bio  website  web.mat.bham.ac.uk/~barberba 

location  Birmingham, UK  
age  
visits  member for  2 years, 10 months 
seen  10 hours ago  
stats  profile views  697 
Postdoc in Birmingham with Daniela Kühn.
11h

reviewed  Reviewed Probability distribution 
2d

reviewed  No Action Needed Does there exist a continuous surjection? 
May 20 
awarded  Custodian 
May 20 
reviewed  Approve Prescribed values for the uniform density 
May 19 
reviewed  No Action Needed Two conjectures about zero inner products and dissociated sets 
May 18 
comment 
Does van der Waerden's Theorem hold for $\omega_1$?
Do you know if this is true in, say, $\omega^\omega$? 
May 15 
reviewed  Looks OK Can height one maximal ideals in the normalization contract to nonheight one primes in the base? 
May 15 
reviewed  Reviewed Threshold for perfect Matchings in Bipartite graph 
May 15 
awarded  Cleanup 
May 15 
revised 
Expected matching in a bipartite graph
rolled back to a previous revision 
May 8 
reviewed  Reviewed Probability of subsequence of exact length to occur 
May 8 
comment 
Probability of subsequence of exact length to occur
Is $(a, b)$ an interval of reals or something else? 
May 8 
revised 
Probability of relations in network
missing word 
May 8 
reviewed  Looks OK formally etale deformations of algebras 
May 8 
reviewed  No Action Needed Probability of relations in network 
May 8 
answered  Probability of relations in network 
May 7 
comment 
Vertex expansion of the Hamming graph
The continous problem certainly provides a lower bound on the size of the neighbourhood in the discrete case. Whether that gives you useful quantitative information depends on what you can say quantitatively about the continuous problem. This appears to be discussed towards the end of Section 2, but no firm conclusion is reached. 
May 5 
answered  Vertex expansion of the Hamming graph 
Apr 10 
reviewed  No Action Needed Entropy inequality 
Apr 8 
comment 
Edgedisjoint cycles in graphs
If a graph is an edgedisjoint union of $p$ $k$cycles then obviously the optimum is $p$. Are you asking about the case when the $p$ $k$cycles overlap? Or possibly whether it's easy to find a decomposition if you know that there is one? In either case, I'm afraid I don't know. 