n1
#6 0.00 ± 0.00
c1cc2ccc3ccc[n]4->[Ru+2]5(<-[n]6ccnc7c8nccnc8ccc76)(<-[n]6cc[n]->5c5c7nccnc7ccc56)<-[n](c1)c2c34
#6 0.00 ± 0.00
c1cc2ccc3ccc[n]4->[Ru+2]5(<-[n]6ccnc7c8nccnc8ccc76)(<-[n]6cc[n]->5c5c7nccnc7ccc56)<-[n](c1)c2c34
#6 0.00 ± 0.00
c1cc2ccc3ccc[n]4->[Ru+2]5(<-[n]6ccnc7c8nccnc8ccc76)(<-[n]6cc[n]->5c5c7nccnc7ccc56)<-[n](c1)c2c34
#6 0.00 ± 0.00
c1cc2ccc3ccc[n]4->[Ru+2]5(<-[n]6ccnc7c8nccnc8ccc76)(<-[n]6cc[n]->5c5c7nccnc7ccc56)<-[n](c1)c2c34
#6 0.00 ± 0.00
c1cc2ccc3ccc[n]4->[Ru+2]5(<-[n]6ccnc7c8nccnc8ccc76)(<-[n]6cc[n]->5c5c7nccnc7ccc56)<-[n](c1)c2c34
#6 0.00 ± 0.00
c1cc2ccc3ccc[n]4->[Ru+2]5(<-[n]6ccnc7c8nccnc8ccc76)(<-[n]6cc[n]->5c5c7nccnc7ccc56)<-[n](c1)c2c34
#6 0.00 ± 0.00
c1cc2ccc3ccc[n]4->[Ru+2]5(<-[n]6ccnc7c8nccnc8ccc76)(<-[n]6cc[n]->5c5c7nccnc7ccc56)<-[n](c1)c2c34
#6 0.00 ± 0.00
c1cc2ccc3ccc[n]4->[Ru+2]5(<-[n]6ccnc7c8nccnc8ccc76)(<-[n]6cc[n]->5c5c7nccnc7ccc56)<-[n](c1)c2c34
#6 0.00 ± 0.00
c1cc2ccc3ccc[n]4->[Ru+2]5(<-[n]6ccnc7c8nccnc8ccc76)(<-[n]6cc[n]->5c5c7nccnc7ccc56)<-[n](c1)c2c34
#7 0.00 ± 0.00
c1cc2ccc3ccc[n]4->[Ru+2](<-[n]5ccnc6c7nccnc7ccc65)(<-[n]5ccnc6ccc7nccnc7c65)<-[n](c1)c2c34
#7 0.00 ± 0.00
c1cc2ccc3ccc[n]4->[Ru+2](<-[n]5ccnc6c7nccnc7ccc65)(<-[n]5ccnc6ccc7nccnc7c65)<-[n](c1)c2c34
#7 0.00 ± 0.00
c1cc2ccc3ccc[n]4->[Ru+2](<-[n]5ccnc6c7nccnc7ccc65)(<-[n]5ccnc6ccc7nccnc7c65)<-[n](c1)c2c34
#7 0.00 ± 0.00
c1cc2ccc3ccc[n]4->[Ru+2](<-[n]5ccnc6c7nccnc7ccc65)(<-[n]5ccnc6ccc7nccnc7c65)<-[n](c1)c2c34
#7 0.00 ± 0.00
c1cc2ccc3ccc[n]4->[Ru+2](<-[n]5ccnc6c7nccnc7ccc65)(<-[n]5ccnc6ccc7nccnc7c65)<-[n](c1)c2c34
#7 0.00 ± 0.00
c1cc2ccc3ccc[n]4->[Ru+2](<-[n]5ccnc6c7nccnc7ccc65)(<-[n]5ccnc6ccc7nccnc7c65)<-[n](c1)c2c34
#7 0.00 ± 0.00
c1cc2ccc3ccc[n]4->[Ru+2](<-[n]5ccnc6c7nccnc7ccc65)(<-[n]5ccnc6ccc7nccnc7c65)<-[n](c1)c2c34
#7 0.00 ± 0.00
c1cc2ccc3ccc[n]4->[Ru+2](<-[n]5ccnc6c7nccnc7ccc65)(<-[n]5ccnc6ccc7nccnc7c65)<-[n](c1)c2c34
#7 0.00 ± 0.00
c1cc2ccc3ccc[n]4->[Ru+2](<-[n]5ccnc6c7nccnc7ccc65)(<-[n]5ccnc6ccc7nccnc7c65)<-[n](c1)c2c34
#8 0.00 ± 0.00
c1cc2ccc3ccc[n]4->[Ru+2]5(<-[n]6ccnc7c8nccnc8ccc76)(<-[n](c1)c2c34)<-[n]1ccnc2ccc3ncc[n]->5c3c21
#8 0.00 ± 0.00
c1cc2ccc3ccc[n]4->[Ru+2]5(<-[n]6ccnc7c8nccnc8ccc76)(<-[n](c1)c2c34)<-[n]1ccnc2ccc3ncc[n]->5c3c21
#8 0.00 ± 0.00
c1cc2ccc3ccc[n]4->[Ru+2]5(<-[n]6ccnc7c8nccnc8ccc76)(<-[n](c1)c2c34)<-[n]1ccnc2ccc3ncc[n]->5c3c21
#8 0.00 ± 0.00
c1cc2ccc3ccc[n]4->[Ru+2]5(<-[n]6ccnc7c8nccnc8ccc76)(<-[n](c1)c2c34)<-[n]1ccnc2ccc3ncc[n]->5c3c21
#8 0.00 ± 0.00
c1cc2ccc3ccc[n]4->[Ru+2]5(<-[n]6ccnc7c8nccnc8ccc76)(<-[n](c1)c2c34)<-[n]1ccnc2ccc3ncc[n]->5c3c21
#8 0.00 ± 0.00
c1cc2ccc3ccc[n]4->[Ru+2]5(<-[n]6ccnc7c8nccnc8ccc76)(<-[n](c1)c2c34)<-[n]1ccnc2ccc3ncc[n]->5c3c21
#8 0.00 ± 0.00
c1cc2ccc3ccc[n]4->[Ru+2]5(<-[n]6ccnc7c8nccnc8ccc76)(<-[n](c1)c2c34)<-[n]1ccnc2ccc3ncc[n]->5c3c21
#8 0.00 ± 0.00
c1cc2ccc3ccc[n]4->[Ru+2]5(<-[n]6ccnc7c8nccnc8ccc76)(<-[n](c1)c2c34)<-[n]1ccnc2ccc3ncc[n]->5c3c21
#8 0.00 ± 0.00
c1cc2ccc3ccc[n]4->[Ru+2]5(<-[n]6ccnc7c8nccnc8ccc76)(<-[n](c1)c2c34)<-[n]1ccnc2ccc3ncc[n]->5c3c21
#9 0.00 ± 0.00
c1cc2ccc3ccc[n]4->[Ru+2](<-[n]5ccnc6ccc7nccnc7c65)(<-[n]5ccnc6ccc7nccnc7c65)<-[n](c1)c2c34
#9 0.00 ± 0.00
c1cc2ccc3ccc[n]4->[Ru+2](<-[n]5ccnc6ccc7nccnc7c65)(<-[n]5ccnc6ccc7nccnc7c65)<-[n](c1)c2c34
#9 0.00 ± 0.00
c1cc2ccc3ccc[n]4->[Ru+2](<-[n]5ccnc6ccc7nccnc7c65)(<-[n]5ccnc6ccc7nccnc7c65)<-[n](c1)c2c34
#9 0.00 ± 0.00
c1cc2ccc3ccc[n]4->[Ru+2](<-[n]5ccnc6ccc7nccnc7c65)(<-[n]5ccnc6ccc7nccnc7c65)<-[n](c1)c2c34
#9 0.00 ± 0.00
c1cc2ccc3ccc[n]4->[Ru+2](<-[n]5ccnc6ccc7nccnc7c65)(<-[n]5ccnc6ccc7nccnc7c65)<-[n](c1)c2c34
#9 0.00 ± 0.00
c1cc2ccc3ccc[n]4->[Ru+2](<-[n]5ccnc6ccc7nccnc7c65)(<-[n]5ccnc6ccc7nccnc7c65)<-[n](c1)c2c34
#9 0.00 ± 0.00
c1cc2ccc3ccc[n]4->[Ru+2](<-[n]5ccnc6ccc7nccnc7c65)(<-[n]5ccnc6ccc7nccnc7c65)<-[n](c1)c2c34
#9 0.00 ± 0.00
c1cc2ccc3ccc[n]4->[Ru+2](<-[n]5ccnc6ccc7nccnc7c65)(<-[n]5ccnc6ccc7nccnc7c65)<-[n](c1)c2c34
#9 0.00 ± 0.00
c1cc2ccc3ccc[n]4->[Ru+2](<-[n]5ccnc6ccc7nccnc7c65)(<-[n]5ccnc6ccc7nccnc7c65)<-[n](c1)c2c34
#10 0.00 ± 0.00
c1cc2ccc3ccc[n]4->[Ru+2]5(<-[n]6cc[n]->5c5c7nccnc7ccc56)(<-[n]5ccnc6ccc7nccnc7c65)<-[n](c1)c2c34
#10 0.00 ± 0.00
c1cc2ccc3ccc[n]4->[Ru+2]5(<-[n]6cc[n]->5c5c7nccnc7ccc56)(<-[n]5ccnc6ccc7nccnc7c65)<-[n](c1)c2c34
#10 0.00 ± 0.00
c1cc2ccc3ccc[n]4->[Ru+2]5(<-[n]6cc[n]->5c5c7nccnc7ccc56)(<-[n]5ccnc6ccc7nccnc7c65)<-[n](c1)c2c34
#10 0.00 ± 0.00
c1cc2ccc3ccc[n]4->[Ru+2]5(<-[n]6cc[n]->5c5c7nccnc7ccc56)(<-[n]5ccnc6ccc7nccnc7c65)<-[n](c1)c2c34
#10 0.00 ± 0.00
c1cc2ccc3ccc[n]4->[Ru+2]5(<-[n]6cc[n]->5c5c7nccnc7ccc56)(<-[n]5ccnc6ccc7nccnc7c65)<-[n](c1)c2c34
#10 0.00 ± 0.00
c1cc2ccc3ccc[n]4->[Ru+2]5(<-[n]6cc[n]->5c5c7nccnc7ccc56)(<-[n]5ccnc6ccc7nccnc7c65)<-[n](c1)c2c34
#10 0.00 ± 0.00
c1cc2ccc3ccc[n]4->[Ru+2]5(<-[n]6cc[n]->5c5c7nccnc7ccc56)(<-[n]5ccnc6ccc7nccnc7c65)<-[n](c1)c2c34
#10 0.00 ± 0.00
c1cc2ccc3ccc[n]4->[Ru+2]5(<-[n]6cc[n]->5c5c7nccnc7ccc56)(<-[n]5ccnc6ccc7nccnc7c65)<-[n](c1)c2c34
#10 0.00 ± 0.00
c1cc2ccc3ccc[n]4->[Ru+2]5(<-[n]6cc[n]->5c5c7nccnc7ccc56)(<-[n]5ccnc6ccc7nccnc7c65)<-[n](c1)c2c34
#11 0.00 ± 0.00
c1cnc2c(c1)ccc1ccc[n](->[Ru+2]<-[n]3ccnc4c5nccnc5ccc43)c12
#11 0.00 ± 0.00
c1cnc2c(c1)ccc1ccc[n](->[Ru+2]<-[n]3ccnc4c5nccnc5ccc43)c12
#11 0.00 ± 0.00
c1cnc2c(c1)ccc1ccc[n](->[Ru+2]<-[n]3ccnc4c5nccnc5ccc43)c12
#11 0.00 ± 0.00
c1cnc2c(c1)ccc1ccc[n](->[Ru+2]<-[n]3ccnc4c5nccnc5ccc43)c12
#11 0.00 ± 0.00
c1cnc2c(c1)ccc1ccc[n](->[Ru+2]<-[n]3ccnc4c5nccnc5ccc43)c12
#11 0.00 ± 0.00
c1cnc2c(c1)ccc1ccc[n](->[Ru+2]<-[n]3ccnc4c5nccnc5ccc43)c12
#11 0.00 ± 0.00
c1cnc2c(c1)ccc1ccc[n](->[Ru+2]<-[n]3ccnc4c5nccnc5ccc43)c12
#11 0.00 ± 0.00
c1cnc2c(c1)ccc1ccc[n](->[Ru+2]<-[n]3ccnc4c5nccnc5ccc43)c12
#11 0.00 ± 0.00
c1cnc2c(c1)ccc1ccc[n](->[Ru+2]<-[n]3ccnc4c5nccnc5ccc43)c12
#12 0.00 ± 0.00
c1cc2ccc3ccc[n]4->[Ru+2]5(<-[n]6ccnc7ccc8nccnc8c76)(<-[n](c1)c2c34)<-[n]1ccnc2ccc3ncc[n]->5c3c21
#12 0.00 ± 0.00
c1cc2ccc3ccc[n]4->[Ru+2]5(<-[n]6ccnc7ccc8nccnc8c76)(<-[n](c1)c2c34)<-[n]1ccnc2ccc3ncc[n]->5c3c21
#12 0.00 ± 0.00
c1cc2ccc3ccc[n]4->[Ru+2]5(<-[n]6ccnc7ccc8nccnc8c76)(<-[n](c1)c2c34)<-[n]1ccnc2ccc3ncc[n]->5c3c21
#12 0.00 ± 0.00
c1cc2ccc3ccc[n]4->[Ru+2]5(<-[n]6ccnc7ccc8nccnc8c76)(<-[n](c1)c2c34)<-[n]1ccnc2ccc3ncc[n]->5c3c21
#12 0.00 ± 0.00
c1cc2ccc3ccc[n]4->[Ru+2]5(<-[n]6ccnc7ccc8nccnc8c76)(<-[n](c1)c2c34)<-[n]1ccnc2ccc3ncc[n]->5c3c21
#12 0.00 ± 0.00
c1cc2ccc3ccc[n]4->[Ru+2]5(<-[n]6ccnc7ccc8nccnc8c76)(<-[n](c1)c2c34)<-[n]1ccnc2ccc3ncc[n]->5c3c21
#12 0.00 ± 0.00
c1cc2ccc3ccc[n]4->[Ru+2]5(<-[n]6ccnc7ccc8nccnc8c76)(<-[n](c1)c2c34)<-[n]1ccnc2ccc3ncc[n]->5c3c21
#12 0.00 ± 0.00
c1cc2ccc3ccc[n]4->[Ru+2]5(<-[n]6ccnc7ccc8nccnc8c76)(<-[n](c1)c2c34)<-[n]1ccnc2ccc3ncc[n]->5c3c21
#12 0.00 ± 0.00
c1cc2ccc3ccc[n]4->[Ru+2]5(<-[n]6ccnc7ccc8nccnc8c76)(<-[n](c1)c2c34)<-[n]1ccnc2ccc3ncc[n]->5c3c21
#13 0.00 ± 0.00
c1cc2ccc3ccc[n]4->[Ru+2]5(<-[n]6ccnc7c8nccnc8ccc76)(<-[n]6ccnc7c8ncc[n]->5c8ccc76)<-[n](c1)c2c34
#13 0.00 ± 0.00
c1cc2ccc3ccc[n]4->[Ru+2]5(<-[n]6ccnc7c8nccnc8ccc76)(<-[n]6ccnc7c8ncc[n]->5c8ccc76)<-[n](c1)c2c34
#13 0.00 ± 0.00
c1cc2ccc3ccc[n]4->[Ru+2]5(<-[n]6ccnc7c8nccnc8ccc76)(<-[n]6ccnc7c8ncc[n]->5c8ccc76)<-[n](c1)c2c34
#13 0.00 ± 0.00
c1cc2ccc3ccc[n]4->[Ru+2]5(<-[n]6ccnc7c8nccnc8ccc76)(<-[n]6ccnc7c8ncc[n]->5c8ccc76)<-[n](c1)c2c34
#13 0.00 ± 0.00
c1cc2ccc3ccc[n]4->[Ru+2]5(<-[n]6ccnc7c8nccnc8ccc76)(<-[n]6ccnc7c8ncc[n]->5c8ccc76)<-[n](c1)c2c34
#13 0.00 ± 0.00
c1cc2ccc3ccc[n]4->[Ru+2]5(<-[n]6ccnc7c8nccnc8ccc76)(<-[n]6ccnc7c8ncc[n]->5c8ccc76)<-[n](c1)c2c34
#13 0.00 ± 0.00
c1cc2ccc3ccc[n]4->[Ru+2]5(<-[n]6ccnc7c8nccnc8ccc76)(<-[n]6ccnc7c8ncc[n]->5c8ccc76)<-[n](c1)c2c34
#13 0.00 ± 0.00
c1cc2ccc3ccc[n]4->[Ru+2]5(<-[n]6ccnc7c8nccnc8ccc76)(<-[n]6ccnc7c8ncc[n]->5c8ccc76)<-[n](c1)c2c34
#13 0.00 ± 0.00
c1cc2ccc3ccc[n]4->[Ru+2]5(<-[n]6ccnc7c8nccnc8ccc76)(<-[n]6ccnc7c8ncc[n]->5c8ccc76)<-[n](c1)c2c34
#14 0.00 ± 0.00
c1cnc2c(c1)ccc1ccc[n](->[Ru+2]3<-[n]4ccnc5ccc6ncc[n]->3c6c54)c12
#14 0.00 ± 0.00
c1cnc2c(c1)ccc1ccc[n](->[Ru+2]3<-[n]4ccnc5ccc6ncc[n]->3c6c54)c12
#14 0.00 ± 0.00
c1cnc2c(c1)ccc1ccc[n](->[Ru+2]3<-[n]4ccnc5ccc6ncc[n]->3c6c54)c12
#14 0.00 ± 0.00
c1cnc2c(c1)ccc1ccc[n](->[Ru+2]3<-[n]4ccnc5ccc6ncc[n]->3c6c54)c12
#14 0.00 ± 0.00
c1cnc2c(c1)ccc1ccc[n](->[Ru+2]3<-[n]4ccnc5ccc6ncc[n]->3c6c54)c12
#14 0.00 ± 0.00
c1cnc2c(c1)ccc1ccc[n](->[Ru+2]3<-[n]4ccnc5ccc6ncc[n]->3c6c54)c12
#14 0.00 ± 0.00
c1cnc2c(c1)ccc1ccc[n](->[Ru+2]3<-[n]4ccnc5ccc6ncc[n]->3c6c54)c12
#14 0.00 ± 0.00
c1cnc2c(c1)ccc1ccc[n](->[Ru+2]3<-[n]4ccnc5ccc6ncc[n]->3c6c54)c12
#14 0.00 ± 0.00
c1cnc2c(c1)ccc1ccc[n](->[Ru+2]3<-[n]4ccnc5ccc6ncc[n]->3c6c54)c12
#15 0.00 ± 0.00
c1cc2ccc3ccc[n]4->[Ru+2]5(<-[n]6ccnc7c8nccnc8ccc76)(<-[n]6ccnc7c6ccc6ncc[n]->5c67)<-[n](c1)c2c34
#15 0.00 ± 0.00
c1cc2ccc3ccc[n]4->[Ru+2]5(<-[n]6ccnc7c8nccnc8ccc76)(<-[n]6ccnc7c6ccc6ncc[n]->5c67)<-[n](c1)c2c34
#15 0.00 ± 0.00
c1cc2ccc3ccc[n]4->[Ru+2]5(<-[n]6ccnc7c8nccnc8ccc76)(<-[n]6ccnc7c6ccc6ncc[n]->5c67)<-[n](c1)c2c34
#15 0.00 ± 0.00
c1cc2ccc3ccc[n]4->[Ru+2]5(<-[n]6ccnc7c8nccnc8ccc76)(<-[n]6ccnc7c6ccc6ncc[n]->5c67)<-[n](c1)c2c34
#15 0.00 ± 0.00
c1cc2ccc3ccc[n]4->[Ru+2]5(<-[n]6ccnc7c8nccnc8ccc76)(<-[n]6ccnc7c6ccc6ncc[n]->5c67)<-[n](c1)c2c34
#15 0.00 ± 0.00
c1cc2ccc3ccc[n]4->[Ru+2]5(<-[n]6ccnc7c8nccnc8ccc76)(<-[n]6ccnc7c6ccc6ncc[n]->5c67)<-[n](c1)c2c34
#15 0.00 ± 0.00
c1cc2ccc3ccc[n]4->[Ru+2]5(<-[n]6ccnc7c8nccnc8ccc76)(<-[n]6ccnc7c6ccc6ncc[n]->5c67)<-[n](c1)c2c34
#15 0.00 ± 0.00
c1cc2ccc3ccc[n]4->[Ru+2]5(<-[n]6ccnc7c8nccnc8ccc76)(<-[n]6ccnc7c6ccc6ncc[n]->5c67)<-[n](c1)c2c34
#15 0.00 ± 0.00
c1cc2ccc3ccc[n]4->[Ru+2]5(<-[n]6ccnc7c8nccnc8ccc76)(<-[n]6ccnc7c6ccc6ncc[n]->5c67)<-[n](c1)c2c34
#16 0.00 ± 0.00
c1cnc2c(c1)ccc1ccc[n](->[Ru+2]34<-[n]5ccnc6c5ccc5c6[n]->3cc[n]->45)c12
#16 0.00 ± 0.00
c1cnc2c(c1)ccc1ccc[n](->[Ru+2]34<-[n]5ccnc6c5ccc5c6[n]->3cc[n]->45)c12
#16 0.00 ± 0.00
c1cnc2c(c1)ccc1ccc[n](->[Ru+2]34<-[n]5ccnc6c5ccc5c6[n]->3cc[n]->45)c12
#16 0.00 ± 0.00
c1cnc2c(c1)ccc1ccc[n](->[Ru+2]34<-[n]5ccnc6c5ccc5c6[n]->3cc[n]->45)c12
#16 0.00 ± 0.00
c1cnc2c(c1)ccc1ccc[n](->[Ru+2]34<-[n]5ccnc6c5ccc5c6[n]->3cc[n]->45)c12
#16 0.00 ± 0.00
c1cnc2c(c1)ccc1ccc[n](->[Ru+2]34<-[n]5ccnc6c5ccc5c6[n]->3cc[n]->45)c12
#16 0.00 ± 0.00
c1cnc2c(c1)ccc1ccc[n](->[Ru+2]34<-[n]5ccnc6c5ccc5c6[n]->3cc[n]->45)c12
#16 0.00 ± 0.00
c1cnc2c(c1)ccc1ccc[n](->[Ru+2]34<-[n]5ccnc6c5ccc5c6[n]->3cc[n]->45)c12
#16 0.00 ± 0.00
c1cnc2c(c1)ccc1ccc[n](->[Ru+2]34<-[n]5ccnc6c5ccc5c6[n]->3cc[n]->45)c12
#17 0.00 ± 0.00
c1cnc2c(c1)ccc1ccc[n](->[Ru+2]3(<-[n]4ccnc5c6nccnc6ccc54)<-[n]4ccnc5c6ncc[n]->3c6ccc54)c12
#17 0.00 ± 0.00
c1cnc2c(c1)ccc1ccc[n](->[Ru+2]3(<-[n]4ccnc5c6nccnc6ccc54)<-[n]4ccnc5c6ncc[n]->3c6ccc54)c12
#17 0.00 ± 0.00
c1cnc2c(c1)ccc1ccc[n](->[Ru+2]3(<-[n]4ccnc5c6nccnc6ccc54)<-[n]4ccnc5c6ncc[n]->3c6ccc54)c12
#17 0.00 ± 0.00
c1cnc2c(c1)ccc1ccc[n](->[Ru+2]3(<-[n]4ccnc5c6nccnc6ccc54)<-[n]4ccnc5c6ncc[n]->3c6ccc54)c12
#17 0.00 ± 0.00
c1cnc2c(c1)ccc1ccc[n](->[Ru+2]3(<-[n]4ccnc5c6nccnc6ccc54)<-[n]4ccnc5c6ncc[n]->3c6ccc54)c12
#17 0.00 ± 0.00
c1cnc2c(c1)ccc1ccc[n](->[Ru+2]3(<-[n]4ccnc5c6nccnc6ccc54)<-[n]4ccnc5c6ncc[n]->3c6ccc54)c12
#17 0.00 ± 0.00
c1cnc2c(c1)ccc1ccc[n](->[Ru+2]3(<-[n]4ccnc5c6nccnc6ccc54)<-[n]4ccnc5c6ncc[n]->3c6ccc54)c12
#17 0.00 ± 0.00
c1cnc2c(c1)ccc1ccc[n](->[Ru+2]3(<-[n]4ccnc5c6nccnc6ccc54)<-[n]4ccnc5c6ncc[n]->3c6ccc54)c12
#17 0.00 ± 0.00
c1cnc2c(c1)ccc1ccc[n](->[Ru+2]3(<-[n]4ccnc5c6nccnc6ccc54)<-[n]4ccnc5c6ncc[n]->3c6ccc54)c12
#18 0.00 ± 0.00
c1cnc2c(c1)ccc1ccc[n](->[Ru+2]<-[n]3ccnc4ccc5nccnc5c43)c12
#18 0.00 ± 0.00
c1cnc2c(c1)ccc1ccc[n](->[Ru+2]<-[n]3ccnc4ccc5nccnc5c43)c12
#18 0.00 ± 0.00
c1cnc2c(c1)ccc1ccc[n](->[Ru+2]<-[n]3ccnc4ccc5nccnc5c43)c12
#18 0.00 ± 0.00
c1cnc2c(c1)ccc1ccc[n](->[Ru+2]<-[n]3ccnc4ccc5nccnc5c43)c12
#18 0.00 ± 0.00
c1cnc2c(c1)ccc1ccc[n](->[Ru+2]<-[n]3ccnc4ccc5nccnc5c43)c12
#18 0.00 ± 0.00
c1cnc2c(c1)ccc1ccc[n](->[Ru+2]<-[n]3ccnc4ccc5nccnc5c43)c12
#18 0.00 ± 0.00
c1cnc2c(c1)ccc1ccc[n](->[Ru+2]<-[n]3ccnc4ccc5nccnc5c43)c12
#18 0.00 ± 0.00
c1cnc2c(c1)ccc1ccc[n](->[Ru+2]<-[n]3ccnc4ccc5nccnc5c43)c12
#18 0.00 ± 0.00
c1cnc2c(c1)ccc1ccc[n](->[Ru+2]<-[n]3ccnc4ccc5nccnc5c43)c12
#19 0.00 ± 0.00
c1cnc2c(ccc3ncc[n](->[Ru+2]<-[n]4ccnc5ccc6nccnc6c54)c32)n1
#19 0.00 ± 0.00
c1cnc2c(ccc3ncc[n](->[Ru+2]<-[n]4ccnc5ccc6nccnc6c54)c32)n1
#19 0.00 ± 0.00
c1cnc2c(ccc3ncc[n](->[Ru+2]<-[n]4ccnc5ccc6nccnc6c54)c32)n1
#19 0.00 ± 0.00
c1cnc2c(ccc3ncc[n](->[Ru+2]<-[n]4ccnc5ccc6nccnc6c54)c32)n1
#19 0.00 ± 0.00
c1cnc2c(ccc3ncc[n](->[Ru+2]<-[n]4ccnc5ccc6nccnc6c54)c32)n1
#19 0.00 ± 0.00
c1cnc2c(ccc3ncc[n](->[Ru+2]<-[n]4ccnc5ccc6nccnc6c54)c32)n1
#19 0.00 ± 0.00
c1cnc2c(ccc3ncc[n](->[Ru+2]<-[n]4ccnc5ccc6nccnc6c54)c32)n1
#19 0.00 ± 0.00
c1cnc2c(ccc3ncc[n](->[Ru+2]<-[n]4ccnc5ccc6nccnc6c54)c32)n1
#19 0.00 ± 0.00
c1cnc2c(ccc3ncc[n](->[Ru+2]<-[n]4ccnc5ccc6nccnc6c54)c32)n1
#20 0.00 ± 0.00
c1cnc2c(c1)ccc1ccc[n](->[Ru+2](<-[n]3ccnc4c5nccnc5ccc43)<-[n]3ccnc4c5nccnc5ccc43)c12
#20 0.00 ± 0.00
c1cnc2c(c1)ccc1ccc[n](->[Ru+2](<-[n]3ccnc4c5nccnc5ccc43)<-[n]3ccnc4c5nccnc5ccc43)c12
#20 0.00 ± 0.00
c1cnc2c(c1)ccc1ccc[n](->[Ru+2](<-[n]3ccnc4c5nccnc5ccc43)<-[n]3ccnc4c5nccnc5ccc43)c12
#20 0.00 ± 0.00
c1cnc2c(c1)ccc1ccc[n](->[Ru+2](<-[n]3ccnc4c5nccnc5ccc43)<-[n]3ccnc4c5nccnc5ccc43)c12
#20 0.00 ± 0.00
c1cnc2c(c1)ccc1ccc[n](->[Ru+2](<-[n]3ccnc4c5nccnc5ccc43)<-[n]3ccnc4c5nccnc5ccc43)c12
#20 0.00 ± 0.00
c1cnc2c(c1)ccc1ccc[n](->[Ru+2](<-[n]3ccnc4c5nccnc5ccc43)<-[n]3ccnc4c5nccnc5ccc43)c12
#20 0.00 ± 0.00
c1cnc2c(c1)ccc1ccc[n](->[Ru+2](<-[n]3ccnc4c5nccnc5ccc43)<-[n]3ccnc4c5nccnc5ccc43)c12
#20 0.00 ± 0.00
c1cnc2c(c1)ccc1ccc[n](->[Ru+2](<-[n]3ccnc4c5nccnc5ccc43)<-[n]3ccnc4c5nccnc5ccc43)c12
#20 0.00 ± 0.00
c1cnc2c(c1)ccc1ccc[n](->[Ru+2](<-[n]3ccnc4c5nccnc5ccc43)<-[n]3ccnc4c5nccnc5ccc43)c12
#21 0.00 ± 0.00
c1cnc2c(c1)ccc1ccc[n](->[Ru+2]3(<-[n]4ccnc5c6nccnc6ccc54)<-[n]4ccnc5c4ccc4ncc[n]->3c45)c12
#21 0.00 ± 0.00
c1cnc2c(c1)ccc1ccc[n](->[Ru+2]3(<-[n]4ccnc5c6nccnc6ccc54)<-[n]4ccnc5c4ccc4ncc[n]->3c45)c12
#21 0.00 ± 0.00
c1cnc2c(c1)ccc1ccc[n](->[Ru+2]3(<-[n]4ccnc5c6nccnc6ccc54)<-[n]4ccnc5c4ccc4ncc[n]->3c45)c12
#21 0.00 ± 0.00
c1cnc2c(c1)ccc1ccc[n](->[Ru+2]3(<-[n]4ccnc5c6nccnc6ccc54)<-[n]4ccnc5c4ccc4ncc[n]->3c45)c12
#21 0.00 ± 0.00
c1cnc2c(c1)ccc1ccc[n](->[Ru+2]3(<-[n]4ccnc5c6nccnc6ccc54)<-[n]4ccnc5c4ccc4ncc[n]->3c45)c12
#21 0.00 ± 0.00
c1cnc2c(c1)ccc1ccc[n](->[Ru+2]3(<-[n]4ccnc5c6nccnc6ccc54)<-[n]4ccnc5c4ccc4ncc[n]->3c45)c12
#21 0.00 ± 0.00
c1cnc2c(c1)ccc1ccc[n](->[Ru+2]3(<-[n]4ccnc5c6nccnc6ccc54)<-[n]4ccnc5c4ccc4ncc[n]->3c45)c12
#21 0.00 ± 0.00
c1cnc2c(c1)ccc1ccc[n](->[Ru+2]3(<-[n]4ccnc5c6nccnc6ccc54)<-[n]4ccnc5c4ccc4ncc[n]->3c45)c12
#21 0.00 ± 0.00
c1cnc2c(c1)ccc1ccc[n](->[Ru+2]3(<-[n]4ccnc5c6nccnc6ccc54)<-[n]4ccnc5c4ccc4ncc[n]->3c45)c12
#22 0.00 ± 0.00
c1cnc2c(c1)ccc1ccc[n](->[Ru+2]3<-[n]4ccnc5c6ncc[n]->3c6ccc54)c12
#22 0.00 ± 0.00
c1cnc2c(c1)ccc1ccc[n](->[Ru+2]3<-[n]4ccnc5c6ncc[n]->3c6ccc54)c12
#22 0.00 ± 0.00
c1cnc2c(c1)ccc1ccc[n](->[Ru+2]3<-[n]4ccnc5c6ncc[n]->3c6ccc54)c12
#22 0.00 ± 0.00
c1cnc2c(c1)ccc1ccc[n](->[Ru+2]3<-[n]4ccnc5c6ncc[n]->3c6ccc54)c12
#22 0.00 ± 0.00
c1cnc2c(c1)ccc1ccc[n](->[Ru+2]3<-[n]4ccnc5c6ncc[n]->3c6ccc54)c12
#22 0.00 ± 0.00
c1cnc2c(c1)ccc1ccc[n](->[Ru+2]3<-[n]4ccnc5c6ncc[n]->3c6ccc54)c12
#22 0.00 ± 0.00
c1cnc2c(c1)ccc1ccc[n](->[Ru+2]3<-[n]4ccnc5c6ncc[n]->3c6ccc54)c12
#22 0.00 ± 0.00
c1cnc2c(c1)ccc1ccc[n](->[Ru+2]3<-[n]4ccnc5c6ncc[n]->3c6ccc54)c12
#22 0.00 ± 0.00
c1cnc2c(c1)ccc1ccc[n](->[Ru+2]3<-[n]4ccnc5c6ncc[n]->3c6ccc54)c12
#23 0.00 ± 0.00
c1cnc2c(c1)ccc1ccc[n](->[Ru+2](<-[n]3ccnc4c5nccnc5ccc43)<-[n]3ccnc4ccc5nccnc5c43)c12
#23 0.00 ± 0.00
c1cnc2c(c1)ccc1ccc[n](->[Ru+2](<-[n]3ccnc4c5nccnc5ccc43)<-[n]3ccnc4ccc5nccnc5c43)c12
#23 0.00 ± 0.00
c1cnc2c(c1)ccc1ccc[n](->[Ru+2](<-[n]3ccnc4c5nccnc5ccc43)<-[n]3ccnc4ccc5nccnc5c43)c12
#23 0.00 ± 0.00
c1cnc2c(c1)ccc1ccc[n](->[Ru+2](<-[n]3ccnc4c5nccnc5ccc43)<-[n]3ccnc4ccc5nccnc5c43)c12
#23 0.00 ± 0.00
c1cnc2c(c1)ccc1ccc[n](->[Ru+2](<-[n]3ccnc4c5nccnc5ccc43)<-[n]3ccnc4ccc5nccnc5c43)c12
#23 0.00 ± 0.00
c1cnc2c(c1)ccc1ccc[n](->[Ru+2](<-[n]3ccnc4c5nccnc5ccc43)<-[n]3ccnc4ccc5nccnc5c43)c12
#23 0.00 ± 0.00
c1cnc2c(c1)ccc1ccc[n](->[Ru+2](<-[n]3ccnc4c5nccnc5ccc43)<-[n]3ccnc4ccc5nccnc5c43)c12
#23 0.00 ± 0.00
c1cnc2c(c1)ccc1ccc[n](->[Ru+2](<-[n]3ccnc4c5nccnc5ccc43)<-[n]3ccnc4ccc5nccnc5c43)c12
#23 0.00 ± 0.00
c1cnc2c(c1)ccc1ccc[n](->[Ru+2](<-[n]3ccnc4c5nccnc5ccc43)<-[n]3ccnc4ccc5nccnc5c43)c12
#24 0.00 ± 0.00
c1cnc2c(c1)ccc1ccc[n](->[Ru+2]3<-[n]4ccnc5c4ccc4ncc[n]->3c45)c12
#24 0.00 ± 0.00
c1cnc2c(c1)ccc1ccc[n](->[Ru+2]3<-[n]4ccnc5c4ccc4ncc[n]->3c45)c12
#24 0.00 ± 0.00
c1cnc2c(c1)ccc1ccc[n](->[Ru+2]3<-[n]4ccnc5c4ccc4ncc[n]->3c45)c12
#24 0.00 ± 0.00
c1cnc2c(c1)ccc1ccc[n](->[Ru+2]3<-[n]4ccnc5c4ccc4ncc[n]->3c45)c12
#24 0.00 ± 0.00
c1cnc2c(c1)ccc1ccc[n](->[Ru+2]3<-[n]4ccnc5c4ccc4ncc[n]->3c45)c12
#24 0.00 ± 0.00
c1cnc2c(c1)ccc1ccc[n](->[Ru+2]3<-[n]4ccnc5c4ccc4ncc[n]->3c45)c12
#24 0.00 ± 0.00
c1cnc2c(c1)ccc1ccc[n](->[Ru+2]3<-[n]4ccnc5c4ccc4ncc[n]->3c45)c12
#24 0.00 ± 0.00
c1cnc2c(c1)ccc1ccc[n](->[Ru+2]3<-[n]4ccnc5c4ccc4ncc[n]->3c45)c12
#24 0.00 ± 0.00
c1cnc2c(c1)ccc1ccc[n](->[Ru+2]3<-[n]4ccnc5c4ccc4ncc[n]->3c45)c12
#25 0.00 ± 0.00
c1cnc2c(c1)ccc1ccc[n](->[Ru+2](<-[n]3ccnc4ccc5nccnc5c43)<-[n]3ccnc4ccc5nccnc5c43)c12
#25 0.00 ± 0.00
c1cnc2c(c1)ccc1ccc[n](->[Ru+2](<-[n]3ccnc4ccc5nccnc5c43)<-[n]3ccnc4ccc5nccnc5c43)c12
#25 0.00 ± 0.00
c1cnc2c(c1)ccc1ccc[n](->[Ru+2](<-[n]3ccnc4ccc5nccnc5c43)<-[n]3ccnc4ccc5nccnc5c43)c12
#25 0.00 ± 0.00
c1cnc2c(c1)ccc1ccc[n](->[Ru+2](<-[n]3ccnc4ccc5nccnc5c43)<-[n]3ccnc4ccc5nccnc5c43)c12
#25 0.00 ± 0.00
c1cnc2c(c1)ccc1ccc[n](->[Ru+2](<-[n]3ccnc4ccc5nccnc5c43)<-[n]3ccnc4ccc5nccnc5c43)c12
#25 0.00 ± 0.00
c1cnc2c(c1)ccc1ccc[n](->[Ru+2](<-[n]3ccnc4ccc5nccnc5c43)<-[n]3ccnc4ccc5nccnc5c43)c12
#25 0.00 ± 0.00
c1cnc2c(c1)ccc1ccc[n](->[Ru+2](<-[n]3ccnc4ccc5nccnc5c43)<-[n]3ccnc4ccc5nccnc5c43)c12
#25 0.00 ± 0.00
c1cnc2c(c1)ccc1ccc[n](->[Ru+2](<-[n]3ccnc4ccc5nccnc5c43)<-[n]3ccnc4ccc5nccnc5c43)c12
#25 0.00 ± 0.00
c1cnc2c(c1)ccc1ccc[n](->[Ru+2](<-[n]3ccnc4ccc5nccnc5c43)<-[n]3ccnc4ccc5nccnc5c43)c12
#26 0.00 ± 0.00
c1cnc2c3nc[cH]4->[Ru+2]5<-[cH](cc3[cH]->54)c2c1
#26 0.00 ± 0.00
c1cnc2c3nc[cH]4->[Ru+2]5<-[cH](cc3[cH]->54)c2c1
#26 0.00 ± 0.00
c1cnc2c3nc[cH]4->[Ru+2]5<-[cH](cc3[cH]->54)c2c1
#26 0.00 ± 0.00
c1cnc2c3nc[cH]4->[Ru+2]5<-[cH](cc3[cH]->54)c2c1
#26 0.00 ± 0.00
c1cnc2c3nc[cH]4->[Ru+2]5<-[cH](cc3[cH]->54)c2c1
#26 0.00 ± 0.00
c1cnc2c3nc[cH]4->[Ru+2]5<-[cH](cc3[cH]->54)c2c1
#26 0.00 ± 0.00
c1cnc2c3nc[cH]4->[Ru+2]5<-[cH](cc3[cH]->54)c2c1
#26 0.00 ± 0.00
c1cnc2c3nc[cH]4->[Ru+2]5<-[cH](cc3[cH]->54)c2c1
#26 0.00 ± 0.00
c1cnc2c3nc[cH]4->[Ru+2]5<-[cH](cc3[cH]->54)c2c1
#27 0.00 ± 0.00
c1cnc2c3ncccc3[cH]3->[Ru+2](<-[cH]4cc5nccnc5c5nccnc54)<-[cH]3c2c1
#27 0.00 ± 0.00
c1cnc2c3ncccc3[cH]3->[Ru+2](<-[cH]4cc5nccnc5c5nccnc54)<-[cH]3c2c1
#27 0.00 ± 0.00
c1cnc2c3ncccc3[cH]3->[Ru+2](<-[cH]4cc5nccnc5c5nccnc54)<-[cH]3c2c1
#27 0.00 ± 0.00
c1cnc2c3ncccc3[cH]3->[Ru+2](<-[cH]4cc5nccnc5c5nccnc54)<-[cH]3c2c1
#27 0.00 ± 0.00
c1cnc2c3ncccc3[cH]3->[Ru+2](<-[cH]4cc5nccnc5c5nccnc54)<-[cH]3c2c1
#27 0.00 ± 0.00
c1cnc2c3ncccc3[cH]3->[Ru+2](<-[cH]4cc5nccnc5c5nccnc54)<-[cH]3c2c1
#27 0.00 ± 0.00
c1cnc2c3ncccc3[cH]3->[Ru+2](<-[cH]4cc5nccnc5c5nccnc54)<-[cH]3c2c1
#27 0.00 ± 0.00
c1cnc2c3ncccc3[cH]3->[Ru+2](<-[cH]4cc5nccnc5c5nccnc54)<-[cH]3c2c1
#27 0.00 ± 0.00
c1cnc2c3ncccc3[cH]3->[Ru+2](<-[cH]4cc5nccnc5c5nccnc54)<-[cH]3c2c1
#28 0.00 ± 0.00
c1cnc2c(c1)c[cH](->[Ru+2]1<-[cH]3c4nccnc4c4nccnc4[cH]->13)c1cccnc21
#28 0.00 ± 0.00
c1cnc2c(c1)c[cH](->[Ru+2]1<-[cH]3c4nccnc4c4nccnc4[cH]->13)c1cccnc21
#28 0.00 ± 0.00
c1cnc2c(c1)c[cH](->[Ru+2]1<-[cH]3c4nccnc4c4nccnc4[cH]->13)c1cccnc21
#28 0.00 ± 0.00
c1cnc2c(c1)c[cH](->[Ru+2]1<-[cH]3c4nccnc4c4nccnc4[cH]->13)c1cccnc21
#28 0.00 ± 0.00
c1cnc2c(c1)c[cH](->[Ru+2]1<-[cH]3c4nccnc4c4nccnc4[cH]->13)c1cccnc21
#28 0.00 ± 0.00
c1cnc2c(c1)c[cH](->[Ru+2]1<-[cH]3c4nccnc4c4nccnc4[cH]->13)c1cccnc21
#28 0.00 ± 0.00
c1cnc2c(c1)c[cH](->[Ru+2]1<-[cH]3c4nccnc4c4nccnc4[cH]->13)c1cccnc21
#28 0.00 ± 0.00
c1cnc2c(c1)c[cH](->[Ru+2]1<-[cH]3c4nccnc4c4nccnc4[cH]->13)c1cccnc21
#28 0.00 ± 0.00
c1cnc2c(c1)c[cH](->[Ru+2]1<-[cH]3c4nccnc4c4nccnc4[cH]->13)c1cccnc21
#29 0.00 ± 0.00
c1c[cH]2->[Ru+2]3<-[cH]4cnc5c(n1)c2ccc5[cH]->34
#29 0.00 ± 0.00
c1c[cH]2->[Ru+2]3<-[cH]4cnc5c(n1)c2ccc5[cH]->34
#29 0.00 ± 0.00
c1c[cH]2->[Ru+2]3<-[cH]4cnc5c(n1)c2ccc5[cH]->34
#29 0.00 ± 0.00
c1c[cH]2->[Ru+2]3<-[cH]4cnc5c(n1)c2ccc5[cH]->34
#29 0.00 ± 0.00
c1c[cH]2->[Ru+2]3<-[cH]4cnc5c(n1)c2ccc5[cH]->34
#29 0.00 ± 0.00
c1c[cH]2->[Ru+2]3<-[cH]4cnc5c(n1)c2ccc5[cH]->34
#29 0.00 ± 0.00
c1c[cH]2->[Ru+2]3<-[cH]4cnc5c(n1)c2ccc5[cH]->34
#29 0.00 ± 0.00
c1c[cH]2->[Ru+2]3<-[cH]4cnc5c(n1)c2ccc5[cH]->34
#29 0.00 ± 0.00
c1c[cH]2->[Ru+2]3<-[cH]4cnc5c(n1)c2ccc5[cH]->34
#30 0.00 ± 0.00
c1cnc2c(c1)ccc1c2nc[cH]2->[Ru+2](<-[cH]3cc4nccnc4c4nccnc43)<-[cH]12
#30 0.00 ± 0.00
c1cnc2c(c1)ccc1c2nc[cH]2->[Ru+2](<-[cH]3cc4nccnc4c4nccnc43)<-[cH]12
#30 0.00 ± 0.00
c1cnc2c(c1)ccc1c2nc[cH]2->[Ru+2](<-[cH]3cc4nccnc4c4nccnc43)<-[cH]12
#30 0.00 ± 0.00
c1cnc2c(c1)ccc1c2nc[cH]2->[Ru+2](<-[cH]3cc4nccnc4c4nccnc43)<-[cH]12
#30 0.00 ± 0.00
c1cnc2c(c1)ccc1c2nc[cH]2->[Ru+2](<-[cH]3cc4nccnc4c4nccnc43)<-[cH]12
#30 0.00 ± 0.00
c1cnc2c(c1)ccc1c2nc[cH]2->[Ru+2](<-[cH]3cc4nccnc4c4nccnc43)<-[cH]12
#30 0.00 ± 0.00
c1cnc2c(c1)ccc1c2nc[cH]2->[Ru+2](<-[cH]3cc4nccnc4c4nccnc43)<-[cH]12
#30 0.00 ± 0.00
c1cnc2c(c1)ccc1c2nc[cH]2->[Ru+2](<-[cH]3cc4nccnc4c4nccnc43)<-[cH]12
#30 0.00 ± 0.00
c1cnc2c(c1)ccc1c2nc[cH]2->[Ru+2](<-[cH]3cc4nccnc4c4nccnc43)<-[cH]12