0
votes
1answer
33 views

What is the minimum number of sign patterns in $\frac n2$ of columns (or rows) of Hadamard matrices?

Given a Hadamard matrix of size $n$, I want to know what is the minimum number of unique sign patterns in any $\frac n2$ columns (or rows). I count a sign pattern and its negation to be the same. My ...
0
votes
1answer
132 views

Prove that $\lambda(v-1) = r(k-1)$

This is to do with balanced incomplete block design. Some homework exercise wants me to prove the relation $$\lambda(v-1) = r(k-1)$$ $v$ is the number of elements in your ground set. $r$ is the ...
0
votes
0answers
30 views

Counting the 1s in each row of the incidence matrix of a 2-design

Consider the $2 - (4t-1, 2t, t)$ design where $t$ is an odd number and $A$ is the incidence matrix. I suspect that the number of elements with value $1$ in each row of $A$ is equal to $2t$ but I can't ...
0
votes
0answers
18 views

Symmetric 2-Designs

We just proved that for any symmetric 2-design (or Symmetric BIBDs as most literature puts it) with parameters $(v,k,\lambda)$, any two blocks intersects at exactly $\lambda$ points. Our lecturer ...
0
votes
0answers
29 views

Collection of subsets of $S$ where any $t$ have union equal to $S$ but any $t-1$ do not.

This recent question had me thinking about a generalization. Suppose we have a set of $n$ elements $S$. Suppose that we can assign the elements of $S$ to $b$ subsets $\{B_1,\ \cdots,\ B_b\}$ of $k$ ...
1
vote
2answers
175 views

France Olympiad Team Selection Test 2005

In an international meeting of n ≥ 3 participants, 14 languages are spoken. We know that: - Any 3 participants speak a common language. - No language is spoken by more than half of the participants. ...
5
votes
3answers
205 views

Symmetries of combinatorial structures.

Studying the automorphism groups of graphs/finite geometries/designs has been quite useful and important for both group theory and combinatorics. I know of the following books which cover the ideas ...
5
votes
1answer
124 views

Number of combinations such that each pair of combinations has at most x elements in common?

I am doing research on the sense of smell and have a combinatorics problem: I have 128 different odors (n) and I mix them in mixtures of 10 (r). There are 2.26846154e+14 different mixtures. What I ...
7
votes
1answer
88 views

How many different ways can the signs be chosen so that $\pm 1\pm 2\pm 3 … \pm (n-1) \pm n = n+1$?

How many different ways can the signs be chosen so that $\pm 1\pm 2\pm 3 ... \pm (n-1) \pm n = n+1$? This is an extension of this question: For what $n$ can $\pm 1\pm 2\pm 3 ... \pm (n-1) \pm n = ...
1
vote
1answer
357 views

What algorithm is a good to search a lotto design?

I'm interested what kind of algorithm would be suitable to find a lotto design? I saw that is has been proven that $L(39,7,4,7)=329$. This notation is explained in ...
2
votes
0answers
53 views

Configuration analogues of projective spaces?

In a configuration, each point is incident to the same number of lines and each line is incident to the same number of points. The Fano plane is a configuration, with 3 points on each line, and 3 ...
4
votes
1answer
246 views

A generalization of Kirkman's schoolgirl problem

A friend of mine asked me this question. "I have $3n$ elements, and I want to know which is the maximum number of triplets $(a,b,c)$ so that no two triplets have more than one element in common". The ...
3
votes
2answers
126 views

Geometric solution to classic committee problem

Most people know the classic committe style problems. I read this solution to one of the basic version of the committe problem and was impressed, but not sure why it works. I was hoping someone ...
2
votes
1answer
76 views

Pairwise balanced designs

Let $X$ be a finite set containing $v$ elements and $\lambda$ be a positive integer. Let $K$ be a set of positive integers. Further let there be a multiset $\mathcal{B}$ containing subsets of $X$ ...
1
vote
1answer
199 views

perfect binary e-error correcting code

let C be a perfect binary e-error correcting code of length n. assume 0 is a symbol and that 0 vector is a codeword.show that P={1,2,...,n} together with supports of codewords of weight 2e+1form an ...
4
votes
3answers
184 views

Orthogonal Latin Square 6*6

I need to make remarks about Tarry's Proof for the nonexistence of 6x6 Latin Squares as part of my final exam for a class I'm in. Problem is, I can't find it ANYWHERE on the internet. I can only find ...
-1
votes
1answer
80 views

Golf Round for a group of $12$

$12$ gentlemen wish to play $7$ rounds of golf. They want to split into $3$ groups of $4$ and play a different group each time with as much variety as possible without playing the same individuals ...
4
votes
1answer
206 views

Finding a system of sets resembling the projective plane

For every natural number $r$ I wish to construct a family of sets $\mathcal{F}$ such that Every set in $\mathcal{F}$ has cardinality $r$ and is a subset of $\{1,2,\ldots,r^2-r+1\},$ For every ...
9
votes
3answers
259 views

Question about members in sets

Let $A_1,A_2,...,A_n$ be sets with $k$ members in $A_i$ for every $1\le i\le n$. Suppose that the $A_i$ satisfy: 1) $|A_i\cap A_j| = 1$ for all $i\ne j$, 2) $A_1\cap A_2\cdots\cap A_n =\emptyset$. ...
3
votes
2answers
96 views

combinatorics question from the real world

This is a real world scenario - please help. My brain hurts and I can't figure it out on my own. Suppose I host an event with the following constraints There will be exactly 5 lectures There will ...
0
votes
0answers
40 views

Name for a type of combinatorial design?

Let $X$ be a ground set, and consider a collection $\mathscr{S}$ of subsets of $X$, $\mathscr{S} = \{S_1, \dots, S_n\}$. We would like to find a collection $\mathscr{S}'$ with the property that for ...